Showing total 2,492 results

1. A Note on the Paper 'A Common Fixed Point Theorem with Applications'.

Author

Huang, Hui and Zou, Jiangqian

Subjects

*FIXED point theory, *VARIATIONAL inequalities (Mathematics), *CHEBYSHEV approximation, *NONLINEAR operators, *DIFFERENTIAL inequalities

Abstract

In this note, we give affirmative answers to two open problems posed by Agarwal et al. in the paper (J Optim Theory Appl 163(2):482-490, ). [ABSTRACT FROM AUTHOR]

Published

2016

2. New Trends in Applying LRM to Nonlinear Ill-Posed Equations.

Author

George, Santhosh, Sadananda, Ramya, Padikkal, Jidesh, Kunnarath, Ajil, and Argyros, Ioannis K.

Subjects

MONOTONE operators, NONLINEAR equations, NONLINEAR operators, HILBERT space, GRAVIMETRY

Abstract

Tautenhahn (2002) studied the Lavrentiev regularization method (LRM) to approximate a stable solution for the ill-posed nonlinear equation κ (u) = v , where κ : D (κ) ⊆ X ⟶ X is a nonlinear monotone operator and X is a Hilbert space. The operator in the example used in Tautenhahn's paper was not a monotone operator. So, the following question arises. Can we use LRM for ill-posed nonlinear equations when the involved operator is not monotone? This paper provides a sufficient condition to employ the Lavrentiev regularization technique to such equations whenever the operator involved is non-monotone. Under certain assumptions, the error analysis and adaptive parameter choice strategy for the method are discussed. Moreover, the developed theory is applied to two well-known ill-posed problems—inverse gravimetry and growth law problems. [ABSTRACT FROM AUTHOR]

Published

2024

3. A note on a paper of Hicks and Rhoades

Author

Miheţ, Dorel

Subjects

*DIFFERENTIAL geometry, *SET theory, *FIXED point theory, *NONLINEAR operators

Abstract

Abstract: Our aim is to point out an error in the proof of Lemma 2 in the paper “Fixed point theory in symmetric spaces with applications to probabilistic spaces” by T.L. Hicks, B.E. Rhoades [Nonlinear Analysis 36 (1999) 331–344], and to indicate a way to repair it. [Copyright &y& Elsevier]

Published

2006

4. Simplified REGINN-IT method in Banach spaces for nonlinear ill-posed operator equations.

Author

Mahale, Pallavi and Shaikh, Farheen M.

Subjects

*NONLINEAR operators, *TIKHONOV regularization, *BANACH spaces

Abstract

In 2021, Z. Fu, Y. Chen and B. Han introduced an inexact Newton regularization (REGINN-IT) using an idea involving the non-stationary iterated Tikhonov regularization scheme for solving nonlinear ill-posed operator equations. In this paper, we suggest a simplified version of the REGINN-IT scheme by using the Bregman distance, duality mapping and a suitable parameter choice strategy to produce an approximate solution. The method is comprised of inner and outer iteration steps. The outer iterates are stopped by a Morozov-type stopping rule, while the inner iterate is executed by making use of the non-stationary iterated Tikhonov scheme. We have studied convergence of the proposed method under some standard assumptions and utilizing tools from convex analysis. The novelty of the method is that it requires computation of the Fréchet derivative only at an initial guess of an exact solution and hence can be identified as more efficient compared to the method given by Z. Fu, Y. Chen and B. Han. Further, in the last section of the paper, we discuss test examples to inspect the proficiency of the method. [ABSTRACT FROM AUTHOR]

Published

2024

5. A sufficient descent LS-PRP-BFGS-like method for solving nonlinear monotone equations with application to image restoration.

Author

Abubakar, A. B., Ibrahim, A. H., Abdullahi, M., Aphane, M., and Chen, Jiawei

Subjects

IMAGE reconstruction, NONLINEAR equations, OPERATOR equations, NONLINEAR operators, MAP projection

Abstract

In this paper, we propose a method for efficiently obtaining an approximate solution for constrained nonlinear monotone operator equations. The search direction of the proposed method closely aligns with the Broyden-Fletcher-Goldfarb-Shanno (BFGS) direction, known for its low storage requirement. Notably, the search direction is shown to be sufficiently descent and bounded without using the line search condition. Furthermore, under some standard assumptions, the proposed method converges globally. As an application, the proposed method is applied to solve image restoration problems. The efficiency and robustness of the method in comparison to other methods are tested by numerical experiments using some test problems. [ABSTRACT FROM AUTHOR]

Published

2024

6. Existence, Regularity, and Uniqueness of Solutions to Some Noncoercive Nonlinear Elliptic Equations in Unbounded Domains.

Author

Di Gironimo, Patrizia

Subjects

NONLINEAR equations, DIRICHLET problem, ELLIPTIC operators, NONLINEAR operators, VECTOR fields, ELLIPTIC equations, ADVECTION-diffusion equations

Abstract

In this paper, we study a noncoercive nonlinear elliptic operator with a drift term in an unbounded domain. The singular first-order term grows like | E (x) | | ∇ u | , where E (x) is a vector field belonging to a suitable Morrey-type space. Our operator arises as a stationary equation of diffusion–advection problems. We prove existence, regularity, and uniqueness theorems for a Dirichlet problem. To obtain our main results, we use the weak maximum principle and the same a priori estimates. [ABSTRACT FROM AUTHOR]

Published

2024

7. On steady state of viscous compressible heat conducting full magnetohydrodynamic equations.

Author

Azouz, Mohamed, Benabidallah, Rachid, and Ebobisse, François

Subjects

NONLINEAR operators, SOBOLEV spaces, ADVECTION, GRAVITATION, HEAT flux

Abstract

This paper is concerned with the study of equations of viscous compressible and heat-conducting full magnetohydrodynamic (MHD) steady flows in a horizontal layer under the gravitational force and a large temperature gradient across the layer. We assume as boundary conditions, periodic conditions in the horizontal directions, while in the vertical directions, slip-boundary is assumed for the velocity, vertical conditions for the magnetic field, and fixed temperature or fixed heat flux are prescribed for the temperature. The existence of stationary solution in a small neighborhood of a stationary profile close to hydrostatic state is obtained in Sobolev spaces as a fixed point of some nonlinear operator. [ABSTRACT FROM AUTHOR]

Published

2024

8. Collage theorems, invertibility and fractal functions.

Author

Navascués, María A. and Mohapatra, Ram N.

