Generalized Averages for Solutions of Nonlinear Operators

## Abstract Let __H__(U) be the space of all analytic functions in the unit disk U, and let co__E__ denote the convex hull of the set __E__ ⊂ ℂ. If __K__ ⊂ __H__(U) then the operator I : __K__ → __H__(U) is said to be an __averaging operator__ if For a function __h__ ∈ __A__ ⊂ __H__(U) we will det

We consider the generalized Schro dinger operator &2++, where + is a nonnegative Radon measure in R n , n 3. Assuming that + satisfies certain scale-invariant Kato conditions and doubling conditions we establish the following bounds for the fundamental solution of &2++ in R n , where d(x, y, +) is

## Abstract In this paper, we consider a class of generalized diffusion equations which are of great interest in mathematical physics. For some of these equations that model fast diffusion, nonclassical and nonclassical potential symmetries are derived. These symmetries allow us to increase the num