Showing total 69 results

1. Error Estimates for a Variable Time-Step Discretization of a Phase Transition Model with Hyperbolic Momentum.

Author

Segatti, Antonio

Subjects

NUMERICAL analysis, EQUATIONS, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS

Abstract

This paper deals with a fully implicit time discretization scheme with variable time-step for a nonlinear system modelling phase transition and mechanical deformations in shape memory alloys. The model is studied in the non-stationary case and accounts for local microscopic interactions between the phases introducing the gradients of the phase parameters. The resulting initial-boundary value problem has already been studied by the author who proved existence, uniqueness and continuous dependence on data for a suitable weak solution along some regularity results. A careful and detailed investigation of the variable time-step discretization is the goal of this paper. Thus, we deduce some estimates for the discretization error. These estimates depend only on data, impose no constraints between consecutive time-steps and show an optimal order of convergence. Finally, we prove another regularity result for the solution under stronger regularity assumptions on data. [ABSTRACT FROM AUTHOR]

Published

2004

2. Design of Linear Phase FIR Filters in Subexpression Space Using Mixed Integer Linear Programming.

Author

Ya Jun Yu and Yong Ching Lim

Subjects

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

Abstract

In this paper, a novel optimization technique is proposed to optimize filter coefficients of linear phase finite-impulse response (FIR) filter to share common subexpressions within and among coefficients. Existing approaches of common subexpression elimination optimize digital filters in two stages: first, an FIR filter is designed in a discrete space such as finite wordlength space or signed power-of-two (SPT) space to meet a given specification; in the second stage, an optimization algorithm is applied on the discrete coefficients to find and eliminate the common subexpressions. Such a two-stage optimization technique suffers from the problem that the search space in the second stage is limited by the finite wordlength or SPT coefficients obtained in the first stage optimization. The new proposed algorithm overcomes this problem by optimizing the filter coefficients directly in subexpression space for a given specification. Numerical examples of benchmark filters show that the required number of adders obtained using the proposed algorithm is much less than those obtained using two-stage optimization approaches. [ABSTRACT FROM AUTHOR]

Published

2007

3. A Parallel Interval Computation Model for Global Optimization with Automatic Load Balancing.

Author

Wu, Yong and Kumar, Arun

Subjects

COMPUTATIONAL geometry, MATHEMATICAL models, MATHEMATICAL optimization, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICS

Abstract

In this paper, we propose a decentralized parallel computation model for global optimization using interval analysis. The model is adaptive to any number of processors and the workload is automatically and evenly distributed among all processors by alternative message passing. The problems received by each processor are processed based on their local dominance properties, which avoids unnecessary interval evaluations. Further, the problem is treated as a whole at the beginning of computation so that no initial decomposition scheme is required. Numerical experiments indicate that the model works well and is stable with different number of parallel processors, distributes the load evenly among the processors, and provides an impressive speedup, especially when the problem is time-consuming to solve. [ABSTRACT FROM AUTHOR]

Published

2012

4. On Solving Games Constructed Using Both Short and Long Conjunctive Sums.

Author

Kane, Daniel M.

Subjects

COMBINATORICS, MATHEMATICS, PERMUTATIONS, ALGEBRA, GAME theory, DECISION theory, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICAL optimization

Abstract

In a 1966 paper by C.A.B. Smith, the short and long conjunctive sums of games are defined and methods are described for determining the theoretical winner of a game constructed using one type of these sums. In this paper, we develop a method for determining the winner of a game constructed using arbitrary combinations of these sums. [ABSTRACT FROM AUTHOR]

Published

2010

5. A Filled Function Approach for Nonsmooth Constrained Global Optimization.

Author

Weixiang Wang, Youlin Shang, and Ying Zhang

Subjects

MATHEMATICAL optimization, ALGORITHMS, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis

Abstract

A novel filled function is given in this paper to find a global minima for a nonsmooth constrained optimization problem. First, a modified concept of the filled function for nonsmooth constrained global optimization is introduced, and a filled function, which makes use of the idea of the filled function for unconstrained optimization and penalty function for constrained optimization, is proposed. Then, a solution algorithm based on the proposed filled function is developed. At last, some preliminary numerical results are reported. The results show that the proposed approach is promising. [ABSTRACT FROM AUTHOR]

Published

2010

6. DYNAMIC PROGRAMMING PRINCIPLE FOR ONE KIND OF STOCHASTIC RECURSIVE OPTIMAL CONTROL PROBLEM AND HAMILTON-JACOBI-BELLMAN EQUATION.

Author

Zhen Wu and Zhiyong Yu

Subjects

DYNAMIC programming, STOCHASTIC differential equations, MATHEMATICAL optimization, STOCHASTIC control theory, HAMILTON-Jacobi equations, VISCOSITY solutions, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICS

Abstract

In this paper, we study one kind of stochastic recursive optimal control problem with the obstacle constraint for the cost functional described by the solution of a reflected backward stochastic differential equation. We give the dynamic programming principle for this kind of optimal control problem and show that the value function is the unique viscosity solution of the obstacle problem for the corresponding Hamilton–Jacobi–Bellman equation. [ABSTRACT FROM AUTHOR]

Published

2008

7. Optimization against instability in the large.

Author

Bochenek, Bogdan and Życzkowski, Michał

Subjects

MATHEMATICAL optimization, MATHEMATICAL analysis, NONLINEAR statistical models, FINITE element method, NUMERICAL analysis, MATHEMATICS

Abstract

The combination of geometrically nonlinear analysis with structural optimization against instability opens many possibilities for new formulations of the optimization problem. One of them is optimization against instability in the large. When a critical state does not exist and instability occurs at finite displacements either the lower critical loading is maximized or the generalized displacement for that load is minimized. This paper undertakes these new optimization problems providing formulations and numerical solutions for selected elements. The simple finite dimensional model is analysed first showing characteristic features of the problem, and then a real elastic element is optimized. [ABSTRACT FROM AUTHOR]

Published

2005

8. Global Convergence of a Trust Region Algorithm for Nonlinear Inequality Constrained Optimization Problems.

Author

Yin, Hongxia, Han, Jiye, and Chen, Zhongwen

Subjects

NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICAL optimization, ALGORITHMS, ALGEBRA, MATHEMATICS

Abstract

In the paper, a new trust region algorithm is given for nonlinear inequality constrained optimization problems. Motivated by a dual problem introduced by Han and Mangasarian [Han, S. P., Mangasarian, O. L. (1983). A dual differentiable exact penalty function. Math. Programming 25:293-306], which is a nonnegatively constrained maximization problem, we construct a trust region algorithm for solving the dual problem. At each iteration, we only need to minimize a quadratic subproblem with simple bound constraints. Under the condition that the iterate sequence generated by the algorithm is contained in some bounded closed set, any accumulation point of the sequence is a Karush- Kuhn-Tucker point of the original problem. [ABSTRACT FROM AUTHOR]

Published

2004

9. Iterative Approaches to Convex Minimization Problems.

Author

O'Hara, John G., Pillay, Paranjothi, and Xu, Hong-Kun

Subjects

NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICAL optimization, MATHEMATICS

