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2. Incremental subgradient algorithms with dynamic step sizes for separable convex optimizations.
- Author
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Yang, Dan and Wang, Xiangmei
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CONVEX functions , *ASSIGNMENT problems (Programming) , *ALGORITHMS , *PROBLEM solving - Abstract
We consider the incremental subgradient algorithm employing dynamic step sizes for minimizing the sum of a large number of component convex functions. The dynamic step size rule was firstly introduced by Goffin and Kiwiel [Math. Program., 1999, 85(1): 207‐211] for the subgradient algorithm, soon later, for the incremental subgradient algorithm by Nedic and Bertsekas in [SIAM J. Optim., 2001, 12(1): 109‐138]. It was observed experimentally that the incremental approach has been very successful in solving large separable optimizations and that the dynamic step sizes generally have better computational performance than others in the literature. In the present paper, we propose two modified dynamic step size rules for the incremental subgradient algorithm and analyse the convergence and complexity properties of them. At last, the assignment problem is considered and the incremental subgradient algorithms employing different kinds of dynamic step sizes are applied to solve the problem. The computational experiments show that the two modified ones converges dramatically faster and more stable than the corresponding one in [SIAM J. Optim., 2001, 12(1): 109‐138]. Particularly, for solving large separable convex optimizations, we strongly recommend the second one (see Algorithm 3.3 in the paper) since it has interesting computational performance and is the simplest one. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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3. Jacobi-type algorithms for homogeneous polynomial optimization on Stiefel manifolds with applications to tensor approximations.
- Author
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Sheng, Zhou, Li, Jianze, and Ni, Qin
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UNITARY groups , *ALGORITHMS , *TENSOR algebra , *HOMOGENEOUS polynomials - Abstract
This paper mainly studies the gradient-based Jacobi-type algorithms to maximize two classes of homogeneous polynomials with orthogonality constraints, and establish their convergence properties. For the first class of homogeneous polynomials subject to a constraint on a Stiefel manifold, we reformulate it as an optimization problem on a unitary group, which makes it possible to apply the gradient-based Jacobi-type (Jacobi-G) algorithm. Then, if the subproblem can always be represented as a quadratic form, we establish the global convergence of Jacobi-G under any one of three conditions. The convergence result for the first condition is an easy extension of the result by Usevich, Li, and Comon [SIAM J. Optim. 30 (2020), pp. 2998–3028], while other two conditions are new ones. This algorithm and the convergence properties apply to the well-known joint approximate symmetric tensor diagonalization. For the second class of homogeneous polynomials subject to constraints on the product of Stiefel manifolds, we reformulate it as an optimization problem on the product of unitary groups, and then develop a new gradient-based multiblock Jacobi-type (Jacobi-MG) algorithm to solve it. We establish the global convergence of Jacobi-MG under any one of the above three conditions, if the subproblem can always be represented as a quadratic form. This algorithm and the convergence properties are suitable to the well-known joint approximate tensor diagonalization. As the proximal variants of Jacobi-G and Jacobi-MG, we also propose the Jacobi-GP and Jacobi-MGP algorithms, and establish their global convergence without any further condition. Some numerical results are provided indicating the efficiency of the proposed algorithms. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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4. A modified Solodov-Svaiter method for solving nonmonotone variational inequality problems.
- Author
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Van Dinh, Bui, Manh, Hy Duc, and Thanh, Tran Thi Huyen
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VARIATIONAL inequalities (Mathematics) , *ALGORITHMS , *COST - Abstract
In a very interesting paper (SIAM J. Control Optim. 37(3): 765–776, 1999), Solodov and Svaiter introduced an effective projection algorithm with linesearch for finding a solution of a variational inequality problem (VIP) in Euclidean space. They showed that the iterative sequence generated by their algorithm converges to a solution of (VIP) under the main assumption that the cost mapping is pseudomonotone and continuous. In this paper, we propose to modify this algorithm for solving variational inequality problems in which the cost mapping is not required to be satisfied any pseudomonotonicity. Moreover, we do not use the embedded projection methods as in methods used in literature and the linesearch procedure is not necessary when the cost mapping is Lipschitz. Several numerical examples are also provided to illustrate the efficient of the proposed algorithms. [ABSTRACT FROM AUTHOR]
- Published
- 2022
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5. FINDING SPARSE SOLUTIONS FOR PACKING AND COVERING SEMIDEFINITE PROGRAMS.
- Author
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ELBASSIONI, KHALED, MARINO, KAZUHISA, and NAJY, WALEED
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COMBINATORIAL optimization , *ALGORITHMS - Abstract
Packing and covering semidefinite programs (SDPs) appear in natural relaxations of many combinatorial optimization problems as well as a number of other applications. Recently, several techniques were proposed, which utilize the particular structure of this class of problems, to obtain more efficient algorithms than those offered by general SDP solvers. For certain applications, such as those described in this paper, it may be desirable to obtain sparse dual solutions, i.e., those with support size (almost) independent of the number of primal constraints. In this paper, we give an algorithm that finds such solutions, which is an extension of a logarithmic-potential based algorithm of Grigoriadis et al. [SIAM J. Optim. 11 (2001), pp. 1081-1091] for packing/covering linear programs. [ABSTRACT FROM AUTHOR]
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- 2022
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6. NODE-CONNECTIVITY TERMINAL BACKUP, SEPARATELY CAPACITATED MULTIFLOW, AND DISCRETE CONVEXITY.
- Author
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HIROSHI HIRAI and MOTOKI IKEDA
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UNDIRECTED graphs , *APPROXIMATION algorithms , *ALGORITHMS - Abstract
The terminal backup problems ([E. Anshelevich and A. Karagiozova, SIAM J. Comput., 40 (2011), pp. 678--708]) form a class of network design problems: Given an undirected graph with a requirement on terminals, the goal is to find a minimum-cost subgraph satisfying the connectivity requirement. The node-connectivity terminal backup problem requires a terminal to connect other terminals with a number of node-disjoint paths. This problem is not known whether is NP-hard or tractable. Fukunaga [SIAM J. Discrete Math., 30 (2016), pp. 777--800] gave a 4/3-approximation algorithm based on an LP-rounding scheme using a general LP-solver. In this paper, we develop a combinatorial algorithm for the relaxed LP to find a half-integral optimal solution in O(mlog(n-A · MF(/cn,m T/c2n)) time, where n is the number of nodes, m is the number of edges, k is the number of terminals, A is the maximum edge-cost, U is the maximum edge-capacity, and MF(nz,mz) is the time complexity of a max-flow algorithm in a network with nz nodes and m' edges. The algorithm implies that the 4/3-approximation algorithm for the node-connectivity terminal backup problem is also efficiently implemented. For the design of algorithm, we explore a connection between the node-connectivity terminal backup problem and a new type of a multiflow, which is called a separately capacitated multiflow. We show a min-max theorem which extends the Lovasz-Cherkassky theorem to the node-capacity setting. Our results build on discrete convexity in the node-connectivity terminal backup problem. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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7. A Convergent Algorithm for Equilibrium Problem to Predict Prospective Mathematics Teachers' Technology Integrated Competency.
