Reconnectads
Journal article, 2024
We introduce a new operad-like structure that we call a reconnectad; the “input” of an element of a reconnectad is a finite simple graph, rather than a finite set, and “compositions” of elements are performed according to the notion of the reconnected complement of a subgraph. The prototypical example of a reconnectad is given by the collection of toric varieties of graph associahedra of Carr and Devadoss, with the structure operations given by inclusions of orbits closures. We develop the general theory of reconnectads, and use it to study the “wonderful reconnectad” assembled from homology groups of complex toric varieties of graph associahedra.
Koszul duality
toric varieties
Feynman categories
graph associahedra
Author
Vladimir Dotsenko
Institut de Recherche Mathématique Avancée
Adam Keilthy
Chalmers, Mathematical Sciences, Algebra and geometry
University of Gothenburg
Denis Lyskov
National Research University Higher School of Economics
Algebraic Combinatorics
25895486 (eISSN)
Vol. 7 3 801-842Subject Categories (SSIF 2011)
Algebra and Logic
Subatomic Physics
DOI
10.5802/alco.347