Showing total 167 results

1. Stability for localized integral operators on weighted spaces of homogeneous type.

Author

Fang, Qiquan, Shin, Chang Eon, and Tao, Xiangxing

Subjects

HOMOGENEOUS spaces, INTEGRAL operators, LINEAR operators, NUMERICAL analysis, OPERATOR algebras, MATHEMATICS

Abstract

Linear operators with off‐diagonal decay appear in many areas of mathematics including harmonic and numerical analysis, and their stability is one of the basic assumptions. In this paper, we consider a family of localized integral operators in the Beurling algebra with kernels having mild singularity near the diagonal and certain Hölder continuity property, and prove that their weighted stabilities for different exponents and Muckenhoupt weights are equivalent to each other on a space of homogeneous type with Ahlfors regular measure. [ABSTRACT FROM AUTHOR]

Published

2023

2. Experimental Approximate Solutions of Nonlinear Discrete Oscillation with Parametric Excitation.

Author

Tanaka, Toshiyuki

Subjects

OSCILLATIONS, NONLINEAR systems, SYSTEMS theory, EQUATIONS, MATHEMATICS, NUMERICAL analysis

Abstract

In the analysis of a discrete nonlinear system, one of the important problems is to derive a steady solution for the nonlinear difference equation characterizing the system. However, the study for the solution method of the difference system has not been sufficient, and examples of the methods being applied to the parametric oscillation are few. This paper presents a method which derives the steady solution for the quasi-linear difference equation containing a periodic parametric excitation in its weakly nonlinear function with small parameter ∊. In this method the harmonic balance and the averaging methods used in the solution of the continuous nonlinear differential equation are ape plied to the discrete system. Since the non-linear term in the equation is bounded by ∊, the discrete waveform in the steady state is almost sinusoidal. This paper presents numerical examples for the solutions by the two methods, assuming the solution as the discrete oscillation corresponding to the sinusoid of the continuous system. As a result, the same solution is obtained by either method. Comparing the result with the output waveform obtained directly by the numerical calculation for the fundamental equation, the validity of the approximate solution by the proposed method was verified. [ABSTRACT FROM AUTHOR]

Published

1989

3. Complex Coefficient Reference Networks with Transmission Zeros on Imaginary Axis.

Author

Yamazaki, Osamu and Takahashi, Shin-ichi

Subjects

TRANSFER functions, ELECTRIC resistors, REACTANCE (Electricity), DIGITAL filters (Mathematics), NUMERICAL analysis, DIGITAL electronics, MATHEMATICS

Abstract

This paper considers the complex coefficient transfer function with transmission zeros on the imaginary axis and presents a method to realize such a transfer function by a reactance network including imaginary resistors with double resistor termination. Using the obtained network and the reference network for the complex-wave digital filter, the complex digital filter with transmission zeros on the imaginary axis can easily be extended, which is important in practice. In this paper, Brune's method modified by Belevitch as well as Fujisawa's method extended by Morimoto et. al. are improved and the realizability condition is relaxed. Then, several construction examples are shown an the features of construction methods are compared and discussed. [ABSTRACT FROM AUTHOR]

Published

1995

4. New Lyapunov-type inequalities for a class of even-order linear differential equations.

Author

Yang, Xiaojing and Lo, Kueiming

Subjects

DIFFERENTIAL equations, NUMERICAL analysis, MATHEMATICAL analysis, ALGEBRA, MATHEMATICS

Abstract

In this paper, we obtain some new Lyapunov-type inequalities for a class of even-order linear differential equations, the results are new and generalize and improve some early results in this field. [ABSTRACT FROM AUTHOR]

Published

2015

5. Acceleration of the Steepest Descent Method for the Real Symmetric Eigenvalue Problem.

Author

Ozeki, Takashi and Iijima, Taizo

Subjects

EIGENVALUES, MATRICES (Mathematics), METHOD of steepest descent (Numerical analysis), NUMERICAL analysis, MATHEMATICAL analysis, ELECTRONICS, MATHEMATICS

Abstract

This paper discusses the eigenvalue problem for the real symmetric matrix, especially the determination of the largest eigenvalue. The largest eigenvalue is the maximum extremum of the objective function called the Rayleigh quotient and can be determined by the steepest descent method. It is known, however, that the steepest descent method suffers from slow convergence because it converges linearly. Especially, when the largest and the nest largest eigenvalues have very close values, the convergence is particularly slow. This paper analyzes this situation and shows that the convergence can be accelerated by combining the steepest descent method with a technique called shaking. Finally, it is demonstrated by a numerical example that the convergence is accelerated drastically by the proposed technique. [ABSTRACT FROM AUTHOR]

Published

1996

6. Implementation of directional simulation to estimate outcrossing rates in time‐variant reliability analysis of structures.

Author

Moarefzadeh, Mohammad Reza and Sudret, Bruno

Subjects

SIMULATION methods & models, RELIABILITY in engineering, NUMERICAL analysis, MATHEMATICS, COMPUTATIONAL mathematics

Abstract

Time‐dependent reliability analysis of structures by the use of an outcrossing approach normally requires the so‐called outcrossing rate to be estimated. A variety of methods has been recorded in the literature to evaluate this rate both for continues and discrete processes. Despite the availability of these methods, still more general and at the same time less sophisticated approaches are desired. In this paper, attempt is made to use the basic idea of "parallel system reliability formulation" to calculate the outcrossing rate for circumstances where the processes are continuous. These calculations are carried out by directional simulation. It is shown that this approach is simple to implement and may be used for the cases where the problem involves nonstationary processes and also for the cases where several limit state functions may have to be considered. [ABSTRACT FROM AUTHOR]

