Isolated singularities in partial differential inequalities / Marius Ghergu, Steven D. Taliaferro.
Ghergu, Marius| Call Number | 515.353 |
| Author | Ghergu, Marius, author. |
| Title | Isolated singularities in partial differential inequalities / Marius Ghergu, Steven D. Taliaferro. |
| Physical Description | 1 online resource (xii, 349 pages) : digital, PDF file(s). |
| Series | Encyclopedia of mathematics and its applications ; volume 161 |
| Notes | Title from publisher's bibliographic system (viewed on 05 Feb 2016). |
| Summary | In this monograph, the authors present some powerful methods for dealing with singularities in elliptic and parabolic partial differential inequalities. Here, the authors take the unique approach of investigating differential inequalities rather than equations, the reason being that the simplest way to study an equation is often to study a corresponding inequality; for example, using sub and superharmonic functions to study harmonic functions. Another unusual feature of the present book is that it is based on integral representation formulae and nonlinear potentials, which have not been widely investigated so far. This approach can also be used to tackle higher order differential equations. The book will appeal to graduate students interested in analysis, researchers in pure and applied mathematics, and engineers who work with partial differential equations. Readers will require only a basic knowledge of functional analysis, measure theory and Sobolev spaces. |
| Added Author | Taliaferro, Steven D., author. |
| Subject | DIFFERENTIAL EQUATIONS, PARTIAL. |
| Multimedia |
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$a In this monograph, the authors present some powerful methods for dealing with singularities in elliptic and parabolic partial differential inequalities. Here, the authors take the unique approach of investigating differential inequalities rather than equations, the reason being that the simplest way to study an equation is often to study a corresponding inequality; for example, using sub and superharmonic functions to study harmonic functions. Another unusual feature of the present book is that it is based on integral representation formulae and nonlinear potentials, which have not been widely investigated so far. This approach can also be used to tackle higher order differential equations. The book will appeal to graduate students interested in analysis, researchers in pure and applied mathematics, and engineers who work with partial differential equations. Readers will require only a basic knowledge of functional analysis, measure theory and Sobolev spaces.
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| Summary | In this monograph, the authors present some powerful methods for dealing with singularities in elliptic and parabolic partial differential inequalities. Here, the authors take the unique approach of investigating differential inequalities rather than equations, the reason being that the simplest way to study an equation is often to study a corresponding inequality; for example, using sub and superharmonic functions to study harmonic functions. Another unusual feature of the present book is that it is based on integral representation formulae and nonlinear potentials, which have not been widely investigated so far. This approach can also be used to tackle higher order differential equations. The book will appeal to graduate students interested in analysis, researchers in pure and applied mathematics, and engineers who work with partial differential equations. Readers will require only a basic knowledge of functional analysis, measure theory and Sobolev spaces. |
| Notes | Title from publisher's bibliographic system (viewed on 05 Feb 2016). |
| Subject | DIFFERENTIAL EQUATIONS, PARTIAL. |
| Multimedia |