Continuity of the Lp Balls and an Application to Input-Output System Described by the Urysohn Type Integral Operator

Abstract

In this paper the continuity of the set valued map p→ B,X,p(r), p∈ (1,+∞), is proved where B,X,p(r) is the closed ball of the space Lp(,,μ; X) centered at the origin with radius r, (,,μ) is a finite and positive measure space, X is separable Banach space. An application to input-output system described by Urysohn type integral operator is discussed.