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2016, Monographs and research notes in mathematics, ISBN 1482210509, xix, 286

Stochastic Cauchy Problems in Infinite Dimensions: Generalized and Regularized Solutions presents stochastic differential equations for random processes with values in Hilbert spaces...

Cauchy problem | Financial Mathematics | Differential Equations | Mathematical Analysis | Stochastic processes | Infinite dimensional Lie algebras | Stochastic differential equations

Cauchy problem | Financial Mathematics | Differential Equations | Mathematical Analysis | Stochastic processes | Infinite dimensional Lie algebras | Stochastic differential equations

Book

1998, Operator theory, advances and applications, ISBN 3764329726, Volume 101., x, 298

Book

2001, Chapman & Hall/CRC monographs and surveys in pure and applied mathematics, ISBN 9781584882503, Volume 120, xxi, 236

Book

Book

1996, Inverse and ill-posed problems series, ISBN 9067642029, iii, 247

Book

2015, London Mathematical Society lecture note series, ISBN 1107477395, Volume 419, vii, 167

Reaction-diffusion theory is a topic which has developed rapidly over the last thirty years, particularly with regards to applications in chemistry and life...

Differential equations, Partial | Differential equations, Parabolic | Cauchy problem

Differential equations, Partial | Differential equations, Parabolic | Cauchy problem

Book

1999, ISBN 9789810238568, ix, 246

Book

8.
MULTI-DIMENSIONAL HYPERBOLIC PARTIAL DIFFERENTIAL EQUATIONS: FIRST-ORDER SYSTEMS AND APPLICATIONS

2007, OXFORD MATHEMATICAL MONOGRAPHS., ISBN 9780199211234, Volume 9780199211234, 535

This book presents a view of the state of the art in multi-dimensional hyperbolic partial differential equations, with a particular emphasis on problems in which modern tools of analysis have proved useful...

Applied Mathematics | Linear problem | Shock waves | Nonlinear problem | Cauchy problem

Applied Mathematics | Linear problem | Shock waves | Nonlinear problem | Cauchy problem

Book

2010, ISBN 9789814282352, xii, 268

Book

1983, Encyclopedia of Mathematics and its Applications, ISBN 9780201135176, Volume 18., xxii, 636

This volume deals with the Cauchy or initial value problem for linear differential equations...

Initial value problems | Cauchy problem | Functional differential equations

Initial value problems | Cauchy problem | Functional differential equations

Book

Nonlinear dynamics, ISSN 0924-090X, 10/2012, Volume 71, Issue 4, pp. 685 - 700

...Nonlinear Dyn (2013) 71:685–700
DOI 10.1007/s11071-012-0452-9
ORIGINAL PAPER
Abstract Cauchy problem for fractional differential
equations
JinRong Wang · Yong...

Impulsive problems | Engineering | Vibration, Dynamical Systems, Control | Hausdorff measure of noncompactness | Fractional differential equations | Cauchy problems | Mechanics | Automotive Engineering | Mechanical Engineering | Nonlocal problems | Technology | Engineering, Mechanical | Science & Technology | Universities and colleges | Analysis | Differential equations | Resveratrol | Theorems | Fixed points (mathematics) | Banach space | Mathematical analysis | Cauchy problem | Nonlinear dynamics | Uniqueness

Impulsive problems | Engineering | Vibration, Dynamical Systems, Control | Hausdorff measure of noncompactness | Fractional differential equations | Cauchy problems | Mechanics | Automotive Engineering | Mechanical Engineering | Nonlocal problems | Technology | Engineering, Mechanical | Science & Technology | Universities and colleges | Analysis | Differential equations | Resveratrol | Theorems | Fixed points (mathematics) | Banach space | Mathematical analysis | Cauchy problem | Nonlinear dynamics | Uniqueness

Journal Article

2007, De Gruyter series in nonlinear analysis and applications, ISBN 9783110189421, Volume 11, xi, 303

Book

Archive for rational mechanics and analysis, ISSN 1432-0673, 10/2018, Volume 232, Issue 2, pp. 557 - 590

...) subject to arbitrarily large and smooth initial data is a challenging problem. In the case when the fluid density is away from vacuum (strictly positive...