- Author
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Jun-on, Nipa, Cholamjiak, Watcharaporn, and Suparatulatorn, Raweerote
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MATHEMATICS teachers , *TEACHER competencies , *MACHINE learning , *TEACHER education , *ALGORITHMS , *MONOTONE operators , *EDUCATIONAL technology , *NAIVE Bayes classification , *MULTISPECTRAL imaging - Abstract
Educational data classification has become an effective tool for exploring the hidden pattern or relationship in educational data and predicting students' performance or teachers' competency. This study proposes a new method based on machine learning algorithms to predict the technology-integrated competency of pre-service mathematics teachers. In this paper, we modified the inertial subgradient extragradient algorithm for pseudomonotone equilibrium and proved the weak convergence theorem under some suitable conditions in Hilbert spaces. We then applied to solve data classification by extreme learning machine using the dataset comprised of the technology-integrated competency of 954 pre-service mathematics teachers in a university in northern Thailand, longitudinally collected for five years. The flexibility of our algorithm was shown by comparisons of the choice of different parameters. The performance was calculated and compared with the existing algorithms to be implemented for prediction. The results show that the proposed method achieved a classification accuracy of 81.06%. The predictions were implemented using ten attributes, including demographic information, skills, and knowledge relating to technology developed throughout the teacher education program. Such data driven studies are significant for establishing a prospective teacher competency analysis framework in teacher education and contributing to decision-making for policy design. [ABSTRACT FROM AUTHOR]
- Published
- 2022
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8. SOLVING CSPs USING WEAK LOCAL CONSISTENCY.
- Author
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KOZIK, MARCIN
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COMPUTER science , *POLYNOMIAL approximation , *CONSTRAINT satisfaction , *ALGEBRA , *LOGIC , *ALGORITHMS , *APPROXIMATION algorithms - Abstract
The characterization of all the constraint satisfaction problems solvable by local consistency checking (also known as CSPs of bounded width) was proposed by Feder and Vardi [SIAM J. Comput., 28 (1998), pp. 57104]. It was confirmed by two independent proofs by Bulatov [Bounded Relational Width, manuscript, 2009] and Barto and Kozik [L. Barto and M. Kozik, 50th Annual IEEE Symposium on Foundations of Computer Science, 2009, pp. 595 603], [L. Barto and M. Kozik, J. ACM, 61 (2014), 3]. Later Barto [J. Logic Comput., 26 (2014), pp. 923 943] proved a collapse of the hierarchy of local consistency notions by showing that (2; 3) minimality solves all the CSPs of bounded width. In this paper we present a new consistency notion, jpq consistency, which also solves all the CSPs of bounded width. Our notion is strictly weaker than (2; 3) consistency, (2; 3) minimality, path consistency, and singleton arc consistency (SAC). This last fact allows us to answer the question of Chen, Dalmau, and Gruien [J. Logic Comput., 23 (2013), pp. 87 108] by confirming that SAC solves all the CSPs of bounded width. Moreover, as known algorithms work faster for SAC, the result implies that CSPs of bounded width can be, in practice, solved more efficiently. The definition of jpq consistency is closely related to a consistency condition obtained from the rounding of an SDP relaxation of a CSP instance. In fact, the main result of this paper is used by Dalmau et al. [Proceedings of the 28th Annual ACM-SIAM Symposium on Discrete Algorithms, SIAM, Philadelphia, ACM, New York, 2017, pp. 340{357] to show that CSPs with near unanimity polymorphisms admit robust approximation algorithms with polynomial loss. Finally, an algebraic characterization of some term conditions satisfied in algebras associated with templates of bounded width, first proved by Brady, is a direct consequence of our result. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
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9. Rigorous justification for the spaceâ€"split sensitivity algorithm to compute linear response in Anosov systems.
- Author
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Chandramoorthy, Nisha and Jézéquel, Malo
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VECTOR fields , *ALGORITHMS , *APPLIED sciences , *SENSITIVITY analysis , *COMPUTER simulation - Abstract
Ruelle (1997 Commun. Math. Phys. 187 227â€"41; 2003 Commun. Math. Phys. 234 185â€"90) (see also Jiang 2012 Ergod. Theor. Dynam. Syst. 32 1350â€"69) gave a formula for linear response of transitive Anosov diffeomorphisms. Recently, practically computable realizations of Ruelle’s formula have emerged that potentially enable sensitivity analysis of certain high-dimensional chaotic numerical simulations encountered in the applied sciences. In this paper, we provide full mathematical justification for the convergence of one such efficient computation, the spaceâ€"split sensitivity, or S3, algorithm (Chandramoorthy and Wang 2022 SIAM J. Appl. Dyn. Syst. 21 735â€"81). In S3, Ruelle’s formula is computed as a sum of two terms obtained by decomposing the perturbation vector field into a coboundary and a remainder that is parallel to the unstable direction. Such a decomposition results in a splitting of Ruelle’s formula that is amenable to efficient computation. We prove the existence of the S3 decomposition and the convergence of the computations of both resulting components of Ruelle’s formula. [ABSTRACT FROM AUTHOR]
- Published
- 2022
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10. ANALYSIS AND ALGORITHMS FOR SOME COMPRESSED SENSING MODELS BASED ON L1/L2 MINIMIZATION.