Abstract

The aim of this paper is to generalize the results of Yamada et al. [Yamada, I., Ogura, N., Yamashita, Y., Sakaniwa, K. (1998). Quadratic approximation of fixed points of nonexpansive mappings in Hilbert spaces. Numer. Funct. Anal. Optimiz. 19(l):165-190], and to provide complementary results to those of Deutsch and Yamada [Deutsch, F., Yamada, I. (1998). Minimizing certain convex functions over the intersection of the fixed point sets of nonexpansive mappings. Numer. Funct. Anal. Optim. 19(1&2):33-56] in which they consider the minimization of some function d over a closed convex set F, the nonempty intersection of N fixed point sets. We start by considering a quadratic function θ and providing a relaxation of conditions of Theorem 1 of Yamada et al. (1998) to obtain a sequence of fixed points of certain contraction maps, converging to the unique minimizer of θ over F. We then extend Theorem 2 and obtain a complementary result to Theorem 3 of Yamada et al. (1998) by replacing the condition lim n → ∞ (λn - λn+1)/λ²n+1 = 0 on the parameters by the more general condition lim n → ∞ λn / λn+1 = 1. We next look at minimizing a more general function θ than a quadratic function which was proposed by Deutsch and Yamada (1998) and show that the sequence of fixed points of certain maps converge to the unique minimizer of 9 over F. Finally, we prove a complementary result to that of Deutsch and Yamada (1998) by using the alternate condition on the parameters. [ABSTRACT FROM AUTHOR]

Published

2004

10. Evaluating Gradients in Optimal Control: Continuous Adjoints versus Automatic Differentiation.

Author

Griesse, R., Walther, A., and Pesch, H. J.

Subjects

MATHEMATICAL optimization, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICAL functions, COMPUTER programming

Abstract

This paper deals with the numerical solution of optimal control problems for ODEs. The methods considered here rely on some standard optimization code to solve a discretized version of the control problem under consideration. We aim to make available to the optimization software not only the discrete objective functional, but also its gradient. The objective gradient can be computed either from forward (sensitivity) information or backward (adjoint) information. The purpose of this paper is to discuss various ways of adjoint computation. It will be shown both theoretically and numerically that methods based on the continuous adjoint equation require a careful choice of both the integrator and gradient assembly formulas in order to obtain a gradient consistent with the discretized control problem. Particular attention is given to automatic differentiation techniques which generate automatically a suitable integrator. [ABSTRACT FROM AUTHOR]

Published

2004

11. An Extension of the Fermat-Torricelli Problem.

Author

Tan, T. V.

Subjects

MATHEMATICAL optimization, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS, CALCULUS

Abstract

The Fermat-Torricelli problem is an optimization problem associated with a finite subset $\{a_{j}\}_{j=1}^{q}$ of ℝ and a family $\{c_{j}\}_{j=1}^{q}$ of positive weights. The function F to be minimized is defined by $F(x)=\sum _{j=1}^{q}c_{j}\Vert x-a_{j}\Vert$. In this paper, we extend this problem to the case of volumes. [ABSTRACT FROM AUTHOR]

Published

2010

12. Extended Well-Posedness of Quasiconvex Vector Optimization Problems.

Author

Crespi, G., Papalia, M., and Rocca, M.

Subjects

MATHEMATICAL optimization, EQUATIONS, CONVEX functions, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS

Abstract

The notion of extended-well-posedness has been introduced by Zolezzi for scalar minimization problems and has been further generalized to vector minimization problems by Huang. In this paper, we study the extended well-posedness properties of vector minimization problems in which the objective function is C-quasiconvex. To achieve this task, we first study some stability properties of such problems. [ABSTRACT FROM AUTHOR]

Published

2009

13. CONDITIONS FOR GLOBAL OPTIMALITY OF QUADRATIC MINIMIZATION PROBLEMS WITH LMI CONSTRAINTS.

Author

Vaithilingam Jeyakumar and Zhiyou Wu

Subjects

MATHEMATICAL optimization, LAGRANGIAN functions, CALCULUS of variations, MATHEMATICS, NUMERICAL analysis, MATHEMATICAL analysis

Abstract

In this paper we present sufficient conditions for global optimality of non-convex quadratic programs involving linear matrix inequality (LMI) constraints. Our approach makes use of the concept of a quadratic subgradient. We develop optimality conditions for quadratic programs with LMI constraints by using Lagrangian function and by examining conditions which minimizes a quadratic subgradient of the Lagrangian function over simple bounding constraints. As applications, we obtain sufficient optimality condition for quadratic programs with LMI and box constraints by minimizing a quadrtic subgradient over box constraints. We also give optimality conditions for quadratic minimization involving LMI and binary constraints. [ABSTRACT FROM AUTHOR]

Published

2007

14. Interval Arithmetic with Containment Sets.

Author

Pryce, J. and Corliss, G.

Subjects

ARITHMETIC, MATHEMATICAL optimization, NUMERICAL analysis, MATHEMATICS, MATHEMATICAL analysis

Abstract

The idea of containment sets (csets) is due to Walster and Hansen, and the theory is mainly due to the first author. Now that floating point computation with infinities is widely accepted, it is necessary to achieve the same for interval computation. The cset of a function over a set in its domain space is the set of all limits of normal function values over that set. Csets form a sound basis for defining a number of practical models for interval arithmetic that handle division by zero and related operations in an intuitive and consistent manner. Cset-based systems offer new opportunities for compiler optimization by rearranging interval expressions, achieving tighter bounds by reducing dependencies within the expression. This paper presents basic theory. It discusses division by zero, the case for a global flag to support ``loose'' evaluation, performance, and semantics. It presents numerical examples using a trial Matlab implementation. [ABSTRACT FROM AUTHOR]

Published

2006

15. Iterative learning controllers for discrete-time large-scale systems to track trajectories with distinct magnitudes.

Author

Ruan, X., Bien, Z., and Park, K.-H.

Subjects

ITERATIVE methods (Mathematics), MANUFACTURING processes, MATHEMATICAL optimization, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICS

Abstract

In the procedure of steady-state hierarchical optimization for large-scale industrial processes, it is often necessary that the control system responds to a sequence of step function-type control decisions with distinct magnitudes. In this paper a set of iterative learning controllers are de-centrally embedded into the procedure of the steady-state optimization. This generates upgraded sequential control signals and thus improves the transient performance of the discrete-time large-scale systems. The convergence of the updating law is derived while the intervention from the distinction of the scales is analysed. Further, an optimal iterative learning control scheme is also deduced by means of a functional derivation. The effectiveness of the proposed scheme and the optimal rule is verified by simulation. [ABSTRACT FROM AUTHOR]

Published

2005

16. Implicit Smoothing and Its Application to Optimization with Piecewise Smooth Equality Constraints.

Author

Ralph, D. and Xu, H.

