Spanning trees in sparse expanders
Abstract
Given integers n 2, let T(n, ) be the collection of all n-vertex trees with maximum degree at most . A question of Alon, Krivelevich and Sudakov in 2007 asks for determining the best possible spectral gap condition forcing an (n, d,λ)-graph to be T(n, )-universal, namely, it contains all members of T(n, ) as a subgraph simultaneously. In this paper we show that for sufficiently large integer n and all ∈ N, every (n, d,λ)-graph with \[ λd25 n \] is T(n, )-universal. As an immediate corollary, this implies that Alon's ingenious construction of triangle-free sparse expander is T(n, )-universal, which provides an explicit construction of such graphs and thus solves a question of Johannsen, Krivelevich and Samotij. Our main result is formulated under a much more general context, namely, the (n,d)-expanders. More precisely, we show that there exist absolute constants C,c>0 such that the following statement holds for sufficiently large integer n. (1).For all ∈ N, every (n, 5 n)-expander is T(n, )-universal. (2).For all ∈ N with cn, every (n, C n1/2)-expander is T(n, )-universal. Both results significantly improve a result of Johannsen, Krivelevich and Samotij, and have further implications in locally sparse expanders and Maker-Breaker games that also improve previously known results drastically.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.