Normed representations of weight quivers

Abstract

Let A and B be two tensor rings given by weight quivers. We introduce norms for tensor rings and (A,B)-bimodules, and define an important category Ap in this paper whose object is a triple (N,v,δ) given by an (A,B)-bimodule N, a special element v∈ V satisfying some special conditions, and a special (A,B)-homomorphism δ: Np 2 A N and each morphism (N,v,δ) (N',v',δ') is given by an (A,B)-homomorphism θ: N N' such that θ(v)=v' and δ' θ 2 A = θδ hold. We show that Ap has an initial object such that Daniell integration, Bochner integration, Lebesgue integration, Stone--Weierstrass Approximation Theorem, power series expansion, and Fourier series expansion are morphisms in Ap starting with this initial object.