Subjects

SMOOTHING (Numerical analysis), NUMERICAL analysis, IMPLICIT functions, MATHEMATICAL optimization, MATHEMATICAL analysis, SIMULATION methods & models, MATHEMATICS

Abstract

In this paper, we discuss the smoothing of an implicit function defined by a nonsmooth underdetermined system of equations F(y, z) =0. We apply a class of parametrized smoothing methods to smooth F and investigate the limiting behavior of the implicit function solving the smoothed equations. In particular, we discuss the approximation of the Clarke generalized Jacobian of the implicit function when F is piecewise smooth. As an application, we present an analysis of the generalized Karush-Kuhn-Tucker conditions of different forms for a piecewise-smooth equality-constrained minimization problem. [ABSTRACT FROM AUTHOR]

Published

2005

17. Primal-Dual Nonlinear Rescaling Method for Convex Optimization.

Author

Polyak, R., Griva, I., and Potra, F. A.

Subjects

DUALITY theory (Mathematics), MATHEMATICAL optimization, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis, LAGRANGIAN functions, CALCULUS of variations

Abstract

In this paper, we consider a general primal-dual nonlinear rescaling (PDNR) method for convex optimization with inequality constraints. We prove the global convergence of the PDNR method and estimate the error bounds for the primal and dual sequences. In particular, we prove that, under the standard second-order optimality conditions, the error bounds for the primal and dual sequences converge to zero with linear rate. Moreover, for any given ratio 0 < γ < 1, there is a fixed scaling parameter kγ > 0 such that each PDNR step shrinks the primal-dual error bound by at least a factor 0 < γ < 1, for any k ≥ kγ. The PDNR solver was tested on a variety of NLP problems including the constrained optimization problems (COPS) set. The results obtained show that the PDNR solver is numerically stable and produces results with high accuracy. Moreover, for most of the problems solved, the number of Newton steps is practically independent of the problem size. [ABSTRACT FROM AUTHOR]

Published

2004

18. On the ill-posedness of the trust region subproblem.

Author

Le Thi Hoai An, Pham Dinh Tao, and Din Nho Hào

Subjects

MATHEMATICAL optimization, NUMERICAL analysis, CONVEX functions, MATHEMATICAL analysis, MATHEMATICS

Abstract

The trust region subproblem plays an important role in optimization and numerical analysis. Many researchers even use it in regularizing ill-posed problems. It appears that the trust region subproblem is ill-posed: the set of solutions is unstable with respect to the data in the functional to be minimized, that is a small error in the functional to be minimized might cause large errors in the set of solutions. The aim of the paper is to study the ill-posed nature of the problem and to suggest methods to overcome the ill-posedness. The methods are mainly based on Tikhonov regularization with the generalized discrepancy principle suggested by Goncharskii, Leonov, and Yagola and the difference of convex functions algorithm (DCA) recently developed by Plant Dinh Tao and Le Thi Hoai An. The open problem of Tikhonov regularization methods for non-linear ill-posed problems how to globally solve non-linear (in general non-convex) optimization problems occurred from them is completely answered for the trust region subproblem by DCA. Several test numerical examples are outlined. [ABSTRACT FROM AUTHOR]

Published

2003

19. NUMERICAL SOLUTION OF THE PROBLEM OF OPTIMUM DISTRIBUTION OF EFFORT.

Author

Miehle, William

Subjects

NUMERICAL analysis, MATHEMATICAL analysis, COMPUTERS, TASKS, MATHEMATICAL optimization, OPERATIONS research, EQUATIONS, ADDITIVE functions, MATHEMATICS

Abstract

This paper is an extension of previously published work by Bernard O. Koopman to the general case of any number of tasks and any effect function. A systematic method for the numerical calculation of the maximum effect and its corresponding optimum distribution is presented in a form which is also suitable for solution on an automatic digital computer. For the special case of additive returns which saturate, a special graphical or numerical method for any number of tasks is presented with an example worked out in detail A similar method for multiplicative effects is sketched. [ABSTRACT FROM AUTHOR]

Published

1954

20. Channel Capacity Delay Tradeoff for Two-Way Multiple-Hop MIMO Relay Systems with MAC-PHY Cross Layer.

Author

Hiep, Pham and Kohno, Ryuji

Subjects

NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICAL optimization, MATHEMATICS, TIME division multiple access

Abstract

In multiple-hop MIMO relay systems, an end-to-end channel capacity is restricted by the bottleneck relay. Therefore, in order to obtain the high end-to-end channel capacity, we propose a simple mathematical method to optimize both distances and transmit powers simultaneously. Additionally, the end-to-end channel capacity of optimization based on an one-way and a two-ways transmissions is analyzed. The specific TDMA is proposed to control the transmission of all transmitters on MAC layer and then the distance and the transmit power are optimized based on MAC-PHY cross layer by the proposal particle filter method to obtain the higher end-to-end channel capacity. The calculation result indicates that there is the optimal number of relays that has the maximal end-to-end channel capacity and the trade-off between the end-to-end channel capacity and the delay time. [ABSTRACT FROM AUTHOR]

Published

2015

21. Multicriteria optimization with a multiobjective golden section line search.

Author

Vieira, Douglas, Takahashi, Ricardo, and Saldanha, Rodney

Subjects

ALGORITHMS, MATHEMATICAL optimization, OPERATIONS research, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICS

Abstract

This work presents an algorithm for multiobjective optimization that is structured as: (i) a descent direction is calculated, within the cone of descent and feasible directions, and (ii) a multiobjective line search is conducted over such direction, with a new multiobjective golden section segment partitioning scheme that directly finds line-constrained efficient points that dominate the current one. This multiobjective line search procedure exploits the structure of the line-constrained efficient set, presenting a faster compression rate of the search segment than single-objective golden section line search. The proposed multiobjective optimization algorithm converges to points that satisfy the Kuhn-Tucker first-order necessary conditions for efficiency (the Pareto-critical points). Numerical results on two antenna design problems support the conclusion that the proposed method can solve robustly difficult nonlinear multiobjective problems defined in terms of computationally expensive black-box objective functions. [ABSTRACT FROM AUTHOR]

Published

2012

22. A New Method for Solving Unconstrained Optimization Problems.

Author

Liliu Mo and Ling Hong

Subjects

MATHEMATICAL optimization, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis, STOCHASTIC convergence, EQUATIONS

Abstract

In this paper, a new conjugate gradient formula βNewk is given to compute the search directions for unconstrained optimization problems. General convergence results for the proposed formula with some line searches such as the exact line search, the Grippo-Lucidi line search and the Wolfe-Powell line search are discussed. Under the above line searches and some assumptions, the global convergence properties of the given methods are discussed. The given formula βNewk ⩾ 0, and the search directions dk which are generated by the given βNewk under the strong Wolfe-Powell line search satisfy the sufficient descent condition. Preliminary numerical results show that the proposed methods are efficient. [ABSTRACT FROM AUTHOR]

Published

2009

23. A computational method for a class of non-standard time optimal control problems involving multiple time horizons

Author

Farhadinia, B., Teo, K.L., and Loxton, R.C.