Published

2018

7. Uniqueness of electrical currents in a network of finite total resistance.

Author

Georgakopoulos, Agelos

Subjects

ELECTRIC currents, FINITE element method, INFINITY (Mathematics), NUMERICAL analysis, MATHEMATICS

Abstract

We show that if the sum of the resistances of an electrical network N is finite, then there is a unique electrical current in N, provided that we do not allow, in a sense made precise in the paper, any flow to escape to infinity. [ABSTRACT FROM PUBLISHER]

Published

2010

8. The delta envelope: A technique for dose distribution comparison.

Author

Blanpain, Baptiste and Mercier, David

Subjects

DRUG dosage, ELLIPSOIDS, DEVIATION (Statistics), NUMERICAL analysis, THERAPEUTICS, MATHEMATICS

Abstract

The γ index is a tool that compares a dose distribution with a reference distribution by combining dose-difference and distance-to-agreement criteria. It has been widely used for ten years despite its high computational cost. This cost is due to both a search process for each reference point and the necessity to remove overestimations caused by the discrete nature of dose grids. The method proposed in this paper is much faster since it avoids both these problems. It consists in computing the δ envelope formed by the γ ellipsoids around the points of the reference distribution. This δ envelope provides dose-difference tolerances that are then used to create new indices, called the δ indices, that provide useful information to interpret the deviations. Applied to both 1D and 2D test cases and compared to the γ index, the δ indices proved to be very accurate and intuitive. Their computational efficiency was evaluated on a 3D case: the δ envelope can be computed in 8 s on a 250×250×50 grid. Moreover it can be precomputed if the reference dose is known in advance. Then the δ indices are obtained in less than 2 s. [ABSTRACT FROM AUTHOR]

Published

2009

9. High-School Students' Approaches to Solving Algebra Problems that are Posed Symbolically: Results from an Interview Study.

Author

Huntley, Mary Ann and Davis, Jon D.

Subjects

STUDENTS, MATHEMATICS, EQUALITY, ALGEBRA, GRAPHIC calculators, EQUATIONS, NUMERICAL analysis, MANIPULATIVE behavior, MANIPULATION therapy

Abstract

A cross-curricular structured-probe task-based clinical interview study with 44 pairs of third year high-school mathematics students, most of whom were high achieving, was conducted to investigate their approaches to a variety of algebra problems. This paper presents results from three problems that were posed in symbolic form. Two problems are TIMSS items (a linear inequality and an equation involving square roots). The other problem involves square roots. We found that the majority of student pairs used symbol manipulation when solving the problems, and while many students seemed to prefer symbolic over graphical and tabular representations in their first attempt at solving the problems, we found that it was common for student pairs to use more than one strategy throughout the course of their solving. Students `use of graphing calculators to solve the problems is discussed. [ABSTRACT FROM AUTHOR]

Published

2008

10. Parallel coarse-grid selection.

Author

Alber, David M. and Olson, Luke N.

Subjects

MULTIGRID methods (Numerical analysis), ALGORITHMS, NUMERICAL analysis, LINEAR systems, MATHEMATICS

Abstract

Algebraic multigrid (AMG) is a powerful linear solver with attractive parallel properties. A parallel AMG method depends on efficient, parallel implementations of the coarse-grid selection algorithms and the restriction and prolongation operator construction algorithms. In the effort to effectively and quickly select the coarse grid, a number of parallel coarsening algorithms have been developed. This paper examines the behaviour of these algorithms in depth by studying the results of several numerical experiments. In addition, new parallel coarse-grid selection algorithms are introduced and tested. Copyright © 2007 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2007

11. Integrodifferential equations with applications to a plate equation with memory.

Author

Andrade, Bruno and Viana, Arlúcio

Subjects

INTEGRO-differential equations, DIFFERENTIAL operators, MATHEMATICS, NUMERICAL analysis, INTERPOLATION spaces

Abstract

In this paper we study local existence, uniqueness, and continuous dependence of an abstract integrodifferential equation. We also present a result on unique continuation and a blow-up alternative for mild solutions of the integrodifferential equation. Finally, we apply our results to an interesting strongly damped plate equation with memory. [ABSTRACT FROM AUTHOR]

Published

2016

12. Factorized sparse approximate inverse preconditionings. IV: Simple approaches to rising efficiency.

Author

Kolotilina, L. Yu., Nikishin, A.A., and Yeremin, A.Yu.

Subjects

FACTORIZATION, NUMERICAL analysis, MATRICES (Mathematics), MECHANICS (Physics), LINEAR algebra, MATHEMATICS

Abstract

This paper continues the theoretical and numerical study of the so-called factorized sparse approximate inverse (FSAI) preconditionings of symmetric positive-definite matrices and considers two new approaches to improving them. The first one is based on the a posteriori sparsification of an already constructed FSAI preconditioner, whereas the second one amounts to applying another FSAI preconditioning to an already preconditioned matrix. Numerical results for sample FE problems from structural mechanics are presented. Copyright © 1999 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

1999

13. SATIATION AND SWITCHING: THE DYNAMIC ATTRIBUTE SATIATION MODEL MEETS OBSERVED CHOICE PATTERNS.

Author

Sarigöllü, Emine

Subjects

MONTE Carlo method, MATHEMATICS, NUMERICAL analysis, NUMERICAL calculations, MATHEMATICAL linguistics, STATISTICS

Abstract

This paper extends our understanding of variety seeking behaviour, in general, and McAlister's dynamic attribute satiation (DAS) model, in particular. Detailed analysis of the DAS model - both descriptive and methodological is provided. First, a mathematical analysis based on hypothetical examples is provided to examine the qualitative properties of the model. Second, an estimation method for purchase data is proposed and tested using Monte-Carlo simulations. This method, by estimating the retention parameter for the first time, has enabled us to differentiate stochastic (random) switching from switching due to satiation (variety-seeking). [ABSTRACT FROM AUTHOR]

