Extensions of the ‘immittance ratio summation theorem’

The classical Poisson summation formula 1.1 and the corresponding distribu-Ž . tional formula 1.2 have found extensive applications in various scientific fields. Ž . However, they are not universally valid. For instance, if x is a smooth function, Ž . Ž . the left-hand side of 1.1 is generally dive

The Preiss differentiability theorem for Lipschitz functions on Banach spaces is generalized to locally lower (upper) semi-Lipschitz functions, and several extensions are presented. 1994 Academic Press, Inc.

We obtain a measurable Kirzbraun᎐Valentine extension theorem. As applications, we prove a random approximation theorem and a random fixed point theorem. Our results extend several earlier ones existing in the literature.

let m → E be a finitely additive measure with finite semivariation, defined on a δ-ring of subsets of a given set S. A theory of integration of vector-valued functions f S → E, applicable to the stochastic integration in Banach spaces, is developed in [6, Sect. 5]. Many times a measure m is defined