Subjects

*CALCULUS of variations, *MATHEMATICAL optimization, *MATHEMATICAL analysis, *NUMERICAL analysis, *MAXIMA & minima, *MATHEMATICS

Abstract

Abstract: In this paper, we consider a class of non-standard time optimal control problems involving a dynamical system consisting of multiple subsystems evolving over different time horizons. Different subsystems are required to reach their respective target sets at different termination times. The goal is to minimize the maximum of these termination times. By introducing a discrete variable to represent the system termination ordering, we reformulate this problem as a discrete optimization problem. A discrete filled function method is developed to solve this discrete optimization problem. For illustration, a numerical example is solved. [Copyright &y& Elsevier]

Published

2009

24. Shape optimization using the boundary element method and a SAND interior point algorithm for constrained optimization

Author

Canelas, A., Herskovits, J., and Telles, J.C.F.

Subjects

*NUMERICAL analysis, *MATHEMATICAL optimization, *MATHEMATICS, *MATHEMATICAL analysis

Abstract

Abstract: The shape optimization problem consists in looking for the geometry that minimizes an objective function, like mass or compliance, subject to mechanical constraints. The boundary element method (BEM) is used for the structural analysis. For linear elasticity problems, it needs only a mesh on the boundary of the structure. This characteristic makes the BEM a natural method for shape optimization, since only the boundary is needed to define the optimization problem and to carry out the structural analysis. The simultaneous analysis and design formulation (SAND) for structural optimization considers the state variables as unknowns of the optimization problem and includes the equilibrium equations as equality constraints. In this way, it is not necessary to solve the equilibrium equation per iteration; the equilibrium is only obtained at the end of the optimization process. In this paper, the shape optimization problem is dealt with using the BEM formulation to define a SAND optimization problem that is solved using an interior point algorithm. Numerical results for two-dimensional linear elasticity problems are presented to illustrate the efficacy of the proposed technique. [Copyright &y& Elsevier]

Published

2008

25. New Constraint Qualification and Conjugate Duality for Composed Convex Optimization Problems.

Author

Boƫ, R. I., Grad, S. M., and Wanka, G.

Subjects

MATHEMATICAL optimization, CONVEX functions, REAL variables, CONJUGATE direction methods, NUMERICAL solutions to equations, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICAL variables

Abstract

We present a new constraint qualification which guarantees strong duality between a cone-constrained convex optimization problem and its Fenchel-Lagrange dual. This result is applied to a convex optimization problem having, for a given nonempty convex cone K, as objective function a K-convex function postcomposed with a K-increasing convex function. For this so-called composed convex optimization problem, we present a strong duality assertion, too, under weaker conditions than the ones considered so far. As an application, we rediscover the formula of the conjugate of a postcomposition with a K-increasing convex function as valid under weaker conditions than usually used in the literature. [ABSTRACT FROM AUTHOR]

Published

2007

26. OPT++: An Object-Oriented Toolkit for Nonlinear Optimization.

Author

Meza, J. C., Oliva, R. A., Hough, P. D., and Williams, P. J.

Subjects

*OBJECT-oriented programming, *COMPUTER programming, *OBJECT-oriented methods (Computer science), *MATHEMATICAL optimization, *C++, *COMPUTERS, *MATHEMATICAL analysis, *NUMERICAL analysis, *MATHEMATICS

Abstract

Object-oriented programming is a relatively new tool in the development of optimization software. The code extensibility and the rapid algorithm prototyping capability enabled by this programming paradigm promise to enhance the reliability, utility, and ease of use of optimization software. While the use of object-oriented programming is growing, there are still few examples of general purpose codes written in this manner, and a common approach is far from obvious. This paper describes OPT++, a C++ class library for nonlinear optimization. The design is predicated on the concept of distinguishing between an algorithm-independent class hierarchy for nonlinear optimization problems and a class hierarchy for nonlinear optimization methods that is based on common algorithmic traits. The interface is designed for ease of use while being general enough so that new optimization algorithms can be added easily to the existing framework. A number of nonlinear optimization algorithms have been implemented in OPT++ and are accessible through this interface. Furthermore, example applications demonstrate the simplicity of the interface as well as the advantages of a common interface in comparing multiple algorithms. [ABSTRACT FROM AUTHOR]

Published

2007

27. An η-Approximation Approach for Nonlinear Mathematical Programming Problems Involving Invex Function.

Author

Antczak, Tadeusz

Subjects

NUMERICAL analysis, MATHEMATICAL optimization, MATHEMATICAL programming, MATHEMATICAL analysis, MATHEMATICS

Abstract

A new approach to a solution of a nonlinear constrained mathematical programming problem and its Mond-Weir duals is introduced. An n-approximated problem associated with a primal nonlinear programming problem is presented that involves n-approximated functions constituting the primal problem. The equivalence between the original mathematical programming problem and its associated n-approximated optimization problem is established under invexity assumption. Furthermore, n-approximated dual problems in the sense of Mond-Weir are introduced for the obtained n-approximated optimization problem in this method. By the help of n-approximated dual problems some duality results are established for the original mathematical programming problem and its original duals. [ABSTRACT FROM AUTHOR]

Published

2004

28. A method for discrete stochastic optimization.

Author

Andradottir, Sigrun

Subjects

MATHEMATICAL optimization, STOCHASTIC analysis, SIMULATION methods & models, ITERATIVE methods (Mathematics), MATHEMATICAL programming, NUMERICAL analysis, MATHEMATICAL analysis, MATHEMATICAL models, MATHEMATICAL functions, VALUATION, MATHEMATICS

Abstract

This paper addresses the problem of optimizing a function over a finite or countably infinite set of alternatives, in situations where this objective function cannot be evaluated exactly, but has to be estimated or measured. A special focus is on situations where simulation is used to evaluate the objective function. We present two versions of a new iterative method for solving such discrete stochastic optimization problems. In each iteration of the proposed method, a neighbor of the "current" alternative is selected, and estimates of the objective function evaluated at the current and neighboring alternatives are compared. The alternative that has a better observed function value becomes the next current alternative. We show how one version of the proposed method can be used to solve discrete optimization problems where the objective function is evaluated using transient or steady-state simulation, and we show how the other version can be applied to solve a special class of discrete stochastic optimization problems and present some numerical results. A major strength of the proposed method is that it spends most of the computational effort at local minimizers of the objective function. In fact, we show that for both versions of the proposed method, the alternative that has been visited most often in the first m iterations converges almost surely to a local optimizer of the objective function as m goes to infinity. [ABSTRACT FROM AUTHOR]

Published

1995

29. Editorial.

Author

Axelsson, Owe

Subjects

LINEAR algebra, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICAL optimization, MATHEMATICS, CONFERENCES & conventions

Abstract

Explains that this special issue of "Numerical Linear Algebra with Applications" is devoted to the 2002 International Conference on "Preconditioning Methods for Optimal Control and Constrained Optimization Problems" held on October 23-25, 2002 in Netherlands. Goal of addressing complex issues related to preconditioning methods for constrained optimization and optimal control.

Published

2004

30. Pointwise correct operations on recognition and prediction algorithms.

Author

Shibzukhov, Z.

