A General Extension Theorem for Group-Valued Measures

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

## Extensions of group-valued regular BOREL measures By SURJIT SINGH KHURANA of Iowa City (U.S.A.) (Eingegangen a.m 9. 1. 1979) In ([ill) a result is proved about the extension of regular BOREL measures. The main result is Theorem ([Ill, Theorem 10). Let X and Y be compact HAUSDORFF spaces, 9 : X

We prove a rather general mean-value formula in the theory of elasticity, which expresses the value of the displacement at the centre of a sphere in terms of certain combinations of integral averages over the sphere itself of the traction and the displacement. We also establish the corresponding con

Proof. We first prove the paraconvexity of u ( X ) . Consider a, 6 , and y such that u(a) 5 y 5 u(b), and let E > 0. We use an approximate "approximate interval-28 Ztschr. f. math. Logik