- Author
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LIAOYUAN ZENG, PEIRAN YU, and TING KEI PONG
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COMPRESSED sensing , *PROBLEM solving , *ALGORITHMS , *NOISE measurement , *SIGNAL processing , *ORTHOGONAL matching pursuit - Abstract
Recently, in a series of papers [Y. Rahimi, C. Wang, H. Dong, and Y. Lou, SIAM J. Sci. Comput., 41 (2019), pp. A3649-A3672; C. Wang, M. Tao, J. Nagy, and Y. Lou, SIAM J. Imaging Sci., 14 (2021), pp. 749-777; C. Wang, M. Yan, and Y. Lou, IEEE Trans. Signal Process., 68 (2020), pp. 2660-2669; P. Yin, E. Esser, and J. Xin, Commun. Inf. Syst., 14 (2014), pp. 87-109], the ratio of ℓ1 and ℓ2 norms was proposed as a sparsity inducing function for noiseless compressed sensing. In this paper, we further study properties of such model in the noiseless setting, and propose an algorithm for minimizing ℓ1/ℓ2 subject to noise in the measurements. Specifically, we show that the extended objective function (the sum of the objective and the indicator function of the constraint set) of the model in [Y. Rahimi, C. Wang, H. Dong, and Y. Lou, SIAM J. Sci. Comput., 41 (2019), pp. A3649-A3672] satisfies the Kurdyka--Lojasiewicz (KL) property with exponent 1/2; this allows us to establish linear convergence of the algorithm proposed in [C. Wang, M. Yan, and Y. Lou, IEEE Trans. Signal Process., 68 (2020), pp. 2660-2669] (see equation 11) under mild assumptions. We next extend the ℓ1/ℓ2 model to handle compressed sensing problems with noise. We establish the solution existence for some of these models under the spherical section property [S. A. Vavasis, Derivation of Compressive Sensing Theorems from the Spherical Section Property, University of Waterloo, 2009; Y. Zhang, J. Oper. Res. Soc. China, 1 (2013), pp. 79-105] and extend the algorithm in [C. Wang, M. Yan, and Y. Lou, IEEE Trans. Signal Process., 68 (2020), pp. 2660-2669] (see equation 11) by incorporating moving-balls-approximation techniques [A. Auslender, R. Shefi, and M. Teboulle, SIAM J. Optim., 20 (2010), pp. 3232-3259] for solving these problems. We prove the subsequential convergence of our algorithm under mild conditions and establish global convergence of the whole sequence generated by our algorithm by imposing additional KL and differentiability assumptions on a specially constructed potential function. Finally, we perform numerical experiments on robust compressed sensing and basis pursuit denoising with residual error measured by \ell 2 norm or Lorentzian norm via solving the corresponding ℓ1/ℓ2 models by our algorithm. Our numerical simulations show that our algorithm is able to recover the original sparse vectors with reasonable accuracy. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
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11. ANALYSIS OF ADAPTIVE TWO-GRID FINITE ELEMENT ALGORITHMS FOR LINEAR AND NONLINEAR PROBLEMS.
- Author
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YUKUN LI and YI ZHANG
- Subjects
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NONLINEAR equations , *ALGORITHMS , *DEGREES of freedom , *NONLINEAR systems , *INTERPOLATION algorithms - Abstract
This paper proposes some efficient and accurate adaptive two-grid (ATG) finite element algorithms for linear and nonlinear PDEs. The main idea of these algorithms is to utilize the solutions on the kth-level adaptive meshes to find the solutions on the (k + 1)th-level adaptive meshes which are constructed by performing adaptive element bisections on the k th-level adaptive meshes. These algorithms transform nonsymmetric positive definite (non-SPD) PDEs (resp., nonlinear PDEs) into symmetric positive definite (SPD) PDEs (resp., linear PDEs). The proposed algorithms are both accurate and efficient due to the following advantages: They do not need to solve the nonsymmetric or nonlinear systems; the degrees of freedom are very small, they are easily implemented, and the interpolation errors are very small. Next, this paper constructs residual-type a posteriori error estimators which are shown to be reliable and efficient. The key ingredient in proving the efficiency is to establish an upper bound of the oscillation terms, which may not be higher-order terms due to the low regularity of the numerical solution. Furthermore, the convergence of the algorithms is proved when bisection is used for the mesh refinements. Finally, numerical experiments are provided to verify the accuracy and efficiency of the ATG finite element algorithms compared to regular adaptive finite element algorithms and two-grid finite element algorithms [J. Xu, SIAM J. Numer. Anal., 33 (1996), pp. 1759-1777]. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
12. PERFECT Lp SAMPLING IN A DATA STREAM.
- Author
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JAYARAM, RAJESH and WOODRUFF, DAVID
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RANDOM graphs , *OPEN-ended questions - Abstract
In this paper, we resolve the one-pass space complexity of perfect Lp sampling for p ∈ (0, 2) in a stream. Given a stream of updates (insertions and deletions) to the coordinates of an underlying vector f ∈ ℝn, a perfect Lp sampler must output an index i with probability |fi|p/∥ f∥pp and is allowed to fail with some probability δ. So far, for p > 0 no algorithm has been shown to solve the problem exactly using poly(log n)-bits of space. In 2010, Monemizadeh and Woodruff introduced an approximate Lp sampler which, given an approximation parameter ν, outputs i with probability (1±ν)|fi| p/∥f∥pp, using space polynomial in ν-1 and log(n). The space complexity was later reduced by Jowhari, Sağlam, and Tardos to roughly O(ν-p log² n log δ-1) for p ∈ (0, 2), which matches the general p ≥ 0 lower bound of Ω (log² n log δ-1) in terms of n and δ, but is loose in terms of ν. Given these nearly tight bounds, it is perhaps surprising that no lower bound exists in terms of ν---not even a bound of Ω (ν-1) is known. In this paper, we explain this phenomenon by demonstrating the existence of an O(log² n log δ-1)-bit perfect Lp sampler for p ∈ (0, 2). This shows that ν need not factor into the space of an Lp sampler, which closes the complexity of the problem for this range of p. For p = 2, our bound is O(log³ n log δ-1)-bits, which matches the prior best known upper bound of O(ν-2 log³ n log δ-1), but has no dependence on ν. Note that there is still a log n gap between our upper bound and the lower bound for p = 2, the ution of which we leave as an open problem. For p < 2, our bound holds in the random oracle model, matching the lower bounds in that model. However, we show that our algorithm can be derandomized with only a O((log log n)²) blow-up in the space (and no blow-up for p = 2). Our derandomization technique is quite general, and can be used to derandomize a large class of linear sketches, including the more accurate count-sketch variant of Minton and Price [Proceedings of the 25th Annual ACM-SIAM Symposium on Discrete Algorithms, SIAM, Philadelphia, 2014, pp. 669-686], resolving an open question in that paper. Finally, we show that a (1 ± ∈) relative error estimate of the frequency fi of the sampled index i can be obtained using an additional O(∈-p log n)-bits of space for p < 2, and O(∈-2 log² n) bits for p = 2, which was possible before only by running the prior algorithms with ν = ∈. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
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13. Pricing European-type, early-exercise and discrete barrier options using an algorithm for the convolution of Legendre series.