Subjects

*BANACH algebras, *COLLAGE, *BANACH spaces, *LINEAR operators, *NONLINEAR operators, *CONTRACTIONS (Topology), *FRACTALS

Abstract

Collage Theorem provides a bound for the distance between an element of a given space and a fixed point of a self-map on that space, in terms of the distance between the point and its image. We give in this paper some results of Collage type for Reich mutual contractions in b-metric and strong b-metric spaces. We give upper and lower bounds for this distance, in terms of the constants of the inequality involved in the definition of the contractivity. Reich maps contain the classical Banach contractions as particular cases, as well as the maps of Kannan type, and the results obtained are very general. The middle part of the article is devoted to the invertibility of linear operators. In particular we provide criteria for invertibility of operators acting on quasi-normed spaces. Our aim is the extension of the Casazza-Christensen type conditions for the existence of inverse of a linear map defined on a quasi-Banach space, using different procedures. The results involve either a single map or two operators. The latter case provides a link between the properties of both mappings. The last part of the article is devoted to study the construction of fractal curves in Bochner spaces, initiated by the first author in a previous paper. The objective is the definition of fractal curves valued on Banach spaces and Banach algebras. We provide further results on the fractal convolution of operators, defined in the same reference, considering in this case the nonlinear operators. We prove that some properties of the initial maps are inherited by their convolutions, if some conditions on the elements of the associated iterated function system are satisfied. In the last section of the paper we use the invertibility criteria given before in order to obtain perturbed fractal spanning systems for quasi-normed Bochner spaces composed of Banach-valued integrable maps. These results can be applied to Lebesgue spaces of real valued functions as a particular case. [ABSTRACT FROM AUTHOR]

Published

2024

9. Monarch butterfly optimization-based genetic algorithm operators for nonlinear constrained optimization and design of engineering problems.

Author

El-Shorbagy, M A and Alhadbani, Taghreed Hamdi

Subjects

MONARCH butterfly, GENETIC algorithms, OPTIMIZATION algorithms, NONLINEAR operators, ENGINEERING design, CONSTRAINED optimization

Abstract

This paper aims to present a hybrid method to solve nonlinear constrained optimization problems and engineering design problems (EDPs). The hybrid method is a combination of monarch butterfly optimization (MBO) with the cross-over and mutation operators of the genetic algorithm (GA). It is called a hybrid monarch butterfly optimization with genetic algorithm operators (MBO-GAO). Combining MBO and GA operators is meant to overcome the drawbacks of both algorithms while merging their advantages. The self-adaptive cross-over and the real-valued mutation are the GA operators that are used in MBO-GAO. These operators are merged in a distinctive way within MBO processes to improve the variety of solutions in the later stages of the search process, speed up the convergence process, keep the search from getting stuck in local optima, and achieve a balance between the tendencies of exploration and exploitation. In addition, the greedy approach is presented in both the migration operator and the butterfly adjusting operator, which can only accept offspring of the monarch butterfly groups who are fitter than their parents. Finally, popular test problems, including a set of 19 benchmark problems, are used to test the proposed hybrid algorithm, MBO-GAO. The findings obtained provide evidence supporting the higher performance of MBO-GAO compared with other search techniques. Additionally, the performance of the MBO-GAO is examined for several EDPs. The computational results show that the MBO-GAO method exhibits competitiveness and superiority over other optimization algorithms employed for the resolution of EDPs. [ABSTRACT FROM AUTHOR]

Published

2024

10. Invariant Subspaces of Short Pulse-Type Equations and Reductions.

Author

Wang, Guo-Hua, Pang, Jia-Fu, Jin, Yong-Yang, and Ren, Bo

Subjects

INVARIANT subspaces, LINEAR differential equations, NONLINEAR operators, ORDINARY differential equations, EQUATIONS

Abstract

In this paper, we extend the invariant subspace method to a class of short pulse-type equations. Complete classification results with invariant subspaces from 2 to 5 dimensions are provided. The key step is to take subspaces of solutions of linear ordinary differential equations as invariant subspaces that nonlinear operators admit. Some concrete examples and corresponding reduced systems are presented to illustrate this method. [ABSTRACT FROM AUTHOR]

Published

2024

11. A Singular Tempered Sub-Diffusion Fractional Model Involving a Non-Symmetrically Quasi-Homogeneous Operator.

Author

Zhang, Xinguang, Chen, Peng, Li, Lishuang, and Wu, Yonghong

Subjects

FIXED point theory, NONLINEAR operators

Abstract

In this paper, we focus on the existence of positive solutions for a singular tempered sub-diffusion fractional model involving a quasi-homogeneous nonlinear operator. By using the spectrum theory and computing the fixed point index, some new sufficient conditions for the existence of positive solutions are derived. It is worth pointing out that the nonlinearity of the equation contains a tempered fractional sub-diffusion term, and is allowed to possess strong singularities in time and space variables. In particular, the quasi-homogeneous operator is a nonlinear and non-symmetrical operator. [ABSTRACT FROM AUTHOR]

Published

2024

12. Convergence guarantees for coefficient reconstruction in PDEs from boundary measurements by variational and Newton-type methods via range invariance.

Author

Kaltenbacher, Barbara

Subjects

*PARAMETER identification, *NONLINEAR operators, *PARTIAL differential equations, *FACTOR structure, *OPERATOR equations, *ELLIPTIC differential equations

Abstract

A key observation underlying this paper is the fact that the range invariance condition for convergence of regularization methods for nonlinear ill-posed operator equations—such as coefficient identification in partial differential equations (PDEs) from boundary observations—can often be achieved by extending the searched for parameter in the sense of allowing it to depend on additional variables. This clearly counteracts unique identifiability of the parameter, though. The second key idea of this paper is now to restore the original restricted dependency of the parameter by penalization. This is shown to lead to convergence of variational (Tikhonov type) and iterative (Newton-type) regularization methods. We concretize the abstract convergence analysis in a framework typical of parameter identification in PDEs in a reduced and an all-at-once setting. This is further illustrated by three examples of coefficient identification from boundary observations in elliptic and time-dependent PDEs. [ABSTRACT FROM AUTHOR]

Published

2024

13. GAUSS-NEWTON ORIENTED GREEDY ALGORITHMS FOR THE RECONSTRUCTION OF OPERATORS IN NONLINEAR DYNAMICS.

Author

BUCHWALD, SIMON, CIARAMELLA, GABRIELE, and SALOMON, JULIEN

Subjects

NONLINEAR operators, GREEDY algorithms, NONLINEAR dynamical systems, LINEAR dynamical systems, LINEAR control systems, NEWTON-Raphson method

Abstract

This paper is devoted to the development and convergence analysis of greedy reconstruction algorithms based on the strategy presented in [Y. Maday and J. Salomon, Joint Proceedings of the 48th IEEE Conference on Decision and Control and the 28th Chinese Control Conference, 2009, pp. 375--379]. These procedures allow the design of a sequence of control functions that ease the identification of unknown operators in nonlinear dynamical systems. The original strategy of greedy reconstruction algorithms is based on an offline/online decomposition of the reconstruction process and an ansatz for the unknown operator obtained by an a priori chosen set of linearly independent matrices. In the previous work [S. Buchwald, G. Ciaramella, and J. Salomon, SIAM J. Control Optim., 59 (2021), pp. 4511--4537], convergence results were obtained in the case of linear identification problems. We tackle here the more general case of nonlinear systems. More precisely, we introduce a new greedy algorithm based on the linearized system. We show that the controls obtained with this new algorithm lead to the local convergence of the classical Gauss--Newton method applied to the online nonlinear identification problem. We then extend this result to the controls obtained on nonlinear systems where a local convergence result is also proved. The main convergence results are obtained for dynamical systems with linear and bilinear control structures. [ABSTRACT FROM AUTHOR]