Subjects

ALGORITHMS, FOUNDATIONS of arithmetic, APPROXIMATION algorithms, MATHEMATICAL programming, MATHEMATICAL analysis, MATHEMATICAL optimization, NUMERICAL analysis, NUMERICAL solutions to operator equations, MATHEMATICS

Abstract

The article discusses a study on a class of correct mathematical operations on prediction and recognition algorithms. It states that the right operations come up in relation to the issue of constructing correct algorithms and that correct operations possess the property of preserving the correctness of the algorithms. It adds that the property is useful in developing procedures of correct training that involves the potential of generating families of correct algorithms. The application of a correct operation reportedly makes it possible to obtain new algorithms in an extended model of algorithms.

Published

2013

31. RANDOM HYPERPLANE SEARCH TREES.

Author

DEVROYE, LUC, KING, JAMES, and MCDIARMID, COLIN

Subjects

DYNAMIC programming, MATHEMATICAL optimization, NUMERICAL analysis, MATHEMATICAL analysis, ALGEBRA, NONLINEAR theories, PLANE geometry, EQUATIONS, MATHEMATICS

Abstract

A hyperplane search tree is a binary tree used to store a set S of n d-dimensional data points. In a random hyperplane search tree for S, the root represents a hyperplane defined by d data points drawn uniformly at random from S. The remaining data points are split by the hyperplane, and the definition is used recursively on each subset. We assume that the data are points in general position in Rd. We show that, uniformly over all such data sets S, the expected height of the hyperplane tree is not worse than that of the k-d tree or the ordinary one-dimensional random binary search tree, and that, for any fixed d ≥ 3, the expected height improves over that of the standard random binary search tree by an asymptotic factor strictly greater than one. [ABSTRACT FROM AUTHOR]

Published

2009

32. NUMERICAL VERIFICATION OF OPTIMALITY CONDITIONS.

Author

Rösch, Arnd and Wachsmuth, Daniel

Subjects

MATHEMATICAL optimization, CONTROL theory (Engineering), ELLIPTIC differential equations, LINEAR differential equations, PARTIAL differential equations, STOCHASTIC approximation, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICS

Abstract

A class of optimal control problems for a semilinear elliptic partial differential equation with control constraints is considered. It is well known that sufficient second-order conditions ensure the stability of optimal solutions, and the convergence of numerical methods. Otherwise, such conditions are very difficult to verify (analytically or numerically). We will propose a new approach as follows: Starting with a numerical solution for a fixed mesh we will show the existence of a local minimizer of the continuous problem. Moreover, we will prove that this minimizer satisfies the sufficient second-order conditions. [ABSTRACT FROM AUTHOR]

Published

2008

33. How good are interior point methods? Klee–Minty cubes tighten iteration-complexity bounds.

Author

Deza, Antoine, Nematollahi, Eissa, and Terlaky, Tamás

Subjects

ITERATIVE methods (Mathematics), NUMERICAL analysis, CONJUGATE gradient methods, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS

Abstract

By refining a variant of the Klee–Minty example that forces the central path to visit all the vertices of the Klee–Minty n-cube, we exhibit a nearly worst-case example for path-following interior point methods. Namely, while the theoretical iteration-complexity upper bound is $$O(2^{n}n^{\frac{5}{2}})$$ , we prove that solving this n-dimensional linear optimization problem requires at least 2 n −1 iterations. [ABSTRACT FROM AUTHOR]

Published

2008

34. Improvement and performance evaluation of the perturbation source method for an exact Monte Carlo perturbation calculation in fixed source problems

Author

Toshihiro Yamamoto and Hiroki Sakamoto

Subjects

Singular perturbation, Mathematical optimization, Physics and Astronomy (miscellaneous), Scattering coefficient, 020209 energy, Monte Carlo method, Perturbation (astronomy), 02 engineering and technology, 01 natural sciences, 010309 optics, Free energy perturbation, symbols.namesake, Transport equation, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering, Monte Carlo, Mathematics, Numerical Analysis, Applied Mathematics, Mathematical analysis, Collision, Poincaré–Lindstedt method, Computer Science Applications, Perturbation, Fixed source problem, Computational Mathematics, Modeling and Simulation, symbols, Convection–diffusion equation

Abstract

This paper presents improvement and performance evaluation of the “perturbation source method”, which is one of the Monte Carlo perturbation techniques. The formerly proposed perturbation source method was first-order accurate, although it is known that the method can be easily extended to an exact perturbation method. A transport equation for calculating an exact flux difference caused by a perturbation is solved. A perturbation particle representing a flux difference is explicitly transported in the perturbed system, instead of in the unperturbed system. The source term of the transport equation is defined by the unperturbed flux and the cross section (or optical parameter) changes. The unperturbed flux is provided by an “on-the-fly” technique during the course of the ordinary fixed source calculation for the unperturbed system. A set of perturbation particle is started at the collision point in the perturbed region and tracked until death. For a perturbation in a smaller portion of the whole domain, the efficiency of the perturbation source method can be improved by using a virtual scattering coefficient or cross section in the perturbed region, forcing collisions. Performance is evaluated by comparing the proposed method to other Monte Carlo perturbation methods. Numerical tests performed for a particle transport in a two-dimensional geometry reveal that the perturbation source method is less effective than the correlated sampling method for a perturbation in a larger portion of the whole domain. However, for a perturbation in a smaller portion, the perturbation source method outperforms the correlated sampling method. The efficiency depends strongly on the adjustment of the new virtual scattering coefficient or cross section.

Published

2017

35. Mixed Optimization Approach to Model Approximation of Descriptor Systems.

Author

WANG, Q., LAM, J., ZHANG, Q. L., and WANG, Q. Y.

Subjects

MATHEMATICAL optimization, LYAPUNOV functions, MATHEMATICAL analysis, MATHEMATICS, DIFFERENTIAL equations, SYSTEM analysis, MATHEMATICAL models, EQUATIONS, NUMERICAL analysis

Abstract

A mixed optimal model approximation is presented to obtain reduced-order models for truly fast descriptor systems. By a projection from truly fast descriptor systems to discrete-time systems, a mixed optimal model approximation for truly fast descriptor systems is transformed to a mixed optimal model approximation of the corresponding discrete-time systems. The structure of the fast descriptor systems is preserved in the model approximation procedure. The expression of the error and its gradient are given explicitly in terms of the solutions of certain Lyapunov equations. A numerical example is provided to illustrate the effectiveness of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2006

36. Near real-time atmospheric contamination source identification by an optimization-based inverse method.

Author

Bagtzoglou, Amvrossios C. and Baun †, Sandrine A.