- Author
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Chan, Tat Lung (Ron) and Hale, Nicholas
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ALGORITHMS , *MATHEMATICAL convolutions , *PROBABILITY density function , *LEVY processes , *FINANCIAL engineering - Abstract
This paper applies an algorithm for the convolution of compactly supported Legendre series (the CONLeg method) (cf. Hale and Townsend, An algorithm for the convolution of Legendre series. SIAM J. Sci. Comput., 2014, 36, A1207–A1220), to pricing European-type, early-exercise and discrete-monitored barrier options under a Lévy process. The paper employs Chebfun (cf. Trefethen et al., Chebfun Guide, 2014 (Pafnuty Publications: Oxford), Available online at: ) in computational finance and provides a quadrature-free approach by applying the Chebyshev series in financial modelling. A significant advantage of using the CONLeg method is to formulate option pricing and option Greek curves rather than individual prices/values. Moreover, the CONLeg method can yield high accuracy in option pricing when the risk-free smooth probability density function (PDF) is smooth/non-smooth. Finally, we show that our method can accurately price options deep in/out of the money and with very long/short maturities. Compared with existing techniques, the CONLeg method performs either favourably or comparably in numerical experiments. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
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14. STOCHASTIC MULTILEVEL COMPOSITION OPTIMIZATION ALGORITHMS WITH LEVEL-INDEPENDENT CONVERGENCE RATES.
- Author
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BALASUBRAMANIAN, KRISHNAKUMAR, GHADIMI, SAEED, and NGUYEN, ANTHONY
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MATHEMATICAL optimization , *PROBLEM solving , *ALGORITHMS , *MOVING average process - Abstract
In this paper, we study smooth stochastic multilevel composition optimization problems, where the objective function is a nested composition of T functions. We assume access to noisy evaluations of the functions and their gradients, through a stochastic first-order oracle. For solving this class of problems, we propose two algorithms using moving-average stochastic estimates, and analyze their convergence to an e-stationary point of the problem. We show that the first algorithm, which is a generalization of [S. Ghadimi, A. Ruszczynski, and M. Wang, SIAM J. Optim., 30 (2020), pp. 960-979] to the T level case, can achieve a sample complexity of OT(1/ε6) by using minibatches of samples in each iteration, where OT hides constants that depend on T. By modifying this algorithm using linearized stochastic estimates of the function values, we improve the sample complexity to OT(1/ε4). This modification not only removes the requirement of having a minibatch of samples in each iteration, but also makes the algorithm parameter-free and easy to implement. To the best of our knowledge, this is the first time that such an online algorithm designed for the (un)constrained multilevel setting obtains the same sample complexity of the smooth single-level setting, under standard assumptions (unbiasedness and boundedness of the second moments) on the stochastic first-order oracle. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
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15. An Alternating Algorithm for Finding Linear Arrow-Debreu Market Equilibria.
- Author
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Chen, Po-An, Lu, Chi-Jen, and Lu, Yu-Sin
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MARKET equilibrium , *EQUILIBRIUM , *ALGORITHMS , *LINEAR statistical models , *DISTRIBUTED algorithms - Abstract
Motivated by the convergence result of mirror-descent algorithms to market equilibria in linear Fisher markets, it is natural for one to consider designing dynamics (specifically, iterative algorithms) for agents to arrive at linear Arrow-Debreu market equilibria. Jain (SIAM J. Comput. 37(1), 303–318, 2007) reduced equilibrium computation in linear Arrow-Debreu markets to the equilibrium computation in bijective markets, where everyone is a seller of only one good and a buyer for a bundle of goods. In this paper, we design an algorithm for computing linear bijective market equilibrium, based on solving the rational convex program formulated by Devanur et al. The algorithm repeatedly alternates between a step of gradient-descent-like updates and a distributed step of optimization exploiting the property of such convex program. Convergence can be ensured by a new analysis different from the analysis for linear Fisher market equilibria. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
16. Applications of Fuzzy Soft Sets to the Flood Alarm Model in Northern Thailand.
- Author
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Kanwara Waraha, Duangroetai Bakham, and Peerapong Suebsan
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SOFT sets , *FLOOD warning systems , *ALARMS , *FLOODS , *ALGORITHMS , *PREDICTION models - Abstract
This paper concentrates on studying the application of fuzzy soft sets and the construction of an algorithm to identify a better approach flood alarm prediction model that applies to eight selected provinces sites in Northern Thailand. Finally, an example is provided to show which of the methods can be successfully used to predict potential flood in the future. [ABSTRACT FROM AUTHOR]
- Published
- 2021
17. Metric Dimension Parameterized By Treewidth.
- Author
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Bonnet, Édouard and Purohit, Nidhi
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POLYNOMIAL time algorithms , *NP-complete problems , *COMPUTABLE functions , *ALGORITHMS - Abstract
A resolving set S of a graph G is a subset of its vertices such that no two vertices of G have the same distance vector to S. The Metric Dimension problem asks for a resolving set of minimum size, and in its decision form, a resolving set of size at most some specified integer. This problem is NP-complete, and remains so in very restricted classes of graphs. It is also W[2]-complete with respect to the size of the solution. Metric Dimension has proven elusive on graphs of bounded treewidth. On the algorithmic side, a polynomial time algorithm is known for trees, and even for outerplanar graphs, but the general case of treewidth at most two is open. On the complexity side, no parameterized hardness is known. This has led several papers on the topic to ask for the parameterized complexity of Metric Dimension with respect to treewidth. We provide a first answer to the question. We show that Metric Dimension parameterized by the treewidth of the input graph is W[1]-hard. More refinedly we prove that, unless the Exponential Time Hypothesis fails, there is no algorithm solving Metric Dimension in time f (pw) n o (pw) on n-vertex graphs of constant degree, with pw the pathwidth of the input graph, and f any computable function. This is in stark contrast with an FPT algorithm of Belmonte et al. (SIAM J Discrete Math 31(2):1217–1243, 2017) with respect to the combined parameter tl + Δ , where tl is the tree-length and Δ the maximum-degree of the input graph. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
