On reverberatory processes in homogeneous neuronal spaces

We consider generalized potential operators with the kernel a ([ (x ,y )]) [ (x ,y )] N on bounded quasimetric measure space (X, μ, d) with doubling measure μ satisfying the upper growth condition μB(x, r) ≤ Kr N , N ∈ (0, ∞). Under some natural assumptions on a(r) in terms of almost monotonicity w

Let EfI

Spatially honiogeneous branching processes in Euclidean space Rd are usually defined in such a way that the evolution law Ex,: of a "particle" 6, a t position x Rd a t time t doesn't depend on x or t , of. MATTHES, KERSTAN and MECKE [8; Chapter 121 or DAWSON [2]. To model a homogeneous "random cnvir

This paper deals with discrete-time Markov control processes with Borel state and control spaces, with possibly unbounded costs and noncompact control constraint sets, and the average cost criterion. Conditions are given for the convergence of the value iteration algorithm to the optimal average cos

The generalized Burgers equation @tu -@xxu + @xu k+1 = 0, with initial data u0 in homogeneous Sobolev spaces are investigated. The starting point of this work is the construction of solutions in . If in addition, the initial data belongs to Lp;s then the obtained solution is actually in L ∞ ([0; ∞)