Published

2024

14. Mild solutions for fractional non-instantaneous impulses integro-differential equations with nonlocal conditions.

Author

Ye Li and Biao Qu

Subjects

INTEGRO-differential equations, NONLINEAR operators, COMPRESSIBILITY, GENERALIZATION

Abstract

In this paper, we investigated Caputo fractional integro-differential equations with noninstantaneous impulses and nonlocal conditions. By employing the solution operator, the Mönch fixed point theorem, and the stepwise estimation method, we eliminated the Lipschitz condition of the nonlinear term, while also dispensing with the requirement for the compressibility coefficient condition 0 < k < 1. The main results presented represented a generalization and enhancement of previous findings. Furthermore, an example was provided to verify the application of our main results. [ABSTRACT FROM AUTHOR]

Published

2024

15. On the viscosity approximation type iterative method and its non-linear behaviour in the generation of Mandelbrot and Julia sets.

Author

Kumari, Sudesh, Gdawiec, Krzysztof, Nandal, Ashish, Kumar, Naresh, and Chugh, Renu

Subjects

VISCOSITY, NONLINEAR operators, FRACTALS, MULTIFRACTALS

Abstract

In this paper, we visualise and analyse the dynamics of fractals (Julia and Mandelbrot sets) for complex polynomials of the form T (z) = z n + m z + r , where n ≥ 2 and m , r ∈ C , by adopting the viscosity approximation type iteration process which is most widely used iterative method for finding fixed points of non-linear operators. We establish a convergence condition in the form of escape criterion which allows to adapt the escape-time algorithm to the considered iteration scheme. We also present some graphical examples of the Mandelbrot and Julia fractals showing the dependency of Julia and Mandelbrot sets on complex polynomials, contraction mappings, and iteration parameters. Moreover, we propose two numerical measures that allow the study of the dependency of the set shape change on the values of the iteration parameters. Using these two measures, we show that the dependency for the considered iteration method is non-linear. [ABSTRACT FROM AUTHOR]

Published

2024

16. A new solution of the nonlinear fractional logistic differential equations utilizing efficient techniques.

Author

Ganie, Abdul Hamid, Khan, Adnan, Alhamzi, Ghaliah, Saeed, Abdulkafi Mohammed, and Jeelani, Mdi begum

Subjects

CAPUTO fractional derivatives, NONLINEAR differential equations, FRACTIONAL differential equations, DECOMPOSITION method, NONLINEAR operators, ANALYTICAL solutions

Abstract

The formulation of models and solutions for various physical problems are the primary goals of scientific achievements in engineering and physics. Our paper focuses on using the Caputo fractional derivative operator to solve nonlinear fractional logistic differential equations. In order to solve general nonlinear fractional differential equations, we first introduce a novel numerical methodology termed the Homotopy perturbation transform method. The perturbation approach and the Yang transform method are combined to create the suggested strategy. Second, we introduce a new hybrid method that uses the time-fractional Caputo derivative to approximate and analytically solve nonlinear fractional logistic differential equations. This method combines the Yang transform with the decomposition method. To validate the analysis, we offer three numerical cases of nonlinear fractional logistic differential equations employing the Caputo fractional derivative operator. The resulting solutions exhibit rapid convergence and are presented in series form. In order to verify the efficacy and relevance of the suggested methodologies, the investigated issues were assessed through the implementation of different fractional orders. We examine and show that, under the specified initial conditions, the solution approaches under evaluation are accurate and effective. Graphs in two and three dimensions show the results that were obtained. Numerical simulations are presented to confirm the efficacy of the strategies. The numerical results show that an accurate, reliable, and efficient approximation can be obtained with a minimal number of terms. The results obtained demonstrate that the new analytical solution method is easy to apply and very successful in solving difficult fractional problems that occur in relevant engineering and scientific domains. [ABSTRACT FROM AUTHOR]

Published

2024

17. Multi-parameter perturbations for the space-periodic heat equation.

Author

Riva, Matteo Dalla, Luzzini, Paolo, Molinarolo, Riccardo, and Musolino, Paolo

Subjects

HEAT transfer, NONLINEAR operators

Abstract

This paper is divided into three parts. The first part focuses on periodic layer heat potentials, demonstrating their smooth dependence on regular perturbations of the support of integration. In the second part, we present an application of the results from the first part. Specifically, we consider a transmission problem for the heat equation in a periodic domain and we show that the solution depends smoothly on the shape of the transmission interface, boundary data, and transmission parameters. Finally, in the last part of the paper, we fix all parameters except for the transmission parameters and outline a strategy to deduce an explicit expansion of the solution using Neumann-type series. [ABSTRACT FROM AUTHOR]

Published

2024

18. Existence results for some weakly singular integral equations via measures of non-compactness.

Author

Kazemi, Manochehr and Doostdar, Mohammad Reza

Subjects

INTEGRAL equations, BANACH algebras, FIXED point theory, BANACH spaces, NONLINEAR operators

Abstract

In this paper, the existence of the solutions of a class of weakly singular integral equations in Banach algebra is investigated. The basic tool used in investigations is the technique of the measure of non-compactness and Petryshyn's fixed point theorem. Also, for the applicability of the obtained results, some examples are given. [ABSTRACT FROM AUTHOR]

Published

2024

19. Fixed point uniqueness of generalized (ψ, φ)-weak contractions in partially ordered metric spaces under suitable constraints.

Author

Joonaghany, Gholamreza Heidary

Subjects

FIXED point theory, METRIC spaces, STATISTICAL hypothesis testing, NONLINEAR operators, HYPOTHESIS

Abstract

In this paper, by providing an example, I show that the condition which produced by Radenović and Kadelburg in [Generalized weak contractions in partially ordered metric spaces, Comput. Math. Appl. 60 (2010) pp. 1776-1783] is not sufficient for uniqueness of the fixed point. Furthermore, a new sufficient condition is introduced for the uniqueness of the fixed point. Some suitable examples are furnished to demonstrate the validity of the hypotheses of my results. [ABSTRACT FROM AUTHOR]

Published

2024

20. Operator-based adaptive robust control for uncertain nonlinear systems by combining coprime factorization and fuzzy control method1.