18. DYNAMICAL LOW-RANK INTEGRATOR FOR THE LINEAR BOLTZMANN EQUATION: ERROR ANALYSIS IN THE DIFFUSION LIMIT.
- Author
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ZHIYAN DING, EINKEMMER, LUKAS, and QIN LI
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BOLTZMANN'S equation , *MATHEMATICAL errors , *LINEAR equations , *MATHEMATICAL analysis , *ALGORITHMS , *INTEGRATORS , *LOW-rank matrices - Abstract
Dynamical low-rank algorithms are a class of numerical methods that compute lowrank approximations of dynamical systems. This is accomplished by projecting the dynamics onto a low-dimensional manifold and writing the solution directly in terms of the low-rank factors. The approach has been successfully applied to many types of differential equations. Recently, efficient dynamical low-rank algorithms have been proposed in [L. Einkemmer, A Low-Rank Algorithm for Weakly Compressible Flow, arXiv:1804.04561, 2018; L. Einkemmer and C. Lubich, SIAM J. Sci. Comput., 40 (2018), pp. B1330-B1360] to treat kinetic equations, including the Vlasov-Poisson and the Boltzmann equation. There it was demonstrated that the methods are able to capture the lowrank structure of the solution and significantly reduce numerical cost, while often maintaining high accuracy. However, no numerical analysis is currently available. In this paper, we perform an error analysis for a dynamical low-rank algorithm applied to the multiscale linear Boltzmann equation (a classical model in kinetic theory) to showcase the validity of the application of dynamical lowrank algorithms to kinetic theory. The equation, in its parabolic regime, is known to be rank 1 theoretically, and we will prove that the scheme can dynamically and automatically capture this low-rank structure. This work thus serves as the first mathematical error analysis for a dynamical low-rank approximation applied to a kinetic problem. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
19. Proximal point algorithms based on S-iterative technique for nearly asymptotically quasi-nonexpansive mappings and applications.
- Author
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Sahu, D. R., Kumar, Ajeet, and Kang, Shin Min
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NONEXPANSIVE mappings , *CONVEX sets , *ALGORITHMS , *POINT set theory , *MATHEMATICS - Abstract
In this paper, we combine the S-iteration process introduced by Agarwal et al. (J. Nonlinear Convex Anal., 8(1), 61–79 2007) with the proximal point algorithm introduced by Rockafellar (SIAM J. Control Optim., 14, 877–898 1976) to propose a new modified proximal point algorithm based on the S-type iteration process for approximating a common element of the set of solutions of convex minimization problems and the set of fixed points of nearly asymptotically quasi-nonexpansive mappings in the framework of CAT(0) spaces and prove the △-convergence of the proposed algorithm for solving common minimization problem and common fixed point problem. Our result generalizes, extends and unifies the corresponding results of Dhompongsa and Panyanak (Comput. Math. Appl., 56, 2572–2579 2008), Khan and Abbas (Comput. Math. Appl., 61, 109–116 2011), Abbas et al. (Math. Comput. Modelling, 55, 1418–1427 2012) and many more. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
20. AN O (n log n)-TIME ALGORITHM FOR THE k-CENTER PROBLEM IN TREES.
- Author
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HAITAO WANG and JINGRU ZHANG
- Subjects
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ALGORITHMS , *TREES , *COMPUTATIONAL geometry - Abstract
We consider a classical k-center problem in trees. Let T be a tree of n vertices such that every vertex has a nonnegative weight. The problem is to find k centers on the edges of T such that the maximum weighted distance from all vertices to their closest centers is minimized. Megiddo and Tamir [SIAM J. Comput., 12 (1983), pp. 751-758] gave an algorithm that can solve the problem in O(n log²n) time by using Cole's parametric search. Since then it has been open for over three decades whether the problem can be solved in O(n log n) time. In this paper, we present an O(n log n) time algorithm for the problem and thus settle the open problem affirmatively. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
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21. An improvement of adaptive cubic regularization method for unconstrained optimization problems.
- Author
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Dehghan Niri, T., Heydari, M., and Hosseini, M. M.
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GLOBAL analysis (Mathematics) , *CONJUGATE gradient methods , *ALGORITHMS , *MATHEMATICS - Abstract
In this paper, we present two nonmonotone versions of adaptive cubic regularized (ARC) method for unconstrained optimization problems. The proposed methods are a combination of the ARC algorithm with the nonmonotone line search methods introduced by Zhang and Hager [A nonmonotone line search technique and its application to unconstrained optimization, SIAM J. Optim. 14 (2004), pp. 1043–1056] and Ahookhosh et al. [A nonmonotone trust-region line search method for large-scale unconstrained optimization, Appl. Math. Model. 36 (2012), pp. 478–487]. The global convergence analysis for these iterative algorithms is established under suitable conditions. Several numerical examples are given to illustrate the efficiency and robustness of the newly suggested methods. The obtained results show the satisfactory performance of the proposed algorithms when compared to the basic ARC algorithm. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
22. Revisiting maximum satisfiability and related problems in data streams.
- Author
-
Vu, Hoa T.
- Subjects
- *
POLYNOMIAL time algorithms , *ASSIGNMENT problems (Programming) , *DATA modeling - Abstract
We revisit the maximum satisfiability problem (Max-SAT) in the data stream model. In this problem, the stream consists of m clauses that are disjunctions of literals drawn from n Boolean variables. The objective is to find an assignment to the variables that maximizes the number of satisfied clauses. Chou et al. (FOCS 2020) showed that Ω (n) space is necessary to yield a 2 / 2 + ε approximation of the optimum value; they also presented an algorithm that yields a 2 / 2 − ε approximation of the optimum value using O (ε − 2 log n) space. In this paper, we not only focus on approximating the optimum value, but also on obtaining the corresponding Boolean assignment using sublinear o (m n) space. We present randomized single-pass algorithms that w.h.p.1 yield: • A 1 − ε approximation using O ˜ (n / ε 3) space and exponential post-processing time • A 3 / 4 − ε approximation using O ˜ (n / ε) space and polynomial post-processing time. Our ideas also extend to dynamic streams. However, we show that the streaming k -SAT problem, which asks whether one can satisfy all size- k input clauses, must use Ω (n k) space. We also consider the related minimum satisfiability problem (Min-SAT), introduced by Kohli et al. (SIAM J. Discrete Math. 1994), that asks to find an assignment that minimizes the number of satisfied clauses. For this problem, we give a O ˜ (n 2 / ε 2) space algorithm, which is sublinear when m = ω (n) , that yields an α + ε approximation where α is the approximation guarantee of the offline algorithm. If each variable appears in at most f clauses, we show that a 2 f n approximation using O ˜ (n) space is possible. Finally, for the Max-AND-SAT problem where clauses are conjunctions of literals, we show that any single-pass algorithm that approximates the optimal value up to a factor better than 1/2 with success probability at least 2/3 must use Ω (m n) space. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
