Continuity properties of vector measures

## Abstract We consider a class of measures called autophage which was introduced and studied by Szekely for measures on the real line. We show that the autophage measures on finite‐dimensional vector spaces over real or **Q**~__p__~ are infinitely divisible without nontrivial idempotent factors an

We consider the problem of the existence of the product of two vector measures with respect to a continuous bilinear map. We study conditions on the linear map induced by the bilinear form in order to assure the existence of the product of any two vector measures with respect to it. We show that eve

This work is devoted to the investigation of the basic relationship between the geometric shape of a convex set and measure theoretic properties of the associated curvature and surface area measures. We study geometric consequences of and conditions for absolute continuity of curvature and surface a

Let us denote by C p ( K , .), r E {O,. . . , d -1)1 the curvature measures of a convex body K in the Euclidean space Ed with d 1. 2. According to Lebesgue's decomposition theorem the curvature measure of order r of K, C,(K, s), can be written as the sum of an absolutely continuous measure, C:(K, .)

Probabilistic normed PN spaces are real linear spaces in which the norm of each vector is an appropriate probability distribution function řather than a number. Such spaces were first introduced by A. N. Serstnev w x in 1963 3 . w x In a recent paper 1 , we gave a new definition of PN spaces that ǐn