Author

Li, Mengyang, Wang, Nan, Fu, Zhumu, Tao, Fazhan, and Zhou, Tao

Subjects

*ADAPTIVE fuzzy control, *NONLINEAR systems, *UNCERTAIN systems, *ROBUST control, *STABILITY of nonlinear systems, *ADAPTIVE control systems, *FACTORIZATION, *NONLINEAR operators

Abstract

In this paper, the robust stability of nonlinear system with unknown perturbation is considered combining operator-based right coprime factorization and fuzzy control method from the input-output view of point. In detail, fuzzy logic system is firstly combined with operator-based right coprime factorization method to study the uncertain nonlinear system. By using the operator-based fuzzy controller, the unknown perturbation is formulated, and a sufficient condition of guaranteeing robust stability is given by systematic calculation, which reduces difficulties in designing controller and calculating inverse of Bezout identity. Implications of the results related to former results are briefly compared and discussed. Finally, a simulation example is shown to confirm effectiveness of the proposed design scheme of this paper. [ABSTRACT FROM AUTHOR]

Published

2024

21. On the unique weak solvability of second-order unconditionally stable difference scheme for the system of sine-Gordon equations.

Author

Yildirim, Ozgur

Subjects

SINE-Gordon equation, CALCULUS of variations, FIXED point theory, NONLINEAR operators, NUMERICAL analysis

Abstract

In the present paper, a nonlinear system of sine-Gordon equations that describes the DNA dynamics is considered. A novel unconditionally stable second-order accuracy difference scheme corresponding to the system of sine-Gordon equations is presented. In this work, for the first time in the literature, weak solution of this difference scheme is studied. The existence and uniqueness of the weak solution for the difference scheme are proved in the space of distributions, and the methods of variational calculus are applied. The finite-difference method and the fixed point theory are used in combination to perform numerical experiments that verify the theoretical statements. [ABSTRACT FROM AUTHOR]

Published

2024

22. Operator-based adaptive robust control for uncertain nonlinear systems by combining coprime factorization and fuzzy control method1.

Author

Li, Mengyang, Wang, Nan, Fu, Zhumu, Tao, Fazhan, and Zhou, Tao

Subjects

ADAPTIVE fuzzy control, NONLINEAR systems, UNCERTAIN systems, ROBUST control, STABILITY of nonlinear systems, ADAPTIVE control systems, FACTORIZATION, NONLINEAR operators

Abstract

In this paper, the robust stability of nonlinear system with unknown perturbation is considered combining operator-based right coprime factorization and fuzzy control method from the input-output view of point. In detail, fuzzy logic system is firstly combined with operator-based right coprime factorization method to study the uncertain nonlinear system. By using the operator-based fuzzy controller, the unknown perturbation is formulated, and a sufficient condition of guaranteeing robust stability is given by systematic calculation, which reduces difficulties in designing controller and calculating inverse of Bezout identity. Implications of the results related to former results are briefly compared and discussed. Finally, a simulation example is shown to confirm effectiveness of the proposed design scheme of this paper. [ABSTRACT FROM AUTHOR]

Published

2024

23. Influence of symmetric first-order divided differences on Secant-like methods.

Author

HERNÁNDEZ-VERÓN, M. A., HUESO, JOSÉ L., and MARTÍNEZ, EULALIA

Subjects

NONLINEAR operators, PROBLEM solving, ITERATIVE methods (Mathematics)

Abstract

In this paper, by using symmetric first-order divided differences, we introduce a new family of Secant-like iterative methods with quadratic convergence. Afterthought, we analyze its semilocal and local behavior when the nonlinear operator F is not differentiable by imposing appropriate bounding conditions in each case. Theoretical results have also been tested by solving a problem which shows the applicability of our work. [ABSTRACT FROM AUTHOR]

Published

2024

24. NONLOCAL DOUBLE PHASE IMPLICIT OBSTACLE PROBLEMS WITH MULTIVALUED BOUNDARY CONDITIONS.

Author

ZENG, SHENGDA, RĂDULESCU, VICENŢIU D., and WINKERT, PATRICK

Subjects

NONLINEAR operators, BOUNDARY value problems, DIFFERENTIAL operators, OPERATOR theory, NONSMOOTH optimization, MONOTONE operators

Abstract

In this paper, we consider a mixed boundary value problem with a nonhomogeneous, nonlinear differential operator (called double phase operator), a nonlinear convection term (a reaction term depending on the gradient), three multivalued terms, and an implicit obstacle constraint. Under very general assumptions on the data, we prove that the solution set of such an implicit obstacle problem is nonempty (so there is at least one solution) and weakly compact. The proof of our main result uses the Kakutani-Ky Fan fixed point theorem for multivalued operators along with the theory of nonsmooth analysis and variational methods for pseudomonotone operators. [ABSTRACT FROM AUTHOR]

Published

2024

25. Properties of the free boundaries for the obstacle problem of the porous medium equations.

Author

Kim, Sunghoon, Lee, Ki-Ahm, and Park, Jinwan

Subjects

POROUS materials, NONLINEAR operators, EQUATIONS, NONLINEAR equations

Abstract

In this paper, we study the existence and interior W 2 , p -regularity of the solution, and the regularity of the free boundary ∂ ⁡ { u > ϕ } to the obstacle problem of the porous medium equation, u t = Δ ⁢ u m ( m > 1 ) with the obstacle function ϕ. The penalization method is applied to have the existence and interior regularity. To deal with the interaction between two free boundaries ∂ ⁡ { u > ϕ } and ∂ ⁡ { u > 0 } , we consider two cases on the initial data which make the free boundary ∂ ⁡ { u > ϕ } separate from the free boundary ∂ ⁡ { u > 0 } . Then the problem is converted into the obstacle problem for a fully nonlinear operator. Hence, the C 1 -regularity of the free boundary ∂ ⁡ { u > ϕ } is obtained by the regularity theory of a class of obstacle problems for the general fully nonlinear operator. [ABSTRACT FROM AUTHOR]

Published

2024

26. RELATIVE MODEL OF THE LOGICAL ENTROPY OF SUB-σΘ-ALGEBRAS.

Author

MOHAMMADI, U.

Subjects

OPERATOR algebras, MATHEMATICAL models, VECTORS (Calculus), FIXED point theory, NONLINEAR operators

Abstract

In the context of observers, any mathematical model accord- ing to the viewpoint of an observer Θ is called a relative model. The purpose of the present paper is to study the relative model of logical en- tropy. Given an observer Θ, we define the relative logical entropy and relative conditional logical entropy of a sub-σΘ-algebra having finitely many atoms on the relative probability Θ−measure space and prove the ergodic properties of these measures. Finally, it is shown that the relative logical entropy is invariant under the relation of equivalence modulo zero. [ABSTRACT FROM AUTHOR]

Published

2024

27. Dirichlet Graph Convolution Coupled Neural Differential Equation for Spatio-temporal Time Series Prediction.

Author

Wang, Qipeng and Han, Min

Subjects

DIFFERENTIAL equations, SPATIOTEMPORAL processes, NONLINEAR dynamical systems, FORECASTING, DYNAMICAL systems, COSINE function, NONLINEAR operators, TIME series analysis

