Valuative independence and cluster theta reciprocity

Abstract

We prove that theta functions constructed from positive scattering diagrams satisfy valuative independence. That is, for certain valuations valv, we have valv(Σu cu u)=cu≠ 0 valv(u). As applications, we prove linear independence of theta functions with specialized coefficients and characterize when theta functions for cluster varieties are unchanged by the unfreezing of an index. This yields a general gluing result for theta functions from moduli of local systems on marked surfaces. We then prove that theta functions for cluster varieties satisfy a symmetry property called theta reciprocity: briefly, valv(u)=valu(v). For this we utilize a new framework called a "seed datum" for understanding cluster-type varieties. One may apply valuative independence and theta reciprocity together to identify theta function bases for global sections of line bundles on partial compactifications of cluster varieties.