On Zeta functions and μ-series of string algebras

Abstract

Let μ(t):=Σm≥1μ(m)tm be the μ-series of a finite-dimensional tame algebra over an algebraically closed field, where μ(m) denotes the minimal number of one-parameter families of -modules with total dimension m. When is a string algebra with Ba() as its set of bands up to cyclic permutation, define the zeta function ζ(t):=Π b∈Ba()(1-t| b|)-1, where | b| is the length of b. We prove an analogue of the prime number theorem for string algebras and use it to conclude that non-domestic string algebras are of exponential growth. Finally, we show that a string algebra is domestic if and only if its μ-series is rational.