Abstract

In recent years, multivariate time series prediction has attracted extensive research interests. However, the dynamic changes of the spatial topology and the temporal evolution of multivariate variables bring great challenges to the spatio-temporal time series prediction. In this paper, a novel Dirichlet graph convolution module is introduced to automatically learn the spatio-temporal representation, and we combine graph attention (GAT) and neural differential equation (NDE) based on nonlinear state transition to model spatio-temporal state evolution of nonlinear systems. Specifically, the spatial topology is revealed by the cosine similarity of node embeddings. The use of multi-layer Dirichlet graph convolution aims to enhance the representation ability of the model while suppressing the phenomenon of over-smoothing or over-separation. The GCN and LSTM-based network is used as the nonlinear operator to model the evolution law of the dynamic system, and the GAT updates the strength of the connection. In addition, the Euler trapezoidal integral method is used to model the temporal dynamics and makes medium and long-term prediction in latent space from the perspective of nonlinear state transition. The proposed model can adaptively mine spatial correlations and discover spatio-temporal dynamic evolution patterns through the coupled NDE, which makes the modeling process more interpretable. Experiment results demonstrate the effectiveness of spatio-temporal dynamic discovery on predictive performance. [ABSTRACT FROM AUTHOR]

Published

2023

28. ABSTRACT FRACTIONAL DIFFERENTIAL EQUATIONS WITH CAPUTO--FABRIZIO DERIVATIVE.

Author

MELHA, KHELLAF OULD, DJILALI, MEDJAHED, and CHINCHANE, VAIJANATH L.

Subjects

FRACTIONAL differential equations, MATHEMATICS theorems, INTEGRAL inequalities, MATHEMATICAL inequalities, NONLINEAR operators

Abstract

The main objective of this paper is to prove the existence and uniqueness of mild solution for abstract differential equations by using the resolvent operators and fixed point theorem. Moreover, we studied some examples on partial differential equation with Caputo-Fabrizio derivative. [ABSTRACT FROM AUTHOR]

Published

2023

29. The generalized modular string averaging procedure and its applications to iterative methods for solving various nonlinear operator theory problems.

Author

Barshad, Kay, Gibali, Aviv, and Reich, Simeon

Subjects

NONLINEAR operators, OPERATOR theory, NONLINEAR theories, METRIC projections, HILBERT space

Abstract

A modular string averaging procedure (MSA, for short) for a finite number of operators was first introduced by Reich and Zalas in 2016. The MSA concept provides a flexible algorithmic framework for solving various feasibility problems such as common fixed point and convex feasibility problems. In 2001 Bauschke and Combettes introduced the notion of coherence and applied it to proving weak and strong convergence of many iterative methods. In 2019 Barshad, Reich and Zalas proposed a stronger variant of coherence which provides a more convenient sufficient convergence condition for such methods. In this paper we combine the ideas of both modular string averaging and coherence. Focusing on extending the above MSA procedure to an infinite sequence of operators with admissible controls, we establish strong coherence of its output operators. Various applications of these concepts are presented with respect to weak and strong convergence. They also provide important generalizations of known results, where the weak convergence of sequences of operators generated by the MSA procedure with intermittent controls was considered. [ABSTRACT FROM AUTHOR]

Published

2023

30. FEOTS v0.0.0: a new offline code for the fast equilibration of tracers in the ocean.

Author

Schoonover, Joseph, Weijer, Wilbert, and Zhang, Jiaxu

Subjects

ELECTRIC transients, IMPULSE response, NONLINEAR operators, SOFTWARE frameworks, WATER masses

Abstract

In this paper we introduce a new software framework for the offline calculation of tracer transport in the ocean. The Fast Equilibration of Ocean Tracers Software (FEOTS) is an end-to-end set of tools to efficiently calculate tracer distributions on a global or regional sub-domain using transport operators diagnosed from a comprehensive ocean model. To the best of our knowledge, this is the first application of a transport matrix model to an eddying ocean state. While a Newton–Krylov-based equilibration capability is still under development and not presented here, we demonstrate in this paper the transient modeling capabilities of FEOTS in an application focused on the Argentine Basin, where intense eddy activity and the Zapiola Anticyclone lead to strong mixing of water masses. The demonstration illustrates progress in developing offline passive tracer simulation capabilities, while highlighting the challenges of the impulse response functions approach in capturing tracer transports by a non-linear advection scheme. Our future work will focus on improving the computational efficiency of the code to reduce time-to-solution, using different basis functions to better represent non-linear advection operators, applying FEOTS to a parent model with unstructured grids (Ocean Model for Prediction Across Scales, MPAS-Ocean), and fully implementing a Newton–Krylov steady-state solver. [ABSTRACT FROM AUTHOR]

Published

2023

31. Fixed point equations for superlinear operators with strong upper or strong lower solutions and applications.

Author

Shaoyuan Xu, Yan Han, and Qiongyue Zheng

Subjects

OPERATOR equations, NONLINEAR integral equations, NONLINEAR operators, NONLINEAR equations, NONLINEAR dynamical systems, INTEGRAL operators

Abstract

It is well known that sublinear operators and superlinear operators are two classes of important nonlinear operators in nonlinear analysis and dynamical systems. Since sublinear operators have only weak nonlinearity, this advantage makes it easy to deal with them. However, superlinear operators have strong nonlinearity, and there are only a few results about them. In this paper, the convergence of Picard iteration for the superlinear operator A is obtained based on the conditions that the fixed point equation Ax = x has a strong upper solution and a lower solution (or alternatively, an upper solution and a strong lower solution). Besides, the uniqueness of the fixed point of strongly increasing operators as well as the global attractivity of strongly monotone dynamical systems are also discussed. In addition, the main results are applied to monotone dynamics of superlinear operators and nonlinear integral equations. The method used in our work develops the traditional method of upper and lower solutions. Since a strong upper (upper) solution and a lower (strong lower) solution are easily checked, the obtained results are effective and practicable in the study of nonlinear equations and dynamical systems. The main novelty is that this paper provides new fixed point results for increasing superlinear operators and the obtained results are applied to strongly monotone systems to investigate their global attractivity. [ABSTRACT FROM AUTHOR]

Published

2023

32. Condition Assessment Approach of Hydraulic Brake for Large Crane Based on State Estimation Algorithm.

Author

Lu, Houjun, Zhou, Qiang, and Chang, Daofang

Subjects

HYDRAULIC brakes, CRANES (Machinery), SLIDING friction, STIFFNESS (Mechanics), NONLINEAR operators, ESTIMATION theory, STATISTICAL correlation

