Evolution Equations: Applications to Physics, Industry, Life Sciences and Economics: EVEQ2000 Conference in Levico Terme (Trento, Italy), October 30–November 4, 2000
Mimmo Iannelli, Gunter Lumer
Birkhäuser, Dec 6, 2012 - Mathematics - 424 pages
The seventh International Conference on Evolution Equations and their main areas of Applications (where the emphasis evolves as time and problems change) was held October 30 to November 4 at the CIRM (Centro Internazionale per la Ricerca Matematica) in Trento, Italy. In keeping with the basic principles and the recent tendencies governing these International Conferences, it brought together many of the world's leading experts in the fields mentioned, with particular effort on facilitating the interaction of established scientists and emerging young promising researchers, as well as the interaction of pure and applied specialists. In the latter directions, emphasis was extended here to include in addition to Physical and Life Sciences, also Industry and Economics. Topics among the recent advances treated here concern new developments in: moving boundary problems, asymptotics in non-linear Volterra equations and other asymptotics related developments, Poincare inequality on stratified sets, time operator and Markov processes in physics related advances, behavior of granu lar matter, stochastic aspects of Hamilton-Jacobi-Bellman equation, very general Paley-Wiener results applied to both classical and generalized functions, Ornstein Uhlenbeck operators and processes, quasilinear PDEs with memory operators, semi-group approach in economics (pricing theory) and other semi-group related developments, convolution-evolution equation in aeroelasticity, new developments in the study of age-structured models, new developments in maximal regularity.
What people are saying - Write a review
We haven't found any reviews in the usual places.
Other editions - View all
Evolution Equations: Applications to Physics, Industry, Life Sciences and ...
No preview available - 2003
2003 Birkhäuser Verlag a e Q A-stable abstract Cauchy problem AIBVP analytic semigroup apply assume assumption asymptotic Aubin Banach algebra Banach space Birkhäuser Verlag Basel/Switzerland boundary conditions bounded calculus Cauchy problem compact consider constant convergence Corollary defined denote differential inclusions Dirichlet domain dynamics E-mail address eigenvalue elliptic elliptic operators evolution exists exponential Frankowska graph Hamilton-Jacobi-Bellman equation Hence Hilbert space hysteresis inequality integral Laplace transform Lemma linear operator Lipschitz Lipschitz continuous Lp(Q Markov semigroup Math Mathematics measure Moreover nonlinear nonnegative norm obtain parabolic partial differential equations population Proof properties Proposition prove Prüss Radon measure satisfies Section sequence set-valued map ſº stochastic subset Theorem 2.1 theory uniformly Volterra equation Willmore flow