23. IMPROVED RANDOMIZED ALGORITHM FOR κ-SUBMODULAR FUNCTION MAXIMIZATION.
- Author
-
HIROKI OSHIMA
- Subjects
- *
SUBMODULAR functions , *COMBINATORIAL optimization , *EXPONENTIAL functions , *ALGORITHMS , *APPROXIMATION algorithms - Abstract
Submodularity is one of the most important properties in combinatorial optimization, and k-submodularity is a generalization of submodularity. Maximization of a k-submodular function requires an exponential number of value oracle queries, and approximation algorithms have been studied. For unconstrained k-submodular maximization, Iwata, Tanigawa, and Yoshida, [Improved approximation algorithms for k-submodular function maximization, in Proceedings of the Twenty-Seventh Annual ACM-SIAM Symposium on Discrete Algorithms, SIAM, Philadelphia, 2016, pp. 404-413] gave a randomized k/(2k 1)-approximation algorithm for monotone functions and a randomized 1/2-approximation algorithm for nonmonotone functions. In this paper, we present improved randomized algorithms for nonmonotone functions. Our algorithm gives a k2+1 2k2+1 -approximation for k geq 3. We also give a randomized surd 17 3 2 -approximation algorithm for k = 3. We use the same framework used in Iwata, Tanigawa, and Yoshida, [Improved approximation algorithms for k-submodular function maximization, in Proceedings of the Twenty-Seventh Annual ACM-SIAM Symposium on Discrete Algorithms, SIAM, Philadelphia, 2016, pp. 404--413] and Ward and v Zivn'y [ACM Trans. Algorithms, 12 (2016), pp. 46:1--47:26] with different probabilities. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
24. OPTIMAL REDUCED MODEL ALGORITHMS FOR DATA-BASED STATE ESTIMATION.
- Author
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COHEN, ALBERT, DAHMEN, WOLFGANG, DEVORE, RONALD, FADILI, JALAL, MULA, OLGA, and NICHOLS, JAMES
- Subjects
- *
POLYNOMIAL chaos , *VECTOR spaces , *HILBERT space , *ALGORITHMS , *LENGTH measurement , *FUNCTIONALS - Abstract
Reduced model spaces, such as reduced bases and polynomial chaos, are linear spaces Vn of finite dimension n which are designed for the efficient approximation of certain families of parametrized PDEs in a Hilbert space V. The manifold M that gathers the solutions of the PDE for all admissible parameter values is globally approximated by the space Vn with some controlled accuracy εn, which is typically much smaller than when using standard approximation spaces of the same dimension such as finite elements. Reduced model spaces have also been proposed in [Y. Maday et al., Internat. J. Numer. Methods Ergrg., 102 (2015), pp. 933-965] as a vehicle to design a simple linear recovery algorithm of the state u ∈ M corresponding to a particular solution instance when the values of parameters are unknown but a set of data is given by m linear measurements of the state. The measurements are of the form ℓj(u), j = 1, ..., m, where the ℓj are linear functionals on V. The analysis of this approach in [P. Binev et al., SIAM/ASA J. Uncertain. Quantif., 5 (2017), pp. 1-29] shows that the recovery error is bounded by μnεn, where μn = μ(Vn, W) is the inverse of an inf-sup constant that describe the angle between Vn and the space W spanned by the Riesz representers of (ℓ1, ..., ℓm). A reduced model space which is efficient for approximation might thus be ineffective for recovery if μn is large or infinite. In this paper, we discuss the existence and effective construction of an optimal reduced model space for this recovery method. We extend our search to affine spaces which are better adapted than linear spaces for various purposes. Our basic observation is that this problem is equivalent to the search of an optimal affine algorithm for the recovery of M in the worst case error sense. This allows us to perform our search by a convex optimization procedure. Numerical tests illustrate that the reduced model spaces constructed from our approach perform better than the classical reduced basis spaces. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
25. CONVERGENCE RATE OF O(1/k) FOR OPTIMISTIC GRADIENT AND EXTRAGRADIENT METHODS IN SMOOTH CONVEX-CONCAVE SADDLE POINT PROBLEMS.
- Author
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MOKHTARI, ARYAN, OZDAGLAR, ASUMAN E., and PATTATHIL, SARATH
- Subjects
- *
SADDLERY , *ALGORITHMS , *MIRRORS - Abstract
We study the iteration complexity of the optimistic gradient descent-ascent (OGDA) method and the extragradient (EG) method for finding a saddle point of a convex-concave unconstrained min-max problem. To do so, we first show that both OGDA and EG can be interpreted as approximate variants of the proximal point method. This is similar to the approach taken in (A. Nemirovski (2004), SIAM J. Optim., 15, pp. 229-251) which analyzes EG as an approximation of the "conceptual mirror prox." In this paper, we highlight how gradients used in OGDA and EG try to approximate the gradient of the proximal point method. We then exploit this interpretation to show that both algorithms produce iterates that remain within a bounded set. We further show that the primal-dual gap of the averaged iterates generated by both of these algorithms converge with a rate of O(1/k). Our theoretical analysis is of interest as it provides the first convergence rate estimate for OGDA in the general convex-concave setting. Moreover, it provides a simple convergence analysis for the EG algorithm in terms of function value without using a compactness assumption. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
26. An upper bound of radio k-coloring problem and its integer linear programming model.
- Author
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Badr, Elsayed M. and Moussa, Mahmoud I.