Abstract

Hydraulic brake was widely used for mechanical brake of port crane. The run-state of the brake affects the safety of the crane because of the sudden accident. Because of the complex structure and unsuited to use in real time of traditional assessment model, the condition assessment approach of hydraulic brake was constructed based on state estimation algorithm in this paper. The oil temperature, dynamic friction coefficient, spring stiffness coefficient, brake shoe clearance and contact area were chosen as the state components of the memory matrix based on the analysis of the structure and failure reasons of the brake. Considering the correlation between the state components, the Mahalanobis distance was chosen as the nonlinear operator of algorithm, and the uncertainty factors and random disturbances in state assessment were eliminated by the sliding window residual statistics method. The dynamics simulation of hydraulic brake was constructed for confirming the validity of the approach in this paper. The result shows that it can be accurately judged by the method if the brake is in abnormal state. [ABSTRACT FROM AUTHOR]

Published

2018

33. Fixed point of Hardy-Rogers-type contractions on metric spaces with graph.

Author

Shagari, Mohammed Shehu, Ali, Faryad, Alotaibi, Trad, and Azam, Akbar

Subjects

FIXED point theory, METRIC spaces, DIGITAL technology, ARTIFICIAL intelligence, NONLINEAR operators

Abstract

This paper presents a novel concept of G -Hardy-Rogers functional operators on metric spaces endowed with a graph. It investigates sufficient circumstances under which such a mapping becomes a Picard operator. As applications of the principal idea discussed herein, a few important corresponding fixed point results in ordered metric spaces and cyclic operators are pointed out and analyzed. For upcoming research papers in this field, comparative graphical illustrations are created to highlight the pre-eminence of proposed notions with respect to the existing ones. [ABSTRACT FROM AUTHOR]

Published

2023

34. Evaluation of the government entrepreneurship support by a new dynamic neutrosophic operator based on time degrees.

Author

Wang, Chenguang, Hu, Zixin, and Bao, Zongke

Subjects

POLITICAL entrepreneurship, GOVERNMENT aid, NONLINEAR operators, NONLINEAR programming, AGGREGATION operators, GOVERNMENT policy

Abstract

Purpose: Entrepreneurship as a development engine has a distinct character in the economic growth of countries. Therefore, governments must support entrepreneurship in order to succeed in the future. The best way to improve the performance of this entrepreneurial advocacy is through efficient measurement methods. For this reason, the purpose of this paper is to propose a new integrated dynamic multi-attribute decision-making (MADM) model based on neutrosophic set (NS) for assessment of the government entrepreneurship support. Design/methodology/approach: Due to the nature of entrepreneurship issues, which are multifaceted and full of uncertain, indeterminate and ambiguous dimensions, this measurement requires multi-criteria decision-making methods in spaces of uncertainty and indeterminacy. Also, due to the change in the size of indicators in different periods, researchers need a special type of decision model that can handle the dynamics of indicators. So, in this paper, the authors proposed a dynamic neutrosophic weighted geometric operator to aggregate dynamic neutrosophic information. Furthermore, in view of the deficiencies of current dynamic neutrosophic MADM methods a compromised model based on time degrees was proposed. The principle of time degrees was introduced, and the subjective and objective weighting methods were synthesized based on the proposed aggregated operator and a nonlinear programming problem based on the entropy concept was applied to determine the attribute weights under different time sequence. Findings: The information of ten countries with the indicators such as connections (C), the country's level of education and experience (EE), cultural aspects (CA), government policies (GP) and funding (F) over four years was gathered and the proposed dynamic MADM model to assess the level of entrepreneurial support for these countries. The findings show that the flexibility of the model based on decision-making thought and we can see that the weights of the criteria have a considerable impact on the final evaluations. Originality/value: In many decision areas the original decision information is usually collected at different periods. Thus, it is necessary to develop some approaches to deal with these issues. In the government entrepreneurship support problem, the researchers need tools to handle the dynamics of indicators in neutrosophic environments. Given that this issue is very important, nonetheless as far as is known, few studies have been done in this area. Furthermore, in view of the deficiencies of current dynamic neutrosophic MADM making methods a compromised model based on time degrees was proposed. Moreover, the presented neutrosophic aggregation operator is very suitable for aggregating the neutrosophic information collected at different periods. The developed approach can solve the several problems where all pieces of decision information take the form of neutrosophic information collected at different periods. [ABSTRACT FROM AUTHOR]

Published

2023

35. Simplified Levenberg–Marquardt Method in Hilbert Spaces.

Author

Mahale, Pallavi and Shaikh, Farheen M.

Subjects

HILBERT space, NONLINEAR operators, COMMERCIAL space ventures, OPERATOR equations, NONLINEAR equations

Abstract

In 2010, Qinian Jin considered a regularized Levenberg–Marquardt method in Hilbert spaces for getting stable approximate solution for nonlinear ill-posed operator equation F ⁢ (x) = y , where F : D ⁢ (F) ⊂ X → Y is a nonlinear operator between Hilbert spaces X and Y and obtained rate of convergence results under an appropriate source condition. In this paper, we propose a simplified Levenberg–Marquardt method in Hilbert spaces for solving nonlinear ill-posed equations in which sequence of iteration { x n δ } is defined as x n + 1 δ = x n δ - ( α n ⁢ I + F ′ ⁢ (x 0) * ⁢ F ′ ⁢ (x 0) ) - 1 ⁢ F ′ ⁢ (x 0) * ⁢ (F ⁢ (x n δ) - y δ) . Here { α n } is a decreasing sequence of nonnegative numbers which converges to zero, F ′ ⁢ (x 0) denotes the Fréchet derivative of F at an initial guess x 0 ∈ D ⁢ (F) for the exact solution x † and (F ′ ⁢ (x 0)) * denote the adjoint of F ′ ⁢ (x 0) . In our proposed method, we need to calculate Fréchet derivative of F only at an initial guess x 0 . Hence, it is more economic to use in numerical computations than the Levenberg–Marquardt method used in the literature. We have proved convergence of the method under Morozov-type stopping rule using a general tangential cone condition. In the last section of the paper, numerical examples are presented to demonstrate advantages of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2023

36. Simplified Levenberg–Marquardt method in Banach spaces for nonlinear ill-posed operator equations.

Author

Mahale, Pallavi and Shaikh, Farheen M.