Published

1998

14. Design of FIR Partial Response Filters with Equiripple Stopband Attenuation (Class II, V).

Author

Takebe, Tsuyoshi, Matsumoto, Toyoji, and Chaisawadi, Ake

Subjects

DIGITAL filters (Mathematics), NUMERICAL analysis, FUNCTIONAL analysis, DIGITAL electronics, FILTERS (Mathematics), MATHEMATICS

Abstract

This paper considers the design of transmitter and receiver FIR digital filters with partial response of class II and V for data transmission, The filters are required to band-limit the transmitting and receiving signal, while maintaining the overall impulse response with zero intersymbol interference (ISI). Two cases are considered: 1) the case where the transmitter itself has the zero ISI impulse response; and 2) the case where the transmitter and receiver filters are matched. In the former, the length of the filter is set to be equal to the number of samples between two zero-cross points, which are at a certain symmetrical distance from the center of the ideal impulse response. Then a linear-phase transfer function is derived with an equiripple approximation to the ideal amplitude frequency response. In the approxiamtion, the weight in the stopband is set as less than 1, and ISI of less than 1 percent is obtained. In the design of the matched filter pair, the overall order is set in the same way as in the former. Applying the Herrman-Schuessler design method for the minimum phase-shift filter in the frequency domain, the transfer function is derived. To realize ISI of less than 1 percent, it suffices to set the weight in the stopband less than 5 times in the passband. Although an effort was made to decrease ISI by successive approximation with the mirror zeros as the parameters, only a slight improvement was obtained. In either case, class V requires approximately a twice higher order than class II to realize the same attenuation and ISI. [ABSTRACT FROM AUTHOR]

Published

1989

15. Protocol syntheses in a Petri net model with registers and its application.

Author

Yamaguchi, Hirozumi, Okano, Kozo, Higashino, Teruo, and Taniguchi, Kenichi

Subjects

PETRI nets, ALGORITHMS, RESOURCE allocation, MATHEMATICAL models, MATHEMATICS, COMMUNICATION, NUMERICAL analysis

Abstract

Some methods for synthesizing a protocol specification from a given service specification have been proposed using various computational models. However, the existing methods cannot treat service specifications including both complex control flows and system variables. In this paper, we propose a method for synthesizing a protocol specification automatically from a pair consisting of a service specification and a resource allocation. In our method, service specifications are described in an extended model of Petri nets, which can treat system variables. We have developed a pair consisting of a synthesis system and an execution system, and applied them to CSCW (Computer Supported Cooperative Work). © 1998 Scripta Technica, Electron Comm Jpn Pt 3, 81(8): 18–26, 1998 [ABSTRACT FROM AUTHOR]

Published

1998

16. Optimal Design Method of Separable-Denominator Two-Dimensional Digital Filters Based on a Genetic Algorithm.

Author

Kawamata, Masayuki, Imakubo, Jun, and Higuchi, Tatsuo

Subjects

DIGITAL filters (Mathematics), NUMERICAL analysis, DIGITAL electronics, GENETIC algorithms, TRANSFER functions, MATHEMATICS

Abstract

This paper proposes the optimal design for the separable-denominator two-dimensional digital filter, using the genetic algorithm (GA). The design proposed is for the specification in the frequency domain. The simple GA, which is the most basic among GA, is used in the proposed optimal design. The parameters of the transfer function of the separable-denominator two-dimensional digital filter are encoded into bit sequences, and then GA is applied to design the filter. By the use of the separable-denominator transfer function, the stability of the filter is completely guaranteed. The approximation error of the proposed method is compared to that of the conventional method through design examples. The convergence of GA is discussed. It is shown that the proposed optimal design can easily cope with the modification of the design specification of the two-dimensional digital filter. It is shown also that the filter can be designer using the maximum error or the absolute error sum as the error evaluation function in addition to the mean-square error. [ABSTRACT FROM AUTHOR]

Published

1995

17. Decoupled modified characteristics finite element method for the time dependent Navier-Stokes/Darcy problem.

Author

Si, Zhiyong, Wang, Yunxia, and Li, Shishun

Subjects

FINITE element method, NAVIER-Stokes equations, DARCY-Weisbach equation, NUMERICAL analysis, MATHEMATICS

Abstract

In this paper, a modified characteristics finite element method for the time dependent Navier-Stokes/Darcy problem with the Beavers-Joseph-Saffman interface condition is presented. In this method, the Navier-Stokes/Darcy equation is decoupled into two equations, one is the Navier-Stokes equation, the other is the Darcy equation, and the Navier-Stokes equation is solved by the modified characteristics finite element method. The theory analysis shows that this method has a good convergence property. In order to show the effect of our method, some numerical results was presented. The numerical results show that this method is highly efficient. Copyright © 2013 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2014

18. A direct coupling method for 3D hydroelastic analysis of floating structures.

Author

Kim, Ki‐Tae, Lee, Phill‐Seung, and Park, K. C.

