Cover Image
Read Now

Evolution Equations of von Karman Type

In these notes we consider two kinds of nonlinear evolution problems of von Karman type on Euclidean spaces of arbitrary even dimension. Each of these problems consists of a system that results from the coupling of two highly nonlinear partial differential equations, one hyperbolic or parabolic and...

Full description

Bibliographic Details
Main Authors: Cherrier, Pascal, Milani, Albert (Author)
Format: eBook
Language:English
Published: Cham Springer International Publishing 2015, 2015
Edition:1st ed. 2015
Series:Lecture Notes of the Unione Matematica Italiana
Subjects:
Geometry, Differential
Mathematical Physics
Differential Geometry
Differential Equations
Mathematical Methods In Physics
Online Access:
Collection: Springer eBooks 2005- - Collection details see MPG.ReNa
LEADER 02397nmm a2200337 u 4500
001 EB001086857
003 EBX01000000000000000846221
005 00000000000000.0
007 cr|||||||||||||||||||||
008 151215 ||| eng
020 |a 9783319209975 
100 1 |a Cherrier, Pascal 
245 0 0 |a Evolution Equations of von Karman Type  |h Elektronische Ressource  |c by Pascal Cherrier, Albert Milani 
250 |a 1st ed. 2015 
260 |a Cham  |b Springer International Publishing  |c 2015, 2015 
300 |a XVI, 140 p  |b online resource 
505 0 |a Operators and Spaces -- Weak Solutions --  Strong Solutions, m + k _ 4 -- Semi-Strong Solutions, m = 2, k = 1 
653 |a Geometry, Differential 
653 |a Mathematical physics 
653 |a Differential Geometry 
653 |a Differential Equations 
653 |a Differential equations 
653 |a Mathematical Methods in Physics 
700 1 |a Milani, Albert  |e [author] 
041 0 7 |a eng  |2 ISO 639-2 
989 |b Springer  |a Springer eBooks 2005- 
490 0 |a Lecture Notes of the Unione Matematica Italiana 
028 5 0 |a 10.1007/978-3-319-20997-5 
856 4 0 |u https://doi.org/10.1007/978-3-319-20997-5?nosfx=y  |x Verlag  |3 Volltext 
082 0 |a 515.35 
520 |a In these notes we consider two kinds of nonlinear evolution problems of von Karman type on Euclidean spaces of arbitrary even dimension. Each of these problems consists of a system that results from the coupling of two highly nonlinear partial differential equations, one hyperbolic or parabolic and the other elliptic. These systems take their name from a formal analogy with the von Karman equations in the theory of elasticity in two dimensional space. We establish local (respectively global) results for strong (resp., weak) solutions of these problems and corresponding well-posedness results in the Hadamard sense. Results are found by obtaining regularity estimates on solutions which are limits of a suitable Galerkin approximation scheme. The book is intended as a pedagogical introduction to a number of meaningful application of classical methods in nonlinear Partial Differential Equations of Evolution. The material is self-contained and most proofs are given in full detail. The interested reader will gain a deeper insight into the power of nontrivial a priori estimate methods in the qualitative study of nonlinear differential equations 

Similar Items