Subjects

MATHEMATICAL optimization, MATHEMATICAL analysis, NUMERICAL analysis, SIMULATION methods & models, MATHEMATICS

Abstract

In this article, we propose a method to identify contamination events (location and time of release) by enhancing a mathematical method originally proposed by Carasso et al. (Carasso, A., Sanderson, J.G. and Hyman, J.M., 1978, Digital removal of random media image degradation by solving the diffusion equation backward in time. SIAM Journal of Numerical Analysis, 15(4)). The method of the Marching-Jury Backward Beam/Plate Equation, applied earlier to groundwater problems, is enhanced and coupled to discrete Fourier transform processing techniques to solve a two-dimensional (2D) advection-dispersion transport problem with homogeneous and isotropic parameters backwards in time. (Atmadja, J. and Bagtzoglou, A.C., 2001a, Pollution source identification in heterogeneous porous media. Water Resources Research, 37(8), 2113–2125; Bagtzoglou, A.C. and Atmadja, J., 2003, The marching-jury backward beam equation and quasi-reversibility methods for hydrologic inversion: application to contaminant plume spatial distribution recovery. Water Resources Research, 39(2), 1038. Cornacchiulo, D. and Bagtzoglou, A.C., 2002, The marching-jury backward plate equation for contaminant plume spatial distribution recovery in two-dimensional heterogeneous media: Computational Issues, In: S.M. Hassanizadeh, R.J. Schotting, W.G. Gray and G.F. Pinder (Eds.) Computational Methods for Subsurface Flow and Transport (Netherlands: Elsevier Publishers) pp. 461–468. The difficulties associated with this ill-posed, inverse problem are well-recognized (Atmadja, J. and Bagtzoglou, A.C., 2001b, State-of-the-art report on mathematical methods for groundwater pollution source identification. Environmental Forensics, 2(3), 205–214). We, therefore, enhance the method by integrating an optimization scheme that takes as input parameters the stabilization parameter, the transport velocities, and the coefficient of diffusion. The objective function is set as an equally weighted sum of different mass and peak errors that can be calculated based on a combination of exhaustive contaminant coverage at specific points in time (e.g., lidar) and/or point data collected at a continuously monitored network of chemical sensors or biosensors, which may be stationary or mobile. [ABSTRACT FROM AUTHOR]

Published

2005

37. A Chaotic Approach for the Bi-level Continuous Equilibrium Network Design Probleni.

Author

Xiaomei Zhao and Ziyou Gao

Subjects

ALGORITHMS, MATHEMATICAL optimization, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICS, EQUILIBRIUM

Abstract

A chaotic algorithm for providing a solution to the bi-level Continuous Equilibrium Network Design Problem (NDP) is discussed following an introduction of the Continuous Network Design Problem (GNDP) model with road reserve and Chaos Optimization Algorithms (COA). A description of the current optimality conditions for the CNDP model is described in details. Then the chaotic approach for the GNDP is applied to two numerical examples. The results have been encouraging, indicating that the chaotic approach has great potential ability in finding the optimal solution of CNDP models. [ABSTRACT FROM AUTHOR]

Published

2005

38. Regularity Conditions and Optimality in Vector Optimization.

Author

Chandra, S., Dutta, J., and Lalitha, C. S.

Subjects

NUMERICAL analysis, LIPSCHITZ spaces, FUNCTION spaces, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS

Abstract

The aim of this article is to study necessary optimality conditions for a vector minimization program involving locally Lipschitz functions under certain general regularity conditions. We study problems involving only inequality and both inequality and equality constraints. [ABSTRACT FROM AUTHOR]

Published

2004

39. Implementable Algorithm for Stochastic Optimization Using Sample Average Approximations.

Author

Royset, J. O. and Polak, E.

Subjects

MATHEMATICAL optimization, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis, ALGORITHMS, STOCHASTIC processes

Abstract

We develop an implementable algorithm for stochastic optimization problems involving probability functions. Such problems arise in the design of structural and mechanical systems. The algorithm consists of a nonlinear optimization algorithm applied to sample average approximations and a precision-adjustment rule. The sample average approximations are constructed using Monte Carlo simulations or importance sampling techniques. We prove that the algorithm converges to a solution with probability one and illustrate its use by an example involving a reliability-based optimal design. [ABSTRACT FROM AUTHOR]

Published

2004

40. Controllability of Nonlinear Neutral Evolution Integrodifferential Systems with Infinite Delay.

Author

Liu, B. and Galligani, I.

Subjects

MATHEMATICAL optimization, INTEGRO-differential equations, INTEGRAL equations, DIFFERENTIAL equations, MATHEMATICS, MATHEMATICAL analysis, NUMERICAL analysis, MATHEMATICAL functions, INFINITE integrals

Abstract

Sufficient conditions are derived for the controllability of nonlinear neutral evolution integrodifferential systems with infinite delay in a Banach space. The results are obtained by using the resolvent operators and the Schaefer fixed-point theorem. An example is given to illustrate the results. [ABSTRACT FROM AUTHOR]

Published

2004

41. Accurate calculation of spherical and vector spherical harmonic expansions via spectral element grids

Author

Ziqing Xie, Li-Lian Wang, Bo Wang, and School of Physical and Mathematical Sciences

Subjects

Mathematics [Science], Mathematical optimization, Spherical Harmonics, Discretization, Applied Mathematics, Numerical analysis, Mathematical analysis, Zonal spherical harmonics, Spherical harmonics, 010103 numerical & computational mathematics, 01 natural sciences, 010101 applied mathematics, Computational Mathematics, Spin-weighted spherical harmonics, Vector spherical harmonics, Vector field, 0101 mathematics, Vector Spherical Harmonics, Tensor operator, Mathematics

Abstract

We present in this paper a spectrally accurate numerical method for computing the spherical/vector spherical harmonic expansion of a function/vector field with given (elemental) nodal values on a spherical surface. Built upon suitable analytic formulas for dealing with the involved highly oscillatory integrands, the method is robust for high mode expansions. We apply the numerical method to the simulation of three-dimensional acoustic and electromagnetic multiple scattering problems. Various numerical evidences show that the high accuracy can be achieved within reasonable computational time. This also paves the way for spectral-element discretization of 3D scattering problems reduced by spherical transparent boundary conditions based on the Dirichlet-to-Neumann map.

Published

2018

42. A multi well-balanced scheme for the shallow water MHD system with topography

Author

François Bouchut, Xavier Lhébrard, Laboratoire d'Analyse et de Mathématiques Appliquées (LAMA), Université Paris-Est Marne-la-Vallée (UPEM)-Fédération de Recherche Bézout-Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12)-Centre National de la Recherche Scientifique (CNRS), and Centre National de la Recherche Scientifique (CNRS)-Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12)-Fédération de Recherche Bézout-Université Paris-Est Marne-la-Vallée (UPEM)

Subjects

Mathematical optimization, 010103 numerical & computational mathematics, hydrostatic reconstruction, 01 natural sciences, law.invention, topography, law, well-balanced scheme, Magnetohydrodynamic drive, 0101 mathematics, semi-discrete entropy inequality, Mathematics, Applied Mathematics, Numerical analysis, Mathematical analysis, 76W05, 76M12, 35L65, Reconstruction algorithm, Solver, 010101 applied mathematics, Computational Mathematics, Waves and shallow water, Shallow water magnetohydrodynamics, Gravitational singularity, Hydrostatic equilibrium, Magnetohydrodynamics, [MATH.MATH-NA]Mathematics [math]/Numerical Analysis [math.NA]

Abstract

International audience; The shallow water magnetohydrodynamic system involves several families of physically relevant steady states. In this paper we design a well-balanced numerical scheme for the one-dimensional shallow water magnetohydrodynamic system with topography, that resolves exactly a large range of steady states. Two variants are proposed with slightly different families of preserved steady states. They are obtained by a generalized hydrostatic reconstruction algorithm involving the magnetic field and with a cutoff parameter to remove singularities. The solver is positive in height and semi-discrete entropy satisfying, which ensures the robustness of the method.