- Subjects
- *
LINEAR programming , *INTEGER programming , *CHROMATIC polynomial , *ALGORITHMS , *RADIOS , *GRAPH connectivity - Abstract
For a positive integer k, a radio k-coloring of a simple connected graph G = (V(G), E(G)) is a mapping f : V (G) → { 0 , 1 , 2 , ... } such that | f (u) - f (v) | ≥ k + 1 - d (u , v) for each pair of distinct vertices u and v of G, where d(u, v) is the distance between u and v in G. The span of a radio k-coloring f, rck(f), is the maximum integer assigned by it to some vertex of G. The radio k-chromatic number, rck(G) of G is min{rck(f)}, where the minimum is taken over all radio k-colorings f of G. If k is the diameter of G, then rck(G) is known as the radio number of G. In this paper, we propose an improved upper bound of radio k-chromatic number for a given graph against the other which is due to Saha and Panigrahi (in: Arumugan, Smyth (eds) Combinatorial algorithms (IWOCA 2012). Lecure notes in computer science, vol 7643, Springer, Berlin, 2012). The computational study shows that the proposed algorithm overcomes the previous algorithm. We introduce a polynomial algorithm [differs from the other that is due to Liu and Zhu (SIAM J Discrete Math 19(3):610–621, 2005)] which determines the radio number of the path graph Pn. Finally, we propose a new integer linear programming model for the radio k-coloring problem. The computational study between the proposed algorithm and LINGO solver shows that the proposed algorithm overcomes LINGO solver. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
27. STRANG SPLITTING METHOD FOR SEMILINEAR PARABOLIC PROBLEMS WITH INHOMOGENEOUS BOUNDARY CONDITIONS: A CORRECTION BASED ON THE FLOW OF THE NONLINEARITY.
- Author
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BERTOLI, GUILLAUME and VILMART, GILLES
- Subjects
- *
REACTION-diffusion equations , *ALGORITHMS - Abstract
The Strang splitting method, formally of order two, can suffer from order reduction when applied to semilinear parabolic problems with inhomogeneous boundary conditions. The recent work [L. Einkemmer and A. Ostermann, SIAM J. Sci. Comput., 37, 2015; SIAM J. Sci. Comput., 38, 2016] introduces a modification of the method to avoid the reduction of order based on the nonlinearity. In this paper we introduce a new correction constructed directly from the flow of the nonlinearity and which requires no evaluation of the source term or its derivatives. The goal is twofold. One, this new modification requires only one evaluation of the diffusion flow and one evaluation of the source term flow at each step of the algorithm and it reduces the computational effort to construct the correction. Second, numerical experiments suggest it is well suited in the case where the nonlinearity is stiff. We provide a convergence analysis of the method for a smooth nonlinearity and perform numerical experiments to illustrate the performances of the new approach. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
28. ANALYSIS OF THE BFGS METHOD WITH ERRORS.
- Author
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YUCHEN XIE, BYRD, RICHARD H., and NOCEDAL, JORGE
- Subjects
- *
QUASI-Newton methods , *CONVEX functions , *ALGORITHMS - Abstract
The classical convergence analysis of quasi-Newton methods assumes that function and gradient evaluations are exact. In this paper, we consider the case when there are (bounded) errors in both computations and establish conditions under which a slight modification of the BFGS algorithm with an Armijo–Wolfe line search converges to a neighborhood of the solution that is determined by the size of the errors. One of our results is an extension of the analysis presented in [R. H. Byrd and J. Nocedal, SIAM J. Numer. Anal., 26 (1989), pp. 727–739], which establishes that, for strongly convex functions, a fraction of the BFGS iterates are good iterates. We present numerical results illustrating the performance of the new BFGS method in the presence of noise. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
29. Improved differential evolution algorithms for solving multi-stage crop planning model in southern region of Thailand.
- Author
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Phajongjit Pijitbanjong, Raknoi Akararungruangkul, Rapeepan Pitakaso, and Kanchana Sethanan
- Subjects
- *
DIFFERENTIAL evolution , *ALGORITHMS , *CROPS - Abstract
This paper presents algorithms based on Differential Evolution and Improved Differential Evolution for solving a multi-stage crop planning problem in southern region of Thailand to maximize the profit. Four types of algorithms were tested: 1) Differential Evolution (DE), 2) Differential Evolution with local search by adding the step of local search after the selection process, which used insert algorithm (DE-I), 3) Random best of Differential Evolution improved by mutations (DE-R), 4) Random best of Differential Evolution with local search as a mixture of types 2 and 3 (DE-IR). The results show that with small problem instances all the algorithms found a 100% optimal solution. In medium and large problem instances DE-IR shown the best solutions among the proposed algorithms. [ABSTRACT FROM AUTHOR]
- Published
- 2019
30. NUMERICAL COMPUTATION FOR ORTHOGONAL LOW-RANK APPROXIMATION OF TENSORS.
- Author
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YU GUAN and DELIN CHU
- Subjects
- *
ALGORITHMS , *SINGULAR value decomposition - Abstract
In this paper we study the orthogonal low-rank approximation problem of tensors in the general setting in the sense that more than one matrix factor is required to be mutually orthonormal, which includes the completely orthogonal low-rank approximation and semiorthogonal low-rank approximation as two special cases. It has been addressed in [L. Wang and M. T. Chu, SIAM J. Matrix Anal. Appl., 35 (2014), pp. 1058--1072] that "the question of more than one semiorthogonal factor matrix, except for the case of complete orthogonality, remains open." To deal with this open question we present an SVD-based algorithm. Our SVD-based algorithm updates two vectors simultaneously and maintains the required orthogonality conditions by means of the polar decomposition. The convergence behavior of our algorithm is analyzed for both objective function and iterates themselves and is illustrated by numerical experiments. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