Subjects

HYDRODYNAMICS, HYDROELASTICITY, FINITE element method, NUMERICAL analysis, MATHEMATICS

Abstract

SUMMARY This paper presents a complete formulation for three-dimensional hydrodynamic analysis of floating flexible structures subjected to surface regular waves, as well as other excitation forces, by employing a direct tight coupling method. The continuum mechanics-based finite element method is employed to model floating structures with arbitrary geometries, which can account for the geometric nonlinearities and initial stress effects that result from the hydrostatic analysis, whereas the boundary element method is used for the fluid via total potential formulation. The simplicity and generality of the present formulation are revealed as compared with the conventional formulation. Numerical examples demonstrate the general capability of the formulation proposed. Copyright © 2013 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2013

19. Representation of singular fields without asymptotic enrichment in the extended finite element method.

Author

Natarajan, Sundararajan and Song, Chongmin

Subjects

FINITE element method, NUMERICAL analysis, MATRICES (Mathematics), MATHEMATICS, CIVIL engineering

Abstract

SUMMARY In this paper, we replace the asymptotic enrichments around the crack tip in the extended finite element method (XFEM) with the semi-analytical solution obtained by the scaled boundary finite element method (SBFEM). The proposed method does not require special numerical integration technique to compute the stiffness matrix, and it improves the capability of the XFEM to model cracks in homogeneous and/or heterogeneous materials without a priori knowledge of the asymptotic solutions. A Heaviside enrichment is used to represent the jump across the discontinuity surface. We call the method as the extended SBFEM. Numerical results presented for a few benchmark problems in the context of linear elastic fracture mechanics show that the proposed method yields accurate results with improved condition number. A simple code is annexed to compute the terms in the stiffness matrix, which can easily be integrated in any existing FEM/XFEM code. Copyright © 2013 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2013

20. Modelling rigid line and Dirichlet boundary conditions with arbitrary geometry by intrinsic XFEM.

Author

Rashvand, A.

Subjects

DIRICHLET problem, BOUNDARY value problems, FINITE element method, NUMERICAL analysis, MATHEMATICS

Abstract

SUMMARY The most difficult aspect of modelling discontinuity on complicated domains is the mesh. In the extended finite element method (XFEM), the FE mesh need not conform to the internal boundaries. In the intrinsic XFEM, no additional unknowns are introduced at the nodes. Some of these discontinuities such as cracks, voids were developed in earlier papers. In the current work, the FE mesh is allowed to be independent of the rigid line (fixed DOFs path). Copyright © 2013 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2013

21. The digraphs and inclusion intervals of matrix singular values.

Author

Gui-Xian Tian, Ting-Zhu Huang, and Shu-Yu Cui

Subjects

DIRECTED graphs, NUMERICAL analysis, LINEAR algebra, MATRICES (Mathematics), MATHEMATICS, MATHEMATICAL analysis

Abstract

The paper investigates the inclusion intervals of matrix singular values. By employing the digraph of a matrix, some new inclusion intervals of matrix singular values are presented. These intervals are based mainly on the use of positive scale vectors and their intersections. Theoretic analysis and numerical examples show that these results improve and generalize some known results of Li et al. (Numer. Linear Algebra Appl. 2007; 14(2):115–128) and Kolotilina (J. Math. Sci. 2006; 137(3):4794–4800). Copyright © 2009 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2009

22. Backward perturbation analysis for scaled total least-squares problems.

Author

Chang, X.-W. and Titley-Peloquin, D.

Subjects

PERTURBATION theory, LEAST squares, NUMERICAL analysis, LINEAR algebra, MATHEMATICS

Abstract

The scaled total least-squares (STLS) method unifies the ordinary least-squares (OLS), the total least-squares (TLS), and the data least-squares (DLS) methods. In this paper we perform a backward perturbation analysis of the STLS problem. This also unifies the backward perturbation analyses of the OLS, TLS and DLS problems. We derive an expression for an extended minimal backward error of the STLS problem. This is an asymptotically tight lower bound on the true minimal backward error. If the given approximate solution is close enough to the true STLS solution (as is the goal in practice), then the extended minimal backward error is in fact the minimal backward error. Since the extended minimal backward error is expensive to compute directly, we present a lower bound on it as well as an asymptotic estimate for it, both of which can be computed or estimated more efficiently. Our numerical examples suggest that the lower bound gives good order of magnitude approximations, while the asymptotic estimate is an excellent estimate. We show how to use our results to easily obtain the corresponding results for the OLS and DLS problems in the literature. Copyright © 2009 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2009

23. Combining Significance of Correlated Statistics with Application to Panel Data.

Author

Demetrescu, Matei, Hassler, Uwe, and Tarcolea, Adina-Ioana

Subjects

STATISTICS, ASYMPTOTIC expansions, MATRIX logic, MATRICES (Mathematics), MONTE Carlo method, NUMERICAL analysis, STATISTICAL correlation, MATHEMATICS

Abstract

The inverse normal method, which is used to combine P-values from a series of statistical tests, requires independence of single test statistics in order to obtain asymptotic normality of the joint test statistic. The paper discusses the modification by Hartung (1999, Biometrical Journal, Vol. 41, pp. 849–855) , which is designed to allow for a certain correlation matrix of the transformed P-values. First, the modified inverse normal method is shown here to be valid with more general correlation matrices. Secondly, a necessary and sufficient condition for (asymptotic) normality is provided, using the copula approach. Thirdly, applications to panels of cross-correlated time series, stationary as well as integrated, are considered. The behaviour of the modified inverse normal method is quantified by means of Monte Carlo experiments. [ABSTRACT FROM AUTHOR]

Published

2006

24. Generalized Prikry forcing and iteration of generic ultrapowers.

Author

Sakai, Hiroshi

Subjects

CARDINAL numbers, SET theory, MATHEMATICAL logic, ITERATIVE methods (Mathematics), NUMERICAL analysis, MATHEMATICS

Abstract

It is known that there is a close relation between Prikry forcing and the iteration of ultrapowers: If U is a normal ultrafilter on a measurable cardinal κ and 〈Mn, jm,n | m ≤ n ≤ ω〉 is the iteration of ultrapowers of V by U, then the sequence of critical points 〈j0,n(κ) | n ∈ ω〉 is a Prikry generic sequence over Mω. In this paper we generalize this for normal precipitous filters. (© 2005 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim) [ABSTRACT FROM AUTHOR]

Published

2005

25. Robust optimal multilevel preconditioners for non-conforming finite element systems<FNR></FNR><FN>Dedicated to Professor Owe Axelsson on the occasion of his 70th birthday, with respect and appreciation </FN>.