Published

2017

43. Numerical modeling of the acoustic wave propagation across an homogenized rigid microstructure in the time domain

Author

Agnès Maurel, Jean-Jacques Marigo, Bruno Lombard, Ondes et Imagerie (O&I), Laboratoire de Mécanique et d'Acoustique [Marseille] (LMA ), Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS)-Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS), Institut Langevin - Ondes et Images (UMR7587) (IL), Ecole Superieure de Physique et de Chimie Industrielles de la Ville de Paris (ESPCI Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS), Laboratoire de mécanique des solides (LMS), École polytechnique (X)-Mines Paris - PSL (École nationale supérieure des mines de Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS), Sorbonne Université (SU)-Ecole Superieure de Physique et de Chimie Industrielles de la Ville de Paris (ESPCI Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Université de Paris (UP)-Centre National de la Recherche Scientifique (CNRS), and École polytechnique (X)-MINES ParisTech - École nationale supérieure des mines de Paris

Subjects

Mathematical optimization, Physics and Astronomy (miscellaneous), homogenization, FOS: Physical sciences, Numerical modeling, ADER scheme, 010103 numerical & computational mathematics, Physics - Classical Physics, 010502 geochemistry & geophysics, 01 natural sciences, Homogenization (chemistry), Regular grid, immersed interface method, Time domain, 0101 mathematics, 0105 earth and related environmental sciences, Mathematics, [SPI.ACOU]Engineering Sciences [physics]/Acoustics [physics.class-ph], Numerical Analysis, Applied Mathematics, Numerical analysis, time-domain wave propagation, Mathematical analysis, Classical Physics (physics.class-ph), Computational Physics (physics.comp-ph), Microstructure, effective jump conditions, Computer Science Applications, Computational Mathematics, Acoustic wave propagation, Modeling and Simulation, Jump, Physics - Computational Physics

Abstract

International audience; Homogenization of a thin micro-structure yields effective jump conditions that incorporate the geometrical features of the scatterers. These jump conditions apply across a thin but nonzero thickness interface whose interior is disregarded. This paper aims (i) to propose a numerical method able to handle the jump conditions in order to simulate the homogenized problem in the time domain, (ii) to inspect the validity of the homogenized problem when compared to the real one. For this purpose, we adapt the Explicit Simplified Interface Method originally developed for standard jump conditions across a zero-thickness interface. Doing so allows us to handle arbitrary-shaped interfaces on a Cartesian grid with the same efficiency and accuracy of the numerical scheme than those obtained in an homogeneous medium. Numerical experiments are performed to test the properties of the numerical method and to inspect the validity of the homogenization problem.

Published

2017

44. Note on the efficiency of some iterative methods for solving nonlinear equations

Author

Miquel Noguera Batlle, Miguel Grau Sánchez, José Luis Díaz Barrero, Universitat Politècnica de Catalunya. Departament de Matemàtiques, and Universitat Politècnica de Catalunya. Departament d'Enginyeria Civil i Ambiental

Subjects

Anàlisi numèrica, Numerical Analysis, Mathematical optimization, Control and Optimization, computational efficiency, Iterative method, Applied Mathematics, Scalar (mathematics), 65 Numerical analysis::65H Nonlinear algebraic or transcendental equations [Classificació AMS], divided difference, Nonlinear equations, Mathematical analysis, efficiency index, 47 Operator theory::47H Nonlinear operators and their properties [Classificació AMS], Local convergence, Matemàtiques i estadística::Anàlisi numèrica [Àrees temàtiques de la UPC], Nonlinear system, order of convergence, Rate of convergence, Modeling and Simulation, Anàlisi matemàtica, Matemàtiques i estadística::Anàlisi matemàtica [Àrees temàtiques de la UPC], iterative methods, Mathematics, Numerical analysis

Abstract

The e ciency of algorithms for solving nonlinear equations is a measure of comparison between di erent iterative methods. In the case of scalar equations two parameters are considered as it is well-known, but frequently in recent literature inaccurate generalizations combining these parameters are used when solving systems of nonlinear equations. Our goal in this paper is to clarify the concept of the e ciency in the multi-dimensional case. To do it we present a detailed de nition of the computational e ciency. The relation between the e ciency parameters in scalar and vectorial cases is analyzed in detail and tested in two numerical examples

Published

2015

45. High performance computations of steady-state bifurcations in 3D incompressible fluid flows by Asymptotic Numerical Method

Author

Marc Medale, Bruno Cochelin, Institut universitaire des systèmes thermiques industriels (IUSTI), Aix Marseille Université (AMU)-Centre National de la Recherche Scientifique (CNRS), Matériaux et Structures (M&S), Laboratoire de Mécanique et d'Acoustique [Marseille] (LMA ), Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS)-Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS), and Centre National de la Recherche Scientifique (CNRS)-Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS)-Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)

Subjects

Power series, Mathematical optimization, Physics and Astronomy (miscellaneous), Computation, media_common.quotation_subject, 010103 numerical & computational mathematics, 01 natural sciences, Asymmetry, [SPI]Engineering Sciences [physics], Symmetry breaking, 0101 mathematics, Bifurcation, ComputingMilieux_MISCELLANEOUS, Mathematics, media_common, Numerical Analysis, Steady state, Applied Mathematics, Numerical analysis, Mathematical analysis, [SPI.MECA]Engineering Sciences [physics]/Mechanics [physics.med-ph], Computer Science Applications, 010101 applied mathematics, Computational Mathematics, Flow (mathematics), Modeling and Simulation

Abstract

This paper presents a powerful numerical model that implements the Asymptotic Numerical Method to compute 3D steady-state incompressible fluid flow solutions. This continuation algorithm enables to explore branches of steady-state solutions, stable or unstable, to accurately determine any simple steady-state bifurcation points and their emanating bifurcated branches. The powerfulness of the model stands on an optimal step length continuation thanks to the combination of power series analysis in the framework of ANM along with an efficient parallel implementation of the resulting algorithm on high performance computers. The outcome of this approach is demonstrated throughout 3D incompressible fluid flows inside a sudden expansion channel (expansion ratio E = 3 , cross-section aspect ratio 10 ? B ? 20 ). We have computed for the first time up to four steady symmetry breaking (pitchfork) bifurcations together with their associated bifurcated branches. The main characteristic of this 3D symmetric expansion configuration is that for a given cross-section aspect ratio the first bifurcation mode induces a top-bottom asymmetry, as in the 2D case, whereas the subsequent ones modulate the former in the span-wise direction with increasing wave numbers. The Asymptotic Numerical Method is a very efficient continuation technique.Judicious usage of power series analysis increases computational efficiency.An HPC implementation of the resulting algorithm is presented in this paper.Its numerical efficiency enables to investigate problems out of reach until now.Span-wise symmetry breaking bifurcations in a symmetric sudden expansion channel.

