Multivariate Approximation for solving ODE and PDE
This book presents collective works published in the recent Special Issue (SI) entitled "Multivariate Approximation for Solving ODE and PDE". These papers describe the different approaches and related objectives in the field of multivariate approximation. The articles in fact present speci...
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Cesarano, Clemente edt Multivariate Approximation for solving ODE and PDE Basel, Switzerland MDPI - Multidisciplinary Digital Publishing Institute 2020 1 electronic resource (202 p.) text txt rdacontent computer c rdamedia online resource cr rdacarrier This book presents collective works published in the recent Special Issue (SI) entitled "Multivariate Approximation for Solving ODE and PDE". These papers describe the different approaches and related objectives in the field of multivariate approximation. The articles in fact present specific contents of numerical methods for the analysis of the approximation, as well as the study of ordinary differential equations (for example oscillating with delay) or that of partial differential equations of the fractional order, but all linked by the objective to present analytical or numerical techniques for the simplification of the study of problems involving relationships that are not immediately computable, thus allowing to establish a connection between different fields of mathematical analysis and numerical analysis through different points of view and investigation. The present contents, therefore, describe the multivariate approximation theory, which is today an increasingly active research area that deals with a multitude of problems in a wide field of research. This book brings together a collection of inter-/multi-disciplinary works applied to many areas of applied mathematics in a coherent manner. English Research & information: general bicssc Mathematics & science bicssc nonlinear equations iteration methods one-point methods order of convergence oscillatory solutions nonoscillatory solutions second-order neutral differential equations multiple roots optimal convergence bivariate function divided difference inverse difference blending difference continued fraction Thiele–Newton’s expansion Viscovatov-like algorithm symmetric duality non-differentiable (G,αf)-invexity/(G,αf)-pseudoinvexity (G,αf)-bonvexity/(G,αf)-pseudobonvexity duality support function nondifferentiable strictly pseudo (V,α,ρ,d)-type-I unified dual efficient solutions Iyengar inequality right and left generalized fractional derivatives iterated generalized fractional derivatives generalized fractional Taylor’s formulae poisson equation domain decomposition asymmetric iterative schemes group explicit parallel computation even-order differential equations neutral delay oscillation Hilbert transform Hadamard transform hypersingular integral Bernstein polynomials Boolean sum simultaneous approximation equidistant nodes fourth-order delay differential equations riccati transformation parameter estimation physical modelling oblique decomposition least-squares 3-03943-603-1 3-03943-604-X Cesarano, Clemente oth |
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English |
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Cesarano, Clemente |
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Cesarano, Clemente |
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title |
Multivariate Approximation for solving ODE and PDE |
spellingShingle |
Multivariate Approximation for solving ODE and PDE |
title_full |
Multivariate Approximation for solving ODE and PDE |
title_fullStr |
Multivariate Approximation for solving ODE and PDE |
title_full_unstemmed |
Multivariate Approximation for solving ODE and PDE |
title_auth |
Multivariate Approximation for solving ODE and PDE |
title_new |
Multivariate Approximation for solving ODE and PDE |
title_sort |
multivariate approximation for solving ode and pde |
publisher |
MDPI - Multidisciplinary Digital Publishing Institute |
publishDate |
2020 |
physical |
1 electronic resource (202 p.) |
isbn |
3-03943-603-1 3-03943-604-X |
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Not Illustrated |
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AT cesaranoclemente multivariateapproximationforsolvingodeandpde |
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(CKB)5400000000041931 (oapen)https://directory.doabooks.org/handle/20.500.12854/69392 (EXLCZ)995400000000041931 |
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Multivariate Approximation for solving ODE and PDE |
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