Author

Blaheta, R., Margenov, S., and Neytcheva, M.

Subjects

FINITE element method, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS, LINEAR systems

Abstract

We consider strategies to construct optimal order two- and multilevel hierarchical preconditioners for linear systems as arising from the finite element discretization of self-adjoint second order elliptic problems using non-conforming Crouzeix–Raviart linear elements. In this paper we utilize the hierarchical decompositions, derived in a previous work by the same authors (Numerical Linear Algebra with Applications 2004; 11:309–326) and provide a further analysis of these decompositions in order to assure robustness with respect to anisotropy. Finally, we show how to construct both multiplicative and additive versions of the algebraic multilevel iteration preconditioners and show robustness and optimal order convergence estimates. Copyright © 2005 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2005

26. Minimal Solutions for a Class of Elliptic Systems.

Author

Montenegro, Marcelo

Subjects

SET theory, MATHEMATICAL analysis, CURVES, ELLIPTIC coordinates, BOUNDARY element methods, MATHEMATICS, NUMERICAL analysis

Abstract

There exists a set U in the plane, such that elements of U correspond to minimal stable solutions of a two-parameter elliptic system. For points on the boundary ϒ of U, there exist weak solutions to the elliptic system. The paper studies the properties of the curve ϒ. 2000 Mathematics Subject Classification 35J55, 35B05, 35K50, 35K55. [ABSTRACT FROM PUBLISHER]

Published

2005

27. A Unified Approach to the Characterization of Equivalence Classes of DAGs, Chain Graphs with no Flags and Chain Graphs.

Author

Roverato, Alberto

Subjects

MARKOV processes, STOCHASTIC processes, NUMERICAL solutions for Markov processes, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS

Abstract

A Markov property associates a set of conditional independencies to a graph. Two alternative Markov properties are available for chain graphs (CGs), the Lauritzen–Wermuth–Frydenberg (LWF) and the Andersson–Madigan– Perlman (AMP) Markov properties, which are different in general but coincide for the subclass ofCGs with no flags. Markov equivalence induces a partition of the class of CGs into equivalence classes and every equivalence class contains a, possibly empty, subclass of CGs with no flags itself containing a, possibly empty, subclass of directed acyclic graphs (DAGs). LWF-Markov equivalence classes of CGs can be naturally characterized by means of the so-calledlargest CGs, whereas a graphical characterization of equivalence classes of DAGs is provided by theessential graphs. In this paper, we show the existence of largest CGs with no flags that provide a natural characterization of equivalence classes of CGs of this kind, with respect to both the LWF- and the AMP-Markov properties. We propose a procedure for the construction of the largest CGs, the largest CGs with no flags and the essential graphs, thereby providing a unified approach to the problem. As by-products we obtain a characterization of graphs that are largest CGs with no flags and an alternative characterization of graphs which are largest CGs. Furthermore, a known characterization of the essential graphs is shown to be a special case of our more general framework. The three graphical characterizations have a common structure: they use two versions of a locally verifiable graphical rule. Moreover, in case of DAGs, an immediate comparison of three characterizing graphs is possible. [ABSTRACT FROM AUTHOR]

Published

2005

28. Some linear algebra issues concerning the implementation of blended implicit methods.

Author

Brugnano, Luigi and Magherini, Cecilia

Subjects

LINEAR algebra, NUMERICAL analysis, MATHEMATICAL analysis, ALGEBRA, MATHEMATICS, JACOBIAN matrices

Abstract

In this paper we discuss some linear algebra issues concerning the implementation of blended implicit methods (J. Comput. Appl. Math. 2000; 116:41–62, Appl. Numer. Math. 2002; 42:29–45, J. Comput. Appl. Math. 2004; 164–165:145–158, In Recent Trends in Numerical Analysis, Trigiante D (ed.), Nova Science Publication Inc.: New York, 2001; 81–105) for the numerical solution of ODEs. In particular, we describe the strategies, used in the numerical code BiM (J. Comput. Appl. Math. 2004; 164–165:145–158), for deciding whether re-evaluating the Jacobian and/or the factorization involved in the non-linear splitting for solving the discrete problem. Copyright © 2004 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2005

29. Investigation of numerical time-integrations of Maxwell's equations using the staggered grid spatial discretization.

Author

Faragó, I., Horváth, R., and Schilders, W. H. A.

Subjects

MAXWELL equations, PARTIAL differential equations, ELECTROMAGNETIC theory, NUMERICAL analysis, MATHEMATICS

Abstract

The Yee-method is a simple and elegant way of solving the time-dependent Maxwell's equations. On the other hand, this method has some inherent drawbacks too. The main one is that its stability requires a very strict upper bound for the possible time-steps. This is why, during the last decade, the main goal was to construct such methods that are unconditionally stable. This means that the time-step can be chosen based only on accuracy instead of stability considerations. In this paper we give a uniform treatment of methods that use the same spatial staggered grid approximation as the classical Yee-method. Three other numerical methods are discussed: the Namiki–Zheng–Chen–Zhang alternating direction implicit method (NZCZ), the Kole–Figge-de Raedt method (KFR) and a Krylov-space method. All methods are discussed with non-homogeneous material parameters. We show how the existing finite difference numerical methods are based on the approximation of a matrix exponential. With this formulation we prove the unconditional stability of the NZCZ method without any computer algebraic tool. Moreover, we accelerate the Krylov-space method with a skew-symmetric formulation of the semi-discretized equations. Our main goal is to compare the methods from the point of view of the computational speed. This question is investigated in ID numerical tests. Copyright © 2005 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2005

