Positive solutions of nonlinear elliptic equations involving critical sobolev exponents Page 1
Positive Solutions of Nonlinear Elliptic Equations Involving Critical Sobolev Exponents HAIM …

Now back in print by the AMS, this is a significantly revised edition of a book originally
published in 1987 by Academic Press. This book gives the reader an introduction to the …

A well-known open question in differential geometry is the question of whether a given
compact Riemannian manifold is necessarily conformally equivalent to one of constant …

Let H=-\L+ V be a general Schrödinger operator on R"(v~> 1), where A is the Laplace
differential operator and V is a potential function on which we assume minimal hypotheses …

1. Introduction. Riemannian differential geometry originated in attempts to generalize the
highly successful theory of compact surfaces. From the earliest days, conformai changes of …

The Encyclopaedia of Mathematics is the most up-to-date, authoritative and comprehensive
English-language work of reference in mathematics which exists today. With over 7,000 …

The main purpose of this paper is to estabLish the local h'6lder continuity of (weak) solutions
of certain classes of degenerate elliptic equations, and to prove a Harnack principle for non …

We survey old and recent results dealing with the existence and properties of solutions to
the Choquard type equations-Δ u+ V (x) u=\left (| x|^-(N-α)*| u|^ p\right)| u|^ p-2 u\quad …

The Concentration-Compactness Principle in the Calculus of Variations. The Limit Case, Part 2
| EMS Press Contact Submissions Search About Updates Journals Books Subscribe To Open …

Ricci flow is a powerful analytic method for studying the geometry and topology of manifolds.
This book is an introduction to Ricci flow for graduate students and mathematicians …