Fans and generators of free abelian l-groups

Abstract

Let t1,…,tn be -group terms in the variables X1,…,Xm. Let t1,…, tn be their associated piecewise homogeneous linear functions. Let G be the -group generated by t1, …, tn in the free m-generator -group Am. We prove: (i) the problem whether G is -isomorphic to An is decidable; (ii) the problem whether G is -isomorphic to Al (l arbitrary) is undecidable; (iii) for m=n, the problem whether \ t1,…, tn\ is a free generating set is decidable. In view of the Baker-Beynon duality, these theorems yield recognizability and unrecognizability results for the rational polyhedron associated to the -group G. We make pervasive use of fans and their stellar subdivisions.