TY - BOOK ID - 7838515 TI - Analysis, partial differential equations and applications AU - Cialdea, Alberto. AU - Lanzara, Flavia. AU - Ricci, Paolo Emilio. AU - Mazʹi︠a︡, V. G. PY - 2009 SN - 3764398973 9786612827037 3764398981 1282827030 PB - Basel ; Boston : Birkhauser, DB - UniCat KW - Differential equations, Partial. KW - Mathematical physics. KW - Differential equations, Partial KW - Mathematics KW - Calculus KW - Physical Sciences & Mathematics KW - Mathematics. KW - Math KW - Mathematical analysis. KW - Analysis (Mathematics). KW - Operator theory. KW - Partial differential equations. KW - Analysis. KW - Partial Differential Equations. KW - Operator Theory. KW - Science KW - Partial differential equations KW - Functional analysis KW - 517.1 Mathematical analysis KW - Mathematical analysis KW - Global analysis (Mathematics). KW - Differential equations, partial. KW - Analysis, Global (Mathematics) KW - Differential topology KW - Functions of complex variables KW - Geometry, Algebraic UR - https://www.unicat.be/uniCat?func=search&query=sysid:7838515 AB - This volume includes several invited lectures given at the International Workshop "Analysis, Partial Differential Equations and Applications", held at the Mathematical Department of Sapienza University of Rome, on the occasion of the 70th birthday of Vladimir G. Maz'ya, a renowned mathematician and one of the main experts in the field of pure and applied analysis. The book aims at spreading the seminal ideas of Maz'ya to a larger audience in faculties of sciences and engineering. In fact, all articles were inspired by previous works of Maz'ya in several frameworks, including classical and contemporary problems connected with boundary and initial value problems for elliptic, hyperbolic and parabolic operators, Schrödinger-type equations, mathematical theory of elasticity, potential theory, capacity, singular integral operators, p-Laplacians, functional analysis, and approximation theory. Maz'ya is author of more than 450 papers and 20 books. In his long career he obtained many astonishing and frequently cited results in the theory of harmonic potentials on non-smooth domains, potential and capacity theories, spaces of functions with bounded variation, maximum principle for higher-order elliptic equations, Sobolev multipliers, approximate approximations, etc. The topics included in this volume will be particularly useful to all researchers who are interested in achieving a deeper understanding of the large expertise of Vladimir Maz'ya. ER -