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## Search Articles

2016, Graduate studies in mathematics, ISBN 9781470426071, Volume 171., viii, 368

Differential equations, Elliptic | Boundary value problems for second-order elliptic equations | Partial differential equations | Differential equations, Nonlinear | Elliptic equations and systems | Quasilinear elliptic equations with mean curvature operator | Elliptic Monge-Ampère equations | Nonlinear elliptic equations

Book

2011, Graduate studies in mathematics, ISBN 0821852841, Volume 123, xvii, 410

Book

1968, North-Holland series in applied mathematics and mechanics, v. 5, 211

Book

2008, ISBN 9812779426, xiii, 439

Book

2006, 1st ed., North-Holland mathematical library, ISBN 9780444521095, Volume 69, 538

The book contains a systematic treatment of the qualitative theory of elliptic boundary value problems for linear and quasilinear second order equations in non-smooth domains...

Differential equations, Elliptic | Boundary value problems

Differential equations, Elliptic | Boundary value problems

eBook

1981, ISBN 9780273085027, Volume 12., viii, 162

Book

International journal for numerical methods in engineering, ISSN 0029-5981, 08/2018, Volume 115, Issue 8, pp. 986 - 1014

... hybridisable discontinuous Galerkin. The resulting FCFV features a global problem in terms of a piecewise constant function defined on the faces of the mesh...

finite volume method | face‐centred | hybridisable discontinuous Galerkin | lowest‐order approximation | face-centred | lowest-order approximation | Mathematics, Interdisciplinary Applications | Engineering | Physical Sciences | Technology | Engineering, Multidisciplinary | Mathematics | Science & Technology | Finite volume method | Accuracy | Galerkin method | Robustness (mathematics) | Convergence | 35J Partial differential equations of elliptic type | Difference equations, Partial | solucions numèriques | 65M Partial differential equations, initial value and time-dependent initial-boundary value problems | 35 Partial differential equations | Classificació AMS | 65 Numerical analysis | Differential equations, Elliptic | Anàlisi numèrica | Numerical solutions | Equacions diferencials el·líptiques | Anàlisi matemàtica | Matemàtiques i estadística | Equacions diferencials parcials | Equacions funcionals | Àrees temàtiques de la UPC

finite volume method | face‐centred | hybridisable discontinuous Galerkin | lowest‐order approximation | face-centred | lowest-order approximation | Mathematics, Interdisciplinary Applications | Engineering | Physical Sciences | Technology | Engineering, Multidisciplinary | Mathematics | Science & Technology | Finite volume method | Accuracy | Galerkin method | Robustness (mathematics) | Convergence | 35J Partial differential equations of elliptic type | Difference equations, Partial | solucions numèriques | 65M Partial differential equations, initial value and time-dependent initial-boundary value problems | 35 Partial differential equations | Classificació AMS | 65 Numerical analysis | Differential equations, Elliptic | Anàlisi numèrica | Numerical solutions | Equacions diferencials el·líptiques | Anàlisi matemàtica | Matemàtiques i estadística | Equacions diferencials parcials | Equacions funcionals | Àrees temàtiques de la UPC

Journal Article

2010, Mathematical surveys and monographs, ISBN 9780821849835, Volume no. 162., vii, 608

Book

1987, Mathematical research, ISBN 9780817618803, Volume Bd. 33., 206

Book

2011, Volume 540

Conference Proceeding

Potential analysis, ISSN 0926-2601, 8/2018, Volume 49, Issue 2, pp. 225 - 245

In this paper, we prove that there exists a unique solution to the Dirichlet boundary value problem for a general class of semilinear second order elliptic differential operators which do not...

Geometry | Backward stochastic differential equations | Potential Theory | Functional Analysis | Semilinear second order elliptic differential equations | Dirichlet forms | Secondary 60H30, 31J25 | Probability Theory and Stochastic Processes | Mathematics | Primary 60H60 | Dirichlet boundary value problem | Physical Sciences | Science & Technology | Differential equations | Economic models | Operators | Boundary value problems | Mathematical analysis | Maximum principle | Dirichlet problem | Probabilistic methods

Geometry | Backward stochastic differential equations | Potential Theory | Functional Analysis | Semilinear second order elliptic differential equations | Dirichlet forms | Secondary 60H30, 31J25 | Probability Theory and Stochastic Processes | Mathematics | Primary 60H60 | Dirichlet boundary value problem | Physical Sciences | Science & Technology | Differential equations | Economic models | Operators | Boundary value problems | Mathematical analysis | Maximum principle | Dirichlet problem | Probabilistic methods

Journal Article

Revista matemática iberoamericana, ISSN 0213-2230, 2019, Volume 35, Issue 1, pp. 241 - 315

... value problems of Dirichlet and Neumann types with area integral control or non-tangential maximal control...

