English

Blobbed topological recursion: properties and applications

Mathematical Physics 2017-08-22 v2 math.MP

Abstract

We study the set of solutions (ωg,n)g0,n1(\omega_{g,n})_{g \geq 0,n \geq 1} of abstract loop equations. We prove that ωg,n\omega_{g,n} is determined by its purely holomorphic part: this results in a decomposition that we call "blobbed topological recursion". This is a generalization of the theory of the topological recursion, in which the initial data (ω0,1,ω0,2)(\omega_{0,1},\omega_{0,2}) is enriched by non-zero symmetric holomorphic forms in nn variables (ϕg,n)2g2+n>0(\phi_{g,n})_{2g - 2 + n > 0}. In particular, we establish for any solution of abstract loop equations: (1) a graphical representation of ωg,n\omega_{g,n} in terms of ϕg,n\phi_{g,n}; (2) a graphical representation of ωg,n\omega_{g,n} in terms of intersection numbers on the moduli space of curves; (3) variational formulae under infinitesimal transformation of ϕg,n\phi_{g,n} ; (4) a definition for the free energies ωg,0=Fg\omega_{g,0} = F_g respecting the variational formulae. We discuss in detail the application to the multi-trace matrix model and enumeration of stuffed maps.

Cite

@article{arxiv.1502.00981,
  title  = {Blobbed topological recursion: properties and applications},
  author = {Gaëtan Borot and Sergey Shadrin},
  journal= {arXiv preprint arXiv:1502.00981},
  year   = {2017}
}

Comments

48 pages, 17 figures. v2: corrected a statement in Section 7 + typos

R2 v1 2026-06-22T08:21:01.132Z