Physics, general | Fluid- and Aerodynamics | Theoretical, Mathematical and Computational Physics | Complex Systems | Physics | Classical Mechanics | Mechanics | Physical Sciences | Mathematics | Mathematics, Applied | Technology | Science & Technology | Boundary value problems | Compressibility | Fluid dynamics | Cauchy problems | Mathematical analysis | Sobolev space | Fluid flow | Perturbation | Well posed problems | Density | Navier-Stokes equations | Cauchy problem | Mathematics - Analysis of PDEs

Physics, general | Fluid- and Aerodynamics | Theoretical, Mathematical and Computational Physics | Complex Systems | Physics | Classical Mechanics | Mechanics | Physical Sciences | Mathematics | Mathematics, Applied | Technology | Science & Technology | Boundary value problems | Compressibility | Fluid dynamics | Cauchy problems | Mathematical analysis | Sobolev space | Fluid flow | Perturbation | Well posed problems | Density | Navier-Stokes equations | Cauchy problem | Mathematics - Analysis of PDEs

Journal Article

2011, ISBN 9789814295703, xvii, 219

Book

1986, ISBN 9780821845172, Volume 64., vi, 290

Book

16.
Full Text
Indirect Boundary Integral Equation Method for the Cauchy Problem of the Laplace Equation

Journal of scientific computing, ISSN 1573-7691, 10/2016, Volume 71, Issue 2, pp. 469 - 498

In this paper, we examine the Cauchy problem of the Laplace equation. Motivated by the incompleteness of the single-layer potential function method, we investigate the double-layer potential function method...

65R32 | Computational Mathematics and Numerical Analysis | Algorithms | 31A25 | Theoretical, Mathematical and Computational Physics | Appl.Mathematics/Computational Methods of Engineering | Mathematics | 65N21 | Boundary element method | Morozov discrepancy principle | Cauchy problem | Physical Sciences | Mathematics, Applied | Science & Technology | Signal processing | Analysis | Methods | Numerical analysis | Cauchy problems | Integral equations | Laplace equation | Queuing theory | Ill posed problems | Regularization | Mathematical programming

65R32 | Computational Mathematics and Numerical Analysis | Algorithms | 31A25 | Theoretical, Mathematical and Computational Physics | Appl.Mathematics/Computational Methods of Engineering | Mathematics | 65N21 | Boundary element method | Morozov discrepancy principle | Cauchy problem | Physical Sciences | Mathematics, Applied | Science & Technology | Signal processing | Analysis | Methods | Numerical analysis | Cauchy problems | Integral equations | Laplace equation | Queuing theory | Ill posed problems | Regularization | Mathematical programming

Journal Article

2002, 1st ed., Aspects of mathematics., ISBN 3528069546, Volume 34, x, 362

Book

2009, ESI lectures in mathematics and physics, ISBN 9783037190531, xiii, 294

Book

2017, ISBN 3319676113, 215

eBook

Applied mathematics & optimization, ISSN 1432-0606, 12/2017, Volume 80, Issue 2, pp. 447 - 478

...Appl Math Optim (2019) 80:447–478
https://doi.org/10.1007/s00245-017-9471-8
Wellposedness and Decay Rates for the Cauchy
Problem of the Moore–Gibson–Thompson...

Energy method | Decay rate | 35B37 | Systems Theory, Control | Theoretical, Mathematical and Computational Physics | Moore–Gibson–Thompson equation | Fourier transform | Mathematics | 35L55 | Eigenvalues expansion method | Mathematical Methods in Physics | 74D05 | 93D20 | Calculus of Variations and Optimal Control; Optimization | 93D15 | Numerical and Computational Physics, Simulation | Physical Sciences | Mathematics, Applied | Science & Technology | Viscoelasticity | Computational fluid dynamics | Eigenvalues | Frequency analysis | Viscoelastic materials | Eigen values | Cauchy problem | Mathematics - Analysis of PDEs

Energy method | Decay rate | 35B37 | Systems Theory, Control | Theoretical, Mathematical and Computational Physics | Moore–Gibson–Thompson equation | Fourier transform | Mathematics | 35L55 | Eigenvalues expansion method | Mathematical Methods in Physics | 74D05 | 93D20 | Calculus of Variations and Optimal Control; Optimization | 93D15 | Numerical and Computational Physics, Simulation | Physical Sciences | Mathematics, Applied | Science & Technology | Viscoelasticity | Computational fluid dynamics | Eigenvalues | Frequency analysis | Viscoelastic materials | Eigen values | Cauchy problem | Mathematics - Analysis of PDEs

Journal Article

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