- View/download PDF
31. MODIS-BASED OBSERVATION OF SEA-SURFACE CHLOROPHYLL-A CONCENTRATION OVER UPPER GULF OF THAILAND.
- Author
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Intacharoen, Prasarn, Dasananda, Songkot, and Buranapratheprat, Anukul
- Subjects
- *
CHLOROPHYLL in water , *MODIS (Spectroradiometer) , *ALGORITHMS , *FLOODS , *EUTROPHICATION - Abstract
This paper reports fruitful utilization of satellite-based MODIS optical data on sea-surface Chl-a concentration determination and mapping over Upper Gulf of Thailand (UGoT) region during 2010-2012 period. To fulfil this task, the optimal algorithm for extraction of the constituent through the applied MODIS reflectance data was identified first based on their effectiveness in determination of reference Chl-a data. The preferred Chl-a concentration maps were then generated through the identified algorithm along with their associated trophic state maps established regarding the modified OECD criteria. In the first step, the OC3M algorithm was selected (out of five initial candidates) as it provided the most satisfied output (with R² of 0.60) and used to make Chl-a density maps for the area. These obtained maps indicated that the concerned critical areas which are potentially vulnerable to red-tide occurrence (i.e., those in eutrophic/hyper-eutrophic states with high amount of Chl-a mixture) were frequently assembled over shallow water close to shore and main surrounding river mouths in the north, especially that of the Tha Chin River. However, patterns and strength of their distribution over the area were remarkably dynamic all year round with relatively low activity evidenced in dry season and more pronounced situation seen in monsoon season. In this regard, notable drop in total amount of the critical areas during wet season of 2011 was attributed to the influence of megaflooding over central Thailand at that time. [ABSTRACT FROM AUTHOR]
- Published
- 2018
32. Optimal nutrition therapy in paediatric critical care in the Asia-Pacific and Middle East: a consensus.
- Author
-
Jan Hau Lee, Rogers, Elizabeth, Yek Kee Chorm, Samransamruajkit, Rujipat, Pei Lin Koh, Miqdady, Mohamad, Al-Mehaidib, Ali Ibrahim, Pudjiadi, Antonius, Singhi, Sunit, Mehta, Nilesh M., Lee, Jan Hau, Chor, Yek Kee, and Koh, Pei Lin
- Subjects
- *
DIET therapy , *PEDIATRIC intensive care , *PARENTERAL feeding , *CATASTROPHIC illness , *ALGORITHMS , *CONSENSUS (Social sciences) , *CRITICAL care medicine , *DIETITIANS , *ENTERAL feeding , *INTENSIVE care units , *NUTRITIONAL assessment , *PEDIATRICS , *DIETARY proteins , *SYSTEMATIC reviews , *NUTRITIONAL status , *THERAPEUTICS - Abstract
Background and Objectives: Current practices and available resources for nutrition therapy in paediatric intensive care units (PICUs) in the Asia Pacific-Middle East region are expected to differ from western countries. Existing guidelines for nutrition management in critically ill children may not be directly applicable in this region. This paper outlines consensus statements developed by the Asia Pacific-Middle East Consensus Working Group on Nutrition Therapy in the Paediatric Critical Care Environment. Challenges and recommendations unique to the region are described.Methods and Study Design: Following a systematic literature search from 2004-2014, consensus statements were developed for key areas of nutrient delivery in the PICU. This review focused on evidence applicable to the Asia Pacific-Middle East region. Quality of evidence and strength of recommendations were rated according to the Grading of Recommendation Assessment, Development and Evaluation approach.Results: Enteral nutrition (EN) is the preferred mode of nutritional support. Feeding algorithms that optimize EN should be encouraged and must include: assessment and monitoring of nutritional status, selection of feeding route, time to initiate and advance EN, management strategies for EN intolerance and indications for using parenteral nutrition (PN). Despite heterogeneity in nutritional status of patients, availability of resources and diversity of cultures, PICUs in the region should consider involvement of dieticians and/or nutritional support teams.Conclusions: Robust evidence for several aspects of optimal nutrition therapy in PICUs is lacking. Nutritional assessment must be implemented to document prevalence and impact of malnutrition. Nutritional support must be given greater priority in PICUs, with particular emphasis in optimizing EN delivery. [ABSTRACT FROM AUTHOR]- Published
- 2016
- Full Text
- View/download PDF
33. A new nonlinear Uzawa algorithm for generalized saddle point problems
- Author
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Lin, Yiqin and Cao, Yanhua
- Subjects
- *
PARTIAL differential equations , *STOCHASTIC convergence , *ALGORITHMS - Abstract
Abstract: In [J.H. Bramble, I.E. Pasciak, A.T. Vassilev, Analysis of the inexact Uzawa algorithm for saddle point problems, SIAM J. Numer. Anal. 34 (1997) 1072–1092], a nonlinear Uzawa algorithm for solving generalized saddle point problems iteratively was considered. In [Z. Cao, Fast Uzawa algorithm for generalized saddle point problems, Appl. Numer. Math. 46 (2003) 157–171], Cao gave another nonlinear Uzawa algorithm in order to accelerate convergence. In this paper, a new nonlinear Uzawa method, which is defined by two nonlinear approximate inverses, is proposed and its convergence result is deduced. At the same time, we analyze convergence results of three nonlinear Uzawa methods. The results of numerical experiments are presented when we apply them to Stokes equations discretized by mixed finite element. [Copyright &y& Elsevier]
- Published
- 2006
- Full Text
- View/download PDF
34. On the positive definite solutions of nonlinear matrix equation X + A ⋆ X −δ A = Q
- Author
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Hasanov, Vejdi I. and El-Sayed, Salah M.
- Subjects
- *
MATRICES (Mathematics) , *EQUATIONS , *ALGORITHMS - Abstract
Abstract: In this paper we consider the positive definite solutions of nonlinear matrix equation X + A ⋆ X −δ A = Q, where δ ∈(0,1], which appears for the first time in [S.M. El-Sayed, A.C.M. Ran, On an iteration methods for solving a class of nonlinear matrix equations, SIAM J. Matrix Anal. Appl. 23 (2001) 632–645]. The necessary and sufficient conditions for the existence of a solution are derived. An iterative algorithm for obtaining the positive definite solutions of the equation is discussed. The error estimations are found. [Copyright &y& Elsevier]
- Published
- 2006
- Full Text
- View/download PDF
35. Simulating the Micro-Macro Link: New Approaches to An Old Problem and An Application to Military Coups.
- Author
-
Saam, Nicole J.
- Subjects
- *
ALGORITHMS , *SIMULATION methods & models , *MECHANICS (Physics) , *ARCHITECTURE , *THEORY - Abstract
The central issue of this paper is that one can develop emergent macro-dynamics from micro agent models and that the resulting models fall very much in the complexity-chaos line of the development of theory. The core theoretical contribution is a presentation of a clear, sensical, and potentially very powerful architecture for developing algorithms for the embedding of levels—the so-called master equation approach—and its comparison with alternative architectures. Finally, to illustrate the strategy and to demonstrate that the approach produces interesting and useful results, we give an application: a multilevel simulation model of military coups d'état, which is tested using data from Thailand between 1932 and 1992. [ABSTRACT FROM AUTHOR]
- Published
- 1999
- Full Text
- View/download PDF
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