Compact and Weakly Compact Homomorphisms on Fréchet Algebras of Holomorphic Functions

Let X be a perfect, compact subset of the complex plane, let (M n ) be a sequence of positive numbers satisfying M 0 =1 and ( m+n n ) M m+n ÂM m M n , and let D(X, M) With pointwise addition and multiplication, D(X, M) is a commutative normed algebra. In this note we study the endomorphisms of such

For a closed subgroup H of a locally compact group G consider the property that the continuous positive definite functions on G which are identically one on H separate points in G"H from points in H. We prove a structure theorem for almost connected groups having this separation property for every c

## Abstract Let __T__ be a compact disjointness preserving linear operator from __C__~0~(__X__) into __C__~0~(__Y__), where __X__ and __Y__ are locally compact Hausdorff spaces. We show that __T__ can be represented as a norm convergent countable sum of disjoint rank one operators. More precisely,