30. ON A FLUCTUATION IDENTITY FOR RANDOM WALKS AND LVY PROCESSES.

Author

L. ALILI, L. CHAUMONT, and R. A. DONEY

Subjects

RANDOM walks, INVESTMENT analysis, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICS

Abstract

In this paper, some identities in laws involving ladder processes for random walks and Lvy processes are extended and unified. [ABSTRACT FROM AUTHOR]

Published

2005

31. A GENERIC IDENTIFICATION THEOREM FOR GROUPS OF FINITE MORLEY RANK.

Author

AYŞE BERKMAN and ALEXANDRE V. BOROVIK

Subjects

FINITE element method, NUMERICAL analysis, INTEGRAL theorems, INTEGRALS, MATHEMATICS

Abstract

The paper contains a final identification theorem for the ‘generic’ $K^*$-groups of finite Morley rank. [ABSTRACT FROM AUTHOR]

Published

2004

32. A short proof of the preservation of the ωω-bounding property.

Author

Schlindwein, Chaz

Subjects

ITERATIVE methods (Mathematics), NUMERICAL analysis, MATHEMATICAL logic, MATHEMATICS, MATHEMATICAL analysis, BOUNDARY element methods

Abstract

There are two versions of the Proper Iteration Lemma. The stronger (but less well-known) version can be used to give simpler proofs of iteration theorems (e.g., [7, Lemma 24] versus [9, Theorem IX.4.7]). In this paper we give another demonstration of the fecundity of the stronger version by giving a short proof of Shelah's theorem on the preservation of the ωω-bounding property. (© 2003 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim) [ABSTRACT FROM AUTHOR]

Published

2004

33. Substitutive divergent bases for FEM modelling of field singularities near a wedge.

Author

Masoni, Juri, Pelosi, Giuseppe, and Selleri, Stefano

Subjects

FINITE element method, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICAL singularities, MATHEMATICS

Abstract

A finite-element implementation for the analysis of propagation constants and fields in a guiding structure is presented in this paper. The solution explicitly takes into account the field divergence on the edges of the internal wedges by exploiting substitutive divergent bases. © 2005 Wiley Periodicals, Inc. Microwave Opt Technol Lett 44: 327–328, 2005; Published online in Wiley InterScience (www.interscience.wiley.com). DOI 10.1002/mop.20624 [ABSTRACT FROM AUTHOR]

Published

2005

34. Quotient Fields of a Model of IΔ0 + Ω1.

Author

D'Aquino, Paola

Subjects

MATHEMATICAL analysis, MATHEMATICS, NUMERICAL analysis, MATHEMATICAL models, SIMULATION methods & models, OPERATIONS research

Abstract

In [4] the authors studied the residue field of a model M of IΔ0 + Ω1 for the principal ideal generated by a prime p. One of the main results is that M/ has a unique extension of each finite degree. In this paper we are interested in understanding the structure of any quotient field of M, i.e. we will study the quotient M/I for I a maximal ideal of M. We prove that any quotient field of M satisfies the property of having a unique extension of each finite degree. We will use some of Cherlin's ideas from [3], where he studies the ideal theory of non standard algebraic integers. [ABSTRACT FROM AUTHOR]

Published

2001

35. Algebraic Logic for Rational Pavelka Predicate Calculus.

Author

Drăgulici, Daniel and Georgescu, George

Subjects

MATHEMATICAL analysis, ALGEBRA, MATHEMATICS, ALGORITHMS, CALCULUS, NUMERICAL analysis

Abstract

In this paper we define the polyadic Pavelka algebras as algebraic structures for Rational Pavelka predicate calculus (RPL∀). We prove two representation theorems which are the algebraic counterpart of the completness theorem for RPL∀. [ABSTRACT FROM AUTHOR]

Published

2001

36. On Meshless Collocation Approximations of Conservation Laws: Preliminary Investigations on Positive Schemes and Dissipation Models.

Author

Fürst, J. and Sonar, Th.

Subjects

GEOMETRY, EQUATIONS, ALGEBRA, NUMERICAL analysis, MATHEMATICS

Abstract

We consider meshless collocation methods for the numerical solution of transport processes described by hyperbolic conservation laws. The future goal is the construction of a robust and reliable meshfree discretization method for the equations of gas dynamics in complex geometries. In this paper we start with the simplest scalar model problems and analyze basic problems occurring in the grid-free approach. A topological condition on clouds of points is derived and several possible versions of a generalized Lax-Friedrichs scheme are discussed with respect to their numerical dissipation. A moving least-squares approach is followed to construct a positive discretization for solutions with shocks which is thoroughly analyzed and applied to test problems. [ABSTRACT FROM AUTHOR]

Published

2001

37. A robust AINV-type method for constructing sparse approximate inverse preconditioners in factored form.

Author

Kharchenko, S.A., Kolotilina, L.Yu., Nikishin, A.A., and Yeremin, A. Yu.

Subjects

LINEAR algebra, MATRICES (Mathematics), NUMERICAL analysis, MATHEMATICAL analysis, ROBUST control, MATHEMATICS

Abstract

This paper suggests a new method, called AINV-A, for constructing sparse approximate inverse preconditioners for positive-definite matrices, which can be regarded as a modification of the AINV method proposed by Benzi and Túma. Numerical results on SPD test matrices coming from different applications demonstrate the robustness of the AINV-A method and its superiority to the original AINV approach. Copyright © 2001 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2001

38. UNCONDITIONALLY STABLE FEM FOR TRANSIENT LINEAR HEAT CONDUCTION ANALYSIS.

Author

Qin, Q. H.

