On Functions of Nonconvexity for Graphs of Continuous Functions

We consider the minimization problem min f ٌ¨x q h ¨x dx,

We study a minimization problem in the space W B where B is the ball of 0 R R radius R with center at the origin; the functional considered is not necessarily convex. Under suitable assumptions, we prove the existence of a radially symmetric Ž . decreasing solution. By strengthening the assumptions

We study the graph X(n) that is de"ned as the "nite part of the quotient (n)!T, with T the Bruhat}Tits tree over % O ((1/¹ )) and (n) the principal congruence subgroup of "G¸(% We give concrete realizations of the ¸-functions of the "nite part of the hal#ine !T for "nite unitary representations of

Bilinear isometry, subspaces of continuous functions, generalized peak point ## MSC (2000) 46A55, 46E15 Let A and B be strongly separating linear subspaces of C0(X) and C0(Y ), respectively, and assume that ∂A = ∅ (∂A stands for the set of generalized peak points for A) and ∂B = ∅. Let T : A × B