English

A Multiplication Formula for the Modified Caldero Chapoton Map

Representation Theory 2016-10-04 v1

Abstract

A frieze in the modern sense is a map from the set of objects of a triangulated category C\mathsf{C} to some ring. A frieze XX is characterised by the property that if τxyx\tau x\rightarrow y\rightarrow x is an Auslander-Reiten triangle in C\mathsf{C}, then X(τx)X(x)X(y)=1X(\tau x)X(x)-X(y)=1. The canonical example of a frieze is the (original) Caldero-Chapoton map, which send objects of cluster categories to elements of cluster algebras. \par In \cite{friezes1} and \cite{friezes2}, the notion of generalised friezes is introduced. A generalised frieze XX' has the more general property that X(τx)X(x)X(y){0,1}X'(\tau x)X'(x)-X'(y)\in\{0,1\}. The canonical example of a generalised frieze is the modified Caldero-Chapoton map, also introduced in \cite{friezes1} and \cite{friezes2}. \par Here, we develop and add to the results in \cite{friezes2}. We define Condition F for two maps α\alpha and β\beta in the modified Calero-Chapoton map, and in the case when C\mathsf{C} is 2-Calabi-Yau, we show that it is sufficient to replace a more technical "frieze-like" condition from \cite{friezes2}. We also prove a multiplication formula for the modified Caldero-Chapoton map, which significantly simplifies its computation in practice.

Cite

@article{arxiv.1610.00467,
  title  = {A Multiplication Formula for the Modified Caldero Chapoton Map},
  author = {David Pescod},
  journal= {arXiv preprint arXiv:1610.00467},
  year   = {2016}
}

Comments

21 pages, 5 figures

R2 v1 2026-06-22T16:08:34.309Z