Two semigroup rings associated to a finite set of germs of meromorphic functions

Abstract

We fix z0∈ C and a field F with C⊂ F ⊂ Mz0:= the field of germs of meromorphic functions at z0. We fix f1,…,fr∈ Mz0 and we consider the F-algebras S:= F[f1,…,fr] and S:= F[f1 1,…,fr 1]. We present the general properties of the semigroup rings align* & Shol:= F[f a:=f1a1·s frar: (a1,…,ar)∈ Nr and f a is holomorphic at z0],\\ & Shol:= F[f a:=f1a1·s frar: (a1,…,ar)∈ Zr and f a is holomorphic at z0], align* and we tackle in detail the case in which F= M<1 is the field of meromorphic functions of order <1 and fj's are meromorphic functions over C of finite order with a finite number of zeros and poles.