Subjects

NONLINEAR operators, BANACH spaces, OPERATOR equations, HILBERT space

Abstract

In 2011, Jin Qinian has proposed a Levenberg–Marquardt method, by making use of duality mapping and the Bregman distance, to get an approximate solution of a nonlinear ill-posed operator equation in Banach space using an a posteriori parameter choice strategy and Morozov-type stopping rule. The method considered by Jin Qinian was an extension of the method proposed by M. Hanke in 1997 for the Hilbert space case. In this paper, we suggest a modified variant of the method, namely, the simplified Levenberg–Marquardt scheme in Banach spaces. The advantage of the method considered in the paper is that, it is also applicable for the operator equation with non-smooth operator. We establish convergence of the method under a modified a posteriori parameter choice strategy which is more feasible than the one considered by Jin Qinian (2011). Numerical example to demonstrate the validity of the considered method is discussed. [ABSTRACT FROM AUTHOR]

Published

2023

37. Convergence analysis of iteratively regularized Gauss–Newton method with frozen derivative in Banach spaces.

Author

Mittal, Gaurav and Giri, Ankik Kumar

Subjects

GAUSS-Newton method, BANACH spaces, INVERSE problems, RATE setting, NONLINEAR operators

Abstract

In this paper, we consider the iteratively regularized Gauss–Newton method with frozen derivative and formulate its convergence rates in the settings of Banach spaces. The convergence rates of iteratively regularized Gauss–Newton method with frozen derivative are well studied via generalized source conditions. We utilize the recently developed concept of conditional stability of the inverse mapping to derive the convergence rates. Also, in order to show the practicality of this paper, we show that our results are applicable on an ill-posed inverse problem. Finally, we compare the convergence rates derived in this paper with the existing convergence rates in the literature. [ABSTRACT FROM AUTHOR]

Published

2022

38. Properties of the free boundary near the fixed boundary of the double obstacle problems.

Author

Jinwan Park

Subjects

BOUNDARY value problems, NONLINEAR operators, LAPLACIAN operator, MATHEMATICS, MATHEMATICAL programming

Abstract

In this paper, we study the tangential touch and C¹ regularity of the free boundary near the fixed boundary of the double obstacle problem for Laplacian and fully nonlinear operator. The main idea to have the properties is regarding the upper obstacle as a solution of the single obstacle problem. Then, in the classification of global solutions of the double problem, it is enough to consider only two cases for the upper obstacle, a/2 xn² or a/2 xn² + bxnx1 for some b ∈ ℝ, b ≠ 0. The second one is a new type of upper obstacle, which does not exist in the study of local regularity of the free boundary of the double problem. Thus, in this paper, a new type of difficulties that come from the second type upper obstacle is mainly studied. [ABSTRACT FROM AUTHOR]

Published

2022

39. Learning Symbolic Expressions: Mixed-Integer Formulations, Cuts, and Heuristics.

Author

Kim, Jongeun, Leyffer, Sven, and Balaprakash, Prasanna

Subjects

*NONLINEAR operators, *DATA libraries, *SCIENTIFIC computing, *APPLIED mathematics, *SQUARE root, *HEURISTIC

Abstract

In this paper, we consider the problem of learning a regression function without assuming its functional form. This problem is referred to as symbolic regression. An expression tree is typically used to represent a solution function, which is determined by assigning operators and operands to the nodes. Cozad and Sahinidis propose a nonconvex mixed-integer nonlinear program (MINLP), in which binary variables are used to assign operators and nonlinear expressions are used to propagate data values through nonlinear operators, such as square, square root, and exponential. We extend this formulation by adding new cuts that improve the solution of this challenging MINLP. We also propose a heuristic that iteratively builds an expression tree by solving a restricted MINLP. We perform computational experiments and compare our approach with a mixed-integer program–based method and a neural network–based method from the literature. History: Accepted by Pascal Van Hentenryck, Area Editor for Computational Modeling: Methods & Analysis. Funding: This work was supported by the Applied Mathematics activity within the U.S. Department of Energy, Office of Science, Advanced Scientific Computing Research [Grant DE-AC02-06CH11357]. Supplemental Material: The software that supports the findings of this study is available within the paper and its Supplemental Information (https://pubsonline.informs.org/doi/suppl/10.1287/ijoc.2022.0050) as well as from the IJOC GitHub software repository (https://github.com/INFORMSJoC/2022.0050). The complete IJOC Software and Data Repository is available at https://informsjoc.github.io/. [ABSTRACT FROM AUTHOR]

Published

2023

40. A new sufficiently descent algorithm for pseudomonotone nonlinear operator equations and signal reconstruction.

Author

Awwal, Aliyu Muhammed and Botmart, Thongchai

Subjects

OPERATOR equations, SIGNAL reconstruction, NONLINEAR equations, LIPSCHITZ continuity, NONLINEAR operators, ALGORITHMS

Abstract

This paper presents a new sufficiently descent algorithm for system of nonlinear equations where the underlying operator is pseudomonotone. The conditions imposed on the proposed algorithm to achieve convergence are Lipschitz continuity and pseudomonotonicity which is weaker than monotonicity assumption forced upon many algorithms in this area found in the literature. Numerical experiments on selected test problems taken from the literature validate the efficiency of the new algorithm. Moreover, the new algorithm demonstrates superior performance in comparison with some existing algorithms. Furthermore, the proposed algorithm is applied to reconstruct some disturbed signals. [ABSTRACT FROM AUTHOR]

Published

2023

41. Risk-Sensitivity Vanishing Limit for Controlled Markov Processes.

Author

Dai, Yanan and Chen, Jinwen

Subjects

PARTIALLY observable Markov decision processes, MARKOV processes, NONLINEAR operators

Abstract

In this paper, we prove that the optimal risk-sensitive reward for Markov decision processes with compact state space and action space converges to the optimal average reward as the risk-sensitive factor tends to 0. In doing so, a variational formula for the optimal risk-sensitive reward is derived. An extension of the Kreĭn-Rutman Theorem to certain nonlinear operators is involved. Based on these, partially observable Markov decision processes are also investigated. A portfolio optimization problem is presented as an example of an application of the approach, in which a duality-relation between the maximization of risk-sensitive reward and the maximization of upside chance for out-performance over the optimal average reward is established. [ABSTRACT FROM AUTHOR]

Published

2023

42. On Inequalities and Filtration Associated with the Nonlinear Fractional Operator.

Author

Nazir, Maryam, Bukhari, Syed Zakir Hussain, Ro, Jong-Suk, Tchier, Fairouz, and Malik, Sarfraz Nawaz

Subjects

NONLINEAR operators, DIFFERENTIAL operators, DIFFERENTIAL inequalities, FILTERS & filtration

Abstract

In this paper, we study a new filtration class MF α , β μ , associated with the filtration of infinitesimal generators, by using the nonlinear fractional differential operator and study certain properties, like sharp Fekete–Szegö inequalities and filtration problems. [ABSTRACT FROM AUTHOR]

Published

2023

43. On an Iterative Method of Solving Direct and Inverse Problems for Parabolic Equations.

Author

Boykov, I. V. and Ryazantsev, V. A.

