English

Quivers with subadditive labelings: classification and integrability

Combinatorics 2017-03-08 v2 Mathematical Physics math.MP Representation Theory

Abstract

Strictly subadditive, subadditive and weakly subadditive labelings of quivers were introduced by the second author, generalizing Vinberg's definition for undirected graphs. In our previous work we have shown that quivers with strictly subadditive labelings are exactly the quivers exhibiting Zamolodchikov periodicity. In this paper, we classify all quivers with subadditive labelings. We conjecture them to exhibit a certain form of integrability, namely, as the TT-system dynamics proceeds, the values at each vertex satisfy a linear recurrence. Conversely, we show that every quiver integrable in this sense is necessarily one of the 1919 items in our classification. For the quivers of type A^A\hat A \otimes A we express the coefficients of the recurrences in terms of the partition functions for domino tilings of a cylinder, called \emph{Goncharov-Kenyon Hamiltonians}. We also consider tropical TT-systems of type A^A\hat A \otimes A and explain how affine slices exhibit solitonic behavior, i.e. soliton resolution and speed conservation. Throughout, we conjecture how the results in the paper are expected to generalize from A^A\hat A \otimes A to all other quivers in our classification.

Keywords

Cite

@article{arxiv.1606.04878,
  title  = {Quivers with subadditive labelings: classification and integrability},
  author = {Pavel Galashin and Pavlo Pylyavskyy},
  journal= {arXiv preprint arXiv:1606.04878},
  year   = {2017}
}

Comments

46 pages, 21 figures; v2: all results concerning real rootedness of the recurrence polynomials have been restated as conjectures

R2 v1 2026-06-22T14:26:13.080Z