Diagonalization of holomorphic functions with values in W∗-algebras

Let ZrF be an inertial Galois extension of Henselian valued fields, and let D be a Z-central division algebra. Let G be a finite group acting on Z with fixed field F. We show that every generalized cocycle of G with values in the one-units Ž . of D is cohomologous to one of the form , 1 , or in othe

Let A be a commutative C U -algebra with identity and open unit ball B. We study holomorphic functions F: B ª B that are idempotent under composition and establish necessary and sufficient conditions for a set R : B to be the image Ž of B under such an idempotent function. In other words, R is a hol

## Abstract Let __N__ ∈ ℕ and let __χ__ be a Dirichlet character modulo __N__. Let __f__ be a modular form with respect to the group Γ~0~(__N__), multiplier __χ__ and weight __k__. Let __F__ be the __L__ ‐function associated with __f__ and normalized in such a way that __F__ (__s__) satisfies a fun