English

Weak saturation of multipartite hypergraphs

Combinatorics 2023-10-10 v2

Abstract

Given qq-uniform hypergraphs (qq-graphs) F,GF,G and HH, where GG is a spanning subgraph of FF, GG is called weakly HH-saturated in FF if the edges in E(F)E(G)E(F)\setminus E(G) admit an ordering e1,,eke_1,\dots, e_k so that for all i[k]i\in [k] the hypergraph G{e1,,ei}G\cup \{e_1,\dots,e_i\} contains an isomorphic copy of HH which in turn contains the edge eie_i. The weak saturation number of HH in FF is the smallest size of an HH-weakly saturated subgraph of FF. Weak saturation was introduced by Bollob\'as in 1968, but despite decades of study our understanding of it is still limited. The main difficulty lies in proving lower bounds on weak saturation numbers, which typically withstands combinatorial methods and requires arguments of algebraic or geometrical nature. In our main contribution in this paper we determine exactly the weak saturation number of complete multipartite qq-graphs in the directed setting, for any choice of parameters. This generalizes a theorem of Alon from 1985. Our proof combines the exterior algebra approach from the works of Kalai with the use of the colorful exterior algebra motivated by the recent work of Bulavka, Goodarzi and Tancer on the colorful fractional Helly theorem. In our second contribution answering a question of Kronenberg, Martins and Morrison, we establish a link between weak saturation numbers of bipartite graphs in the clique versus in a complete bipartite host graph. In a similar fashion we asymptotically determine the weak saturation number of any complete qq-partite qq-graph in the clique, generalizing another result of Kronenberg et al.

Keywords

Cite

@article{arxiv.2109.03703,
  title  = {Weak saturation of multipartite hypergraphs},
  author = {Denys Bulavka and Martin Tancer and Mykhaylo Tyomkyn},
  journal= {arXiv preprint arXiv:2109.03703},
  year   = {2023}
}

Comments

6 pages. We have improved the presentation. To appear in Combinatorica

R2 v1 2026-06-24T05:47:34.179Z