Published

2015

46. A conditional stochastic projection method applied to a parametric vibrations problem

Author

Aneta Herbut and Wlodzimierz Brzakala

Subjects

Mathematical optimization, Building construction, Polynomial chaos, Strategy and Management, Numerical analysis, Mathematical analysis, Monte Carlo method, stochastic dynamics, parametric vibrations, Vibration, Ordinary differential equation, Projection method, Parametric oscillator, Hermite’s polynomial chaos, Random variable, TH1-9745, Monte Carlo simulation, Civil and Structural Engineering, Mathematics

Abstract

Parametric vibrations can be observed in cable-stayed bridges due to periodic excitations caused by a deck or a pylon. The vibrations are described by an ordinary differential equation with periodic coefficients. The paper focuses on random excitations, i.e. on the excitation amplitude and the excitation frequency which are two random variables. The excitation frequency ωL is discretized to a finite sequence of representative points, ωL,i Therefore, the problem is (conditionally) formulated and solved as a one-dimensional polynomial chaos expansion generated by the random excitation amplitude. The presented numerical analysis is focused on a real situation for which the problem of parametric resonance was observed (a cable of the Ben-Ahin bridge). The results obtained by the use of the conditional polynomial chaos approximations are compared with the ones based on the Monte Carlo simulation (truly two-dimensional, not conditional one). The convergence of both methods is discussed. It is found that the conditional polynomial chaos can yield a better convergence then the Monte Carlo simulation, especially if resonant vibrations are probable.

Published

2014

47. Multiscale modelling of sound propagation through the lung parenchyma

Author

Paul Cazeaux, Jan S. Hesthaven, Laboratoire Jacques-Louis Lions (LJLL), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Numerical simulation of biological flows (REO), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS)-Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS)-Inria Paris-Rocquencourt, Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria), Division of Applied Mathematics (DAM), and Brown University

Subjects

Mathematical optimization, Quantitative Biology::Tissues and Organs, Physics::Medical Physics, Discontinuous Galerkin methods, Homogenization (chemistry), Viscoelasticity, Human lung, Discontinuous Galerkin method, Parenchyma, Fluid–structure interaction, Fluid-structure interaction, medicine, Viscoelastic media, Mathematics, Numerical Analysis, Applied Mathematics, Sound propagation, Mathematical analysis, Periodic homogenization, [INFO.INFO-NA]Computer Science [cs]/Numerical Analysis [cs.NA], Computational Mathematics, medicine.anatomical_structure, Modeling and Simulation, Mathematical modeling, Porous medium, Analysis

Abstract

International audience; In this paper we develop and study numerically a model to describe some aspects of sound propagation in the human lung, considered as a deformable and viscoelastic porous medium(the parenchyma) with millions of alveoli filled with air. Transmission of sound through the lung above 1 kHz is known to be highly frequency-dependent. We pursue the key idea that the viscoelastic parenchyma structure is highly heterogeneous on the small scale ε and use two-scale homogenization techniques to derive effective acoustic equations for asymptotically small ε. This process turns out to introduce new memory effects. The effective material parameters are determined from the solution of frequency-dependent micro-structure cell problems. We propose a numerical approach to investigate the sound propagation in the homogenized parenchyma using a Discontinuous Galerkin formulation.Numerical examples are presented.

Published

2013

48. Numerical Analysis of Asymmetric Differential Inductors

Author

Akira Matsuzawa, Daisuke Imanishi, Kenichi Okada, and Masaki Kanemaru

Subjects

Mathematical optimization, media_common.quotation_subject, Numerical analysis, Mathematical analysis, Order of accuracy, Inductor, Asymmetry, Matrix decomposition, Symmetric matrix, Computer Science::Databases, Differential (mathematics), media_common, Mathematics, Numerical stability

Abstract

In this paper, the numerical analysis using the matrix-decomposition technique is proposed to evaluate left-right asymmetry in differential inductors. Both left- and right-half components can be calculated by the analytical equations without parameter extraction using numerical optimization, so difference between the components can be accurately evaluated.

Published

2008

49. Second Order Fluid Models with General Boundary Behaviour

Author

Marco Gribaudo, Bruno Sericola, Daniele Manini, and Miklós Telek

Subjects

Matrix (mathematics), Mathematical optimization, Stationary distribution, Numerical analysis, Theory of computation, Mathematical analysis, Linear system, Exponent, General Decision Sciences, Boundary (topology), Management Science and Operations Research, Second-order fluid, Mathematics

Abstract

A crucial property of second order fluid models is the behaviour of the fluid level at the boundaries. Two cases have been considered: the reflecting and the absorbing boundary. This paper presents an approach for the stationary analysis of second order fluid models with any combination of boundary behaviours. The proposed approach is based on the solution of a linear system whose coefficients are obtained from a matrix exponent. A practical example demonstrates the suitability of the technique in performance modeling.

Published

2008

50. Analysis of convective straight and radial fins with temperature-dependent thermal conductivity using variational iteration method with comparison with respect to finite element analysis

Author

Safa Bozkurt Coşkun, Mehmet Tarık Atay, 0-Belirlenecek, ATAY, MEHMET TARIK -- 0000-0002-7326-5750, and [Coskun, Safa Bozkurt] Nigde Univ, Dept Civil Engn, TR-51100 Nigde, Turkey -- [Atay, Mehmet Tarik] Nigde Univ, Dept Math, TR-51100 Nigde, Turkey

Subjects

Convection, Work (thermodynamics), Mathematical optimization, Fin, Article Subject, lcsh:Mathematics, General Mathematics, Numerical analysis, Mathematical analysis, General Engineering, lcsh:QA1-939, Finite element method, 0-Belirlenecek, Thermal conductivity, lcsh:TA1-2040, Heat transfer, Astrophysics::Earth and Planetary Astrophysics, lcsh:Engineering (General). Civil engineering (General), Adomian decomposition method, Mathematics

Abstract

WOS: 000252955800001, In order to enhance heat transfer between primary surface and the environment, radiating extended surfaces are commonly utilized. Especially in the case of large temperature differences, variable thermal conductivity has a strong effect on performance of such a surface. In this paper, variational iteration method is used to analyze convective straight and radial fins with temperature-dependent thermal conductivity. In order to show the efficiency of variational iteration method (VIM), the results obtained from VIM analysis are compared with previously obtained results using Adomian decomposition method (ADM) and the results from finite element analysis. VIM produces analytical expressions for the solution of nonlinear differential equations. However, these expressions obtained from VIM must be tested with respect to the results obtained from a reliable numerical method or analytical solution. This work assures that VIM is a promising method for the analysis of convective straight and radial fin problems. Copyright (C) 2007.

Published

2007