Results 21 to 30 of about 32,600 (242)
Abstract and Applied Analysis, 2012 We are interested in studying the stable difference schemes for the numerical solution of the nonlocal boundary value problem with the Dirichlet-Neumann condition for the multidimensional elliptic equation.
Allaberen Ashyralyev, Elif Ozturk
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Stability of Difference Schemes for Fractional Parabolic PDE with the Dirichlet-Neumann Conditions
Abstract and Applied Analysis, 2012 The stable difference schemes for the fractional parabolic equation with Dirichlet and Neumann boundary conditions are presented. Stability estimates and almost coercive stability estimates with ln (1/(𝜏+|ℎ|)) for the solution of these difference schemes
Zafer Cakir
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Results in Applied Mathematics, 2023 We investigate the approximate solution to a class of fourth-order Volterra–Fredholm integro differential equations (VFIDEs). Additionally, we are able to get some adequate results for the existence of a solution with the use of nonlinear analysis ...
Rohul Amin +3 more
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Solving fully fuzzy linear systems by Gauss Jordan Elimination Method
Journal of Physics: Conference Series, 2019 Abstract In this paper, we discuss fully fuzzy linear systems with triangular fuzzy numbers. A Gauss Jordan Elimination Method is proposed for solving fully fuzzy linear systems (FFLS). We used elementary row operations augmented matrices of crisp linear system of equation to arrive the row reduced form. The method in detail is discussed
S. Muruganandam +2 more
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Complexity, 2021 In this work, the Haar collocation scheme is used for the solution of the class of system of delay integral equations for heterogeneous data communication. The Haar functions are considered for the approximation of unknown function.
Hualing Wu +4 more
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Data-Efficient Decentralized Visual SLAM [PDF]
, 2017 Decentralized visual simultaneous localization and mapping (SLAM) is a powerful tool for multi-robot applications in environments where absolute positioning systems are not available.
Choudhary, Siddharth +2 more
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, 2009 In this paper, we prove that if the matrix of the linear system is symetric, the Cholesky decomposition can be obtained from the Gauss elimination method without pivoting, without proving that the matrix of the system is positive definite.Comment: 7 ...
Rakotonirina, Christian
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, 1997 Starting from the QCD Lagrangian, we present the QCD Hamiltonian for near light cone coordinates. We study the dynamics of the gluonic zero modes of this Hamiltonian. The strong coupling solutions serve as a basis for the complete problem. We discuss the
C. J. Morningstar +24 more
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Depth-Optimized Quantum Circuit of Gauss–Jordan Elimination
Applied SciencesQuantum computers have the capacity to solve certain complex problems more efficiently than classical computers. To fully leverage these quantum advantages, adapting classical arithmetic for quantum systems in a circuit level is essential. In this paper,
Kyungbae Jang, Yujin Oh, Hwajeong Seo
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Discrete Dynamics in Nature and Society, 2012 The first and second order of accuracy stable difference schemes for the numerical solution of the mixed problem for the fractional parabolic equation are presented.
Allaberen Ashyralyev, Zafer Cakir
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