Subjects

*HEAT conduction, *NUMERICAL analysis, *FINITE element method, *THERMAL diffusivity, *HEAT, *MATHEMATICS

Abstract

The paper presents a new method for the numerical solution of transient linear heat conduction problems. In the proposed method, the transient linear heat conduction equation is first integrated with respect to time over subsequent intervals. Then the resulting set of elliptic equations is discretized in space according to a finite-element procedure. The method is unconditionally stable. At the end of the paper, the effectiveness of the proposed method is assessed through some numerical examples. [ABSTRACT FROM AUTHOR]

Published

1994

39. THIN PLATES OF VARIABLE THICKNESS WITH LINEAR FLEXURAL RIGIDITY.

Author

Ye Jianqiao and Xiao Haihong

Subjects

STRUCTURAL plates, SHEET metal, STRENGTH of materials, LINEAR statistical models, NUMERICAL analysis, MATHEMATICS

Abstract

A very simple method is suggested in this paper to analyse plates of variable thickness with linear flexural rigidity. Bi-harmonic analysis is adopted to establish the boundary integral equation in the present study. Numerical examples are given to show that the approach developed in this paper is effective. [ABSTRACT FROM AUTHOR]

Published

1989

40. Cluster Sets of Harmonic Functions at the Boundary of a Half-Space.

Author

Gardiner, Stephen J.

Subjects

BOUNDARY element methods, NUMERICAL analysis, HARMONIC analysis (Mathematics), MATHEMATICS, POLYNOMIALS, FUNCTIONAL equations

Abstract

The purpose of this paper is to answer some questions posed by Doob [2] in 1965 concerning the boundary cluster sets of harmonic and superharmonic functions on the half-space D given by D = Rn−1 × (0, + ∞), where n ≥ 2. Let f: D → [−∞, +∞] and let Z ∈ δD. Following Doob, we write BZ (respectively CZ) for the non-tangential (respectively minimal fine) cluster set of f at Z. Thus l ∈ BZ if and only if there is a sequence (Xm) of points in D which approaches Z non-tangentially and satisfies f(Xm) → l. Also, l ∈ CZ if and only if there is a subset E of D which is not minimally thin at Z with respect to D, and which satisfies f(X) → l as X → Z along E. (We refer to the book by Doob [3, 1.XII] for an account of the minimal fine topology. In particular, the latter equivalence may be found in [3, 1.XII.16].) If f is superharmonic on D, then (see [2, §6]) both sets BZ and CZ are subintervals of [−∞, +∞]. Let λ denote (n − 1)-dimensional measure on δD. The following results are due to Doob [2, Theorem 6.1 and p. 123]. 1991 Mathematics Subject Classification 31B25. [ABSTRACT FROM AUTHOR]

Published

1997

41. COMBINED FINE-COARSE MESH TRANSMISSION-LINE MODELLING METHOD FOR DIFFUSION PROBLEMS.

Author

Ait-Sadi, R., Lowery, A. J., and Tuck, B.

Subjects

ELECTRIC lines, MATRICES (Mathematics), FINITE differences, ALGEBRA, NUMERICAL analysis, MATHEMATICS

Abstract

The paper presents a combined fine-coarse mesh TLM method. This technique reduces the memory storage and the computational time when modelling complex structures. In the combined fine-coarse mesh model, the region of interest is covered with a set of transmission-line fine meshes. The remaining part is covered with regular (or irregular) coarse meshes. The fine-mesh nodes are connected through busbars to the adjacent coarse-mesh nodes. The combined fine-coarse mesh TLM technique is applied to some diffusion problems. Significant savings in computational time and memory storage are obtained without loss of accuracy. [ABSTRACT FROM AUTHOR]

Published

1990

42. NUMERICAL ASPECTS OF THE BOUNDARY RESIDUAL METHOD.

Author

Bunch, K. J. and Grow, R. W.

Subjects

MATRICES (Mathematics), ALGEBRA, NUMERICAL analysis, COMPUTATIONAL complexity, ALGORITHMS, MATHEMATICS

Abstract

The boundary residual method is a powerful technique for solving EM boundary-value problems. This technique produces matrices difficult to solve using many of the standard numerical techniques. This paper discusses lesser-known numerical aspects of this method, and it shows efficient and well-conditioned methods to solve both the homogeneous' and non-homogeneous boundary residual problem. [ABSTRACT FROM AUTHOR]

Published

1990

43. High-order US-FDTD based on the weighted finite-difference method.

Author

Fei Xiao, Xiaohong Tang, and Haihong Ma

Subjects

FINITE differences, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS, STABILITY (Mechanics)

Abstract

Although unconditionally stable (US), the accuracy of ADI-FDTD is not so high as that of conventional FDTD. In this paper, a high-order US-FDTD based on the weighted finite-difference method is presented. A strict analysis of stability shows that it is unconditionally stable. And, more importantly, its numerical-dispersion performance is superior to that of ADI-FDTD. © 2005 Wiley Periodicals, Inc. Microwave Opt Technol Lett 45: 142–144, 2005; Published online in Wiley InterScience (www.interscience.wiley.com). DOI 10.1002/mop.20749 [ABSTRACT FROM AUTHOR]

Published

2005

44. A unified starting procedure for the Houbolt method.

Author

Soroushain, Aram and Farjoodi, Jamshid

Subjects

*TIME-integration methodology, *NUMERICAL analysis, *METHODOLOGY, *MATHEMATICAL analysis, *MATHEMATICS