Subjects

*NUMERICAL integration, *NONLINEAR equations, *NONLINEAR operators, *EQUATIONS, *OPERATOR equations, *INVERSE problems

Abstract

This paper is devoted to approximate methods of solving direct and inverse problems for parabolic equations. An approximate method to solve the initial problem of a multidimensional nonlinear parabolic equation has been proposed. It is based on reducing the initial problem to a nonlinear multidimensional Fredholm intergral equation of the second kind, which is approximated by a system of nonlinear algebraic equatiions using a method of mechanical quadratures. In constructing a computational scheme, the points of local splines have been applied for optimal with respect to order approximation of a functional class that contains the solutions of parabolic equations. For the numerical implementation of the computational scheme, we have used the generalization of a continuous method of solving nonlinear operator equations that is described in the paper. In addition, the inverse problem of a parabolic equation with a fractional order derivative with respect to a time variable has been studied. Approximate methods of determining the fractional order of the time derivative and a coefficient at a spatial derivative have been proposed. [ABSTRACT FROM AUTHOR]

Published

2023

44. On Darbo's fixed point principle.

Author

Taoudi, Mohamed Aziz

Subjects

FIXED point theory, BANACH spaces, INTERSECTION theory, CONVEX sets, NONLINEAR operators

Abstract

In this paper, we prove the following generalization of the classical Darbo fixed point principle : Let X be a Banach space and µ be a montone measure of noncompactness on X which satisfies the generalized Cantor intersection property. Let C be a nonempty bounded closed convex subset of X and T : C → C be a continuous mapping such that for any countable set Ω ⊂ C, we have µ(T(Ω)) ≤ kµ(Ω), where k is a constant, 0 ≤ k < 1. Then T has at least one fixed point in C. The proof is based on a combined use of topological methods and partial ordering techniques and relies on the Schauder and the Knaster-Tarski fixed point principles. [ABSTRACT FROM AUTHOR]

Published

2023

45. GLOBAL CARLEMAN ESTIMATE AND STATE OBSERVATION PROBLEM FOR GINZBURG-LANDAU EQUATION.

Author

FANGFANG DOU, XIAOYU FU, ZHONGHUA LIAO, and XIAOMIN ZHU

Subjects

NONLINEAR operators, EQUATIONS

Abstract

In this paper, we prove a global Carleman estimate for the complex Ginzburg-Landau operator with a cubic nonlinear term in a bounded domain of Rn, n = 2, 3. As applications, we study state observation problems for the Ginzburg-Landau equation. [ABSTRACT FROM AUTHOR]

Published

2023

46. A general common fixed point theorem for a pair of mappings in S - metric spaces.

Author

Popa, Valeriu and Patriciu, Alina-Mihaela

Subjects

FIXED point theory, METRIC spaces, ANALYTIC mappings, NONLINEAR operators, GENERALIZED spaces

Abstract

The purpose of this paper is to prove a common fixed point theorem for a pair of mappings satisfying an implicit relation, generalizing the main results from [6], [10], [11], [13] and other papers. [ABSTRACT FROM AUTHOR]

Published

2021

47. On Positive Bounded Solutions of One Class of Nonlinear Integral Equations with the Hammerstein–Nemytskii Operator.

Author

Khachatryan, A. Kh., Khachatryan, Kh. A., and Petrosyan, H. S.

Subjects

OPERATOR equations, MONOTONE operators, NONLINEAR operators, NONLINEAR integral equations, OPERATOR theory, INTEGRABLE functions, REAL variables

Abstract

We study a class of nonlinear integral equations with a noncompact Hammerstein– Nemytskii operator on the entire line. Some special cases of such equations have specific applications in various fields of natural science. The combination of a method for constructing invariant cone segments for the corresponding nonlinear monotone operator with methods of the theory of functions of a real variable allows one to prove a constructive theorem on the existence of bounded positive solutions of equations of the class under consideration. The asymptotic behavior of the solution at is studied as well. In particular, we prove that the solution constructed in the paper is an integrable function on the negative half-line and that the difference between the limit at and the solution is integrable on the positive half-line. In one special case, we show that our solution generates a one-parameter family of bounded positive solutions. At the end of the paper, we give specific applied examples of nonlinearities to illustrate the results. [ABSTRACT FROM AUTHOR]

Published

2021

48. A consistent estimation of optimal dividend strategy in a risk model with delayed claims.

Author

Tan, Jiyang, Yang, Yang, Liu, Shuren, and Xiang, Kainan

Subjects

DIVIDENDS, NONLINEAR operators, INSURANCE companies, SAMPLE size (Statistics)

Abstract

In this paper, we study how to estimate the optimal dividend strategy in a discrete-time risk model with delayed claims. The insurance company pays dividends to shareholders, and each dividend is taxable. The company controls the dividend payments to maximize the expectation of accumulated discounted dividends after tax prior to ruin. This paper aims to develop a method to estimate the optimal dividend strategy by using historical data directly. For the purpose we construct a nonlinear stochastic operator on the space l ∞ , which is proved to have contraction property. Fortunately the stochastic fixed point of the operator converges to a real sequence in probability, from which a consistent estimator of the optimal strategy follows. This is an important advantage of the stochastic operator method because the consistency property is difficult to be obtained by traditional methods with estimated distributions for claims. Finally, the method is applied in an example. The estimation results by using simulation data show that the optimal dividend strategy is a conditional threshold strategy, and the optimal dividend threshold tends to be stable with the sample size increasing. [ABSTRACT FROM AUTHOR]

Published

2022

49. Inertial Invariant Manifolds of a Nonlinear Semigroup of Operators in a Hilbert Space.

Author

Kulikov, A. N.

Subjects

*HILBERT space, *INVARIANT manifolds, *NONLINEAR operators, *ORDINARY differential equations

Abstract

In this paper, we examine the existence and analyze properties of inertial manifolds of a nonlinear semigroup of operators in a Hilbert space. This questions were studied in a general setting that allows generalizing results of the well-known works of K. Foias, J. Sell, and R. Temam. Our reasoning is based on the scheme of proofs of similar assertions proposed earlier by S. Sternberg and F. Hartman for ordinary autonomous differential equations. [ABSTRACT FROM AUTHOR]

Published

2024

50. Nonlinear parabolic double phase variable exponent systems with applications in image noise removal.

Author

Charkaoui, Abderrahim, Ben-Loghfyry, Anouar, and Zeng, Shengda

Subjects

*NONLINEAR partial differential operators, *IMAGING systems, *IMAGE reconstruction, *IMAGE denoising, *MAGNETIC resonance imaging, *NONLINEAR operators

Abstract

In this paper, a novel parabolic system involving nonlinear and nonhomogeneous partial differential operator with variable growth structure is introduced for investigating the image denoising and restoration. More precisely, our model is based on regularizing the classical models involving variable exponent operators by considering a nonlinear operator with double phase flux. We begin by investigating theoretically the solvability to the parabolic system under consideration. Under the setting of Musielak-Orlicz spaces, we build a suitable functional framework to study the proposed system. Therefore, we develop the Faedo-Galerkin approach to demonstrate the existence and uniqueness of a weak solution to our model. To illustrate our theoretical results in the context of image noise removal, we present various numerical implementations on some grayscale images. To enrich these simulations, we test the robustness efficiency of the proposed model in the so-called Magnetic Resonance Images (MRI). The obtained numerical results claim that our model is more efficient and robust against noise, in comparison (visually and quantitatively) to some existing state-of-the-art methods. • A novel nonlinear parabolic system is introduced. • The theoretical results are applied to the image denoising and restoration. • Various numerical implementations on some grayscale images are carried out. [ABSTRACT FROM AUTHOR]

Published

2024