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On the number of high-dimensional partitions

Cosmin Pohoata, Dmitriy Zakharov

Abstract

Let $P_{d}(n)$ denote the number of $n \times \ldots \times n$ $d$-dimensional partitions with entries from $\left\{0,1,\ldots,n\right\}$. Building upon the works of Balogh-Treglown-Wagner and Noel-Scott-Sudakov, we show that when $d \to \infty$, $$P_{d}(n) = 2^{(1+o_{d}(1)) \sqrt{\frac{6}{(d+1)π}} \cdot n^{d}}$$ holds for all $n \geq 1$. This makes progress towards a conjecture of Moshkovitz-Shapira [{\it{Adv. in Math.}} 262 (2014), 1107--1129]. Via the main result of Moshkovitz and Shapira, our estimate also determines asymptotically a Ramsey theoretic parameter related to Erdős-Szekeres-type functions, thus solving a problem of Fox, Pach, Sudakov, and Suk [{\it{Proc. Lond. Math. Soc.}} 105 (2012), 953--982]. Our main result is a new supersaturation theorem for antichains in $[n]^{d}$, which may be of independent interest.

On the number of high-dimensional partitions

Abstract

Let denote the number of -dimensional partitions with entries from . Building upon the works of Balogh-Treglown-Wagner and Noel-Scott-Sudakov, we show that when , holds for all . This makes progress towards a conjecture of Moshkovitz-Shapira [{\it{Adv. in Math.}} 262 (2014), 1107--1129]. Via the main result of Moshkovitz and Shapira, our estimate also determines asymptotically a Ramsey theoretic parameter related to Erdős-Szekeres-type functions, thus solving a problem of Fox, Pach, Sudakov, and Suk [{\it{Proc. Lond. Math. Soc.}} 105 (2012), 953--982]. Our main result is a new supersaturation theorem for antichains in , which may be of independent interest.
Paper Structure (6 sections, 6 theorems, 37 equations)

This paper contains 6 sections, 6 theorems, 37 equations.

Key Result

Theorem 1.1

For every $n \geqslant 1$,

Theorems & Definitions (9)

  • Theorem 1.1
  • Theorem 1.2
  • Theorem 2.1
  • Lemma 2.1
  • proof
  • Lemma 2.2
  • proof
  • proof
  • Lemma 2.3