Abstract

The method proposed by J.C. Houbolt in 1950 is one of the pioneering methods of time integration. Nevertheless, especially due to its multi-step fashion and not having a well-defined starting procedure, the method has not met considerable acceptance. The conversion of the Houbolt method to a one-step method is reported in the literature. However, the resulting method still lacks an appropriate starting procedure for all practical cases. In this paper, a parameter-less unified starting procedure is proposed for time integration with the Houbolt method. Copyright © 2006 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2008

45. The radial integration method applied to dynamic problems of anisotropic plates.

Author

Albuquerque, E. L., Sollero, P., and De Paiva, W. Portilho

Subjects

*BOUNDARY element methods, *NUMERICAL analysis, *MATHEMATICS, *INTEGRALS, *INTEGRAL calculus

Abstract

In this paper, the radial integration method is applied to transform domain integrals into boundary integrals in a boundary element formulation for anisotropic plate bending problems. The inertial term is approximated with the use of radial basis functions, as in the dual reciprocity boundary element method. The transformation of domain integrals into boundary integrals is based on pure mathematical treatments. Numerical results are presented to verify the validity of this method for static and dynamic problems and a comparison with the dual reciprocity boundary element method is carried out. Although the proposed method is more time-consuming, it presents some advantages over the dual reciprocity boundary element method as accuracy and the absence of particular solutions in the formulation. Copyright © 2006 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2007

46. A combined implicit–explicit algorithm in time for non-linear finite element analysis.

Author

Sosa, J. L. Curiel, Neto, E. de Souza, and Owen, D. R. J.

Subjects

*ALGORITHMS, *FINITE element method, *NUMERICAL analysis, *MATHEMATICS, *METHODOLOGY

Abstract

An algorithm combining the numerical execution in time of implicit and explicit methods of solution is presented in this paper. The algorithm swaps between both methods as required for the analysis. The whole mesh is solved for an unique method at once, i.e. there are no partitions of the mesh for separate implicit or explicit treatment of the solution. The combination is in-time, in such a manner that if the implicit method starts diverging the explicit one is initiated by appropriate conditions of transition. The formulation is presented first and its implementation is validated by the analysis of a key numerical example. Copyright © 2005 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2006

47. Time-accurate solution of advection–diffusion problems by wavelet-Taylor–Galerkin method.

Author

Mehra, Mani and Kumar, B. V. Rathish

Subjects

*GALERKIN methods, *WAVELETS (Mathematics), *NUMERICAL analysis, *MATHEMATICS, *UNITS of time

Abstract

In this paper we propose a wavelet Taylor–Galerkin method for the numerical solution of time-dependent advection–diffusion problems. The discretization in time is performed before the spatial discretization by introducing second- and third-order accurate generalization of the standard time stepping schemes with the help of Taylor series expansions in time step. Numerical schemes taking advantage of the wavelet bases capabilities to compress both functions and operators are presented. Numerical examples demonstrate the efficiency of our approach. Copyright © 2005 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2005

48. Different measures of sensitivity of the recipe colour to random and proportional dye concentration error. Part 1: Definitions, mutual relations and estimates of maximal colour errors.

Author

Sluban, Boris

Subjects

COLOR, ERRORS, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS

Abstract

The general concept of predicting the colour sensitivity to random colorant concentration errors and the colour correctability of a colour matching recipe are reviewed and generalised in this paper. The treatment of both quantities is unified either in the concentration space or, equivalently, in colour space. "The concept of the recipe's colour balance is revised. Oulton's concept of recipe colour sensitivity to proportional concentration errors is also briefly reviewed and extended to obtain another measure of recipe sensitivity to random concentration errors. The differences and connections among the two measures of recipe sensitivity to random errors and Oulton's measure of recipe sensitivity to proportional errors are discussed and illustrated by numerical examples. Estimates of maximal colour error, caused by given maximal weighing and strength errors, are developed. [ABSTRACT FROM AUTHOR]

Published

2005

49. Small-angle scattering from spherical core -- shell particles: an analytical scattering function for particles with Schulz -- Flory size distribution.

Author

Wagner, Joachim

Subjects

SMALL-angle scattering, X-ray scattering, NUMERICAL integration, LEAST squares, NUMERICAL analysis, MATHEMATICS

Abstract

The scattering function for Schulz-Flory distributed spherical core-shell particles is derived analytically. A constant ratio of core to shell radii is assumed. The analytical expression, which does not require any numerical integration, provides a fast way to model experimental data by nonlinear least- squares fitting. The asymptotic behavior for large momentum transfers coincides with the different power laws expected for homogenous spheres and thin spherical shells. In the second part, the derived expression is applied to describe experimental small-angle X-ray scattering data from core-shell particles with different particle sizes, polydispersity and ratio of core to shell radii. For large particles, a resolution correction by numerical convolution with a Gaussian resolution function is applied. [ABSTRACT FROM AUTHOR]

Published

2004

50. Numerical methods for one-dimensional Stefan problems.

Author

Caldwell, J. and Kwan, Y. Y.

Subjects

*NUMERICAL analysis, *MATHEMATICAL analysis, *GEOMETRY, *MATHEMATICS, *SOLIDIFICATION

Abstract

This paper describes and compares several effective methods for the numerical solution of one-dimensional Stefan problems. It is not intended to be an exhaustive review but is restricted to a range of problems and geometries including melting in the half-plane, outward cylindrical solidification and outward spherical solidification. From the limited comparison of numerical results obtained, some helpful comments can be made which may prove valuable in the future use of these methods. Copyright © 2004 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2004