First order elliptic systems | Extrapolation | Non-tangential maximal functions | A priori estimates | Second order elliptic systems | Tent spaces | Hardy spaces associated to operators | Boundary layer operators | Dirichlet and Neumann problems | Physical Sciences | Mathematics | Science & Technology

First order elliptic systems | Extrapolation | Non-tangential maximal functions | A priori estimates | Second order elliptic systems | Tent spaces | Hardy spaces associated to operators | Boundary layer operators | Dirichlet and Neumann problems | Physical Sciences | Mathematics | Science & Technology

Journal Article

1984, Proceedings of the Steklov Institute of Mathematics, ISBN 0821830805, Volume 1984, issue 1., xi, 287

Book

Publications of the Research Institute for Mathematical Sciences, ISSN 0034-5318, 2012, Volume 48, Issue 4, pp. 971 - 1055

We consider the inverse problem of determining the coefficients of a general second order elliptic operator in two dimensions by measuring the corresponding Cauchy data on an arbitrary open subset of the boundary...

Complex geometrical optics solution | Magnetic Schröodinger equation | Convection equation | Inverse anisotropic conductivity problem | Uniqueness | Inverse boundary value problem | Partial Cauchy data | Two-dimensional elliptic operator | Physical Sciences | Mathematics | Science & Technology

Complex geometrical optics solution | Magnetic Schröodinger equation | Convection equation | Inverse anisotropic conductivity problem | Uniqueness | Inverse boundary value problem | Partial Cauchy data | Two-dimensional elliptic operator | Physical Sciences | Mathematics | Science & Technology

Journal Article

1987, The University series in mathematics., ISBN 9780306424489, xvi, 353

Book

Abstract and applied analysis, ISSN 1085-3375, 12/2012, Volume 2012, pp. 1 - 13

We are interested in studying a second order of accuracy implicit difference scheme for the solution of the elliptic-parabolic equation with the nonlocal boundary condition...

Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology | Studies | Accuracy | Boundary value problems | Algorithms | Ordinary differential equations | Euclidean space | Hilbert space | Estimates | Optimization | Inequality | Approximation | Mathematical analysis | Coercive force | Differential equations | Norms | Boundary conditions

Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology | Studies | Accuracy | Boundary value problems | Algorithms | Ordinary differential equations | Euclidean space | Hilbert space | Estimates | Optimization | Inequality | Approximation | Mathematical analysis | Coercive force | Differential equations | Norms | Boundary conditions

Journal Article

Abstract and applied analysis, ISSN 1085-3375, 12/2010, Volume 2010, Issue 2010, pp. 1 - 17

A second order of accuracy difference scheme for the approximate solution of the abstract nonlocal boundary value problem −d2u(t)/dt2+Au(t)=g(t), (0≤t≤1), du(t)/dt−Au(t)=f(t), (−1≤t≤0), u(1)=u(−1)+μ...

Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology | Studies | Problems | Boundary value problems | Theorems | Accuracy | Numerical analysis | Partial differential equations | Ordinary differential equations | Mathematical models | Hilbert space | Banach spaces | Estimates | Approximation | Mathematical analysis | Coercive force | Inequalities | Coercivity | Differential equations

Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology | Studies | Problems | Boundary value problems | Theorems | Accuracy | Numerical analysis | Partial differential equations | Ordinary differential equations | Mathematical models | Hilbert space | Banach spaces | Estimates | Approximation | Mathematical analysis | Coercive force | Inequalities | Coercivity | Differential equations

Journal Article

2014, Volume 660

Partial differential equations -- Miscellaneous topics -- Inverse problems | Partial differential equations -- Elliptic equations and systems -- Laplacian operator, reduced wave equation (Helmholtz equation), Poisson equation | Partial differential equations -- Elliptic equations and systems -- Boundary value problems for second-order elliptic equations | Partial differential equations -- Qualitative properties of solutions -- Dependence of solutions on initial and boundary data, parameters | Partial differential equations -- Qualitative properties of solutions -- Periodic solutions | Signal processing | Differential equations, Partial | Numerical analysis -- Partial differential equations, boundary value problems -- Error bounds | Partial differential equations -- Miscellaneous topics -- Partial differential equations with randomness, stochastic partial differential equations | Geophysics -- Geophysics -- Seismology | Numerical analysis -- Numerical methods in Fourier analysis -- Wavelets

Conference Proceeding

1997, 1st ed., Mathematical research, ISBN 9783055017575, Volume 93., 153

Book

2008, Texts in applied mathematics, ISBN 1441921737, Volume 99, 391

This book presents a unified theory of the Finite Element Method and the Boundary Element Method for a numerical solution of second order elliptic boundary value problems...

Finite element method | Boundary value problems | Numerical solutions | Boundary element methods

Finite element method | Boundary value problems | Numerical solutions | Boundary element methods

eBook

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