English

Asymptotic-Type Dimension Bounds through Combinatorial Approaches

Metric Geometry 2026-05-18 v6 Combinatorics

Abstract

We develop a probabilistic framework for large-scale dimension bounds in metric geometry, based on padded decompositions, randomized ball carving on net graphs, and the Lov\'asz Local Lemma. For metric measure spaces with volume doubling constant CDC_{\mathsf D}, we prove the sharp bound asdimAN(X)dimAN(X)log2CD\mathrm{asdim}_{AN}(X)\le \mathrm{dim}_{AN}(X)\le \lfloor{\log_2 C_{\mathsf D}}\rfloor. In particular, if (M,g)(M,g) is a complete Riemannian nn-manifold with Ricg0\mathrm{Ric}_g\ge 0, then asdim(M)n\mathrm{asdim}(M)\le n, thereby settling a question of Papasoglu on manifolds with nonnegative Ricci curvature. We also show that if (X,d,m)(X,\mathsf{d},\mathfrak{m}) is proper, volume noncollapsed, and has polynomial volume growth rate ρV(X)\rho^V(X), then asdim(X)ρV(X)\mathrm{asdim}(X)\le \lfloor{\rho^V(X)}\rfloor. Moreover, the corresponding control function can be chosen to have polynomial growth. This extends Papasoglu's sharp asymptotic-dimension bound from graphs of polynomial growth to a metric-measure setting. As applications, we study equality in the polynomial-growth bound for universal covers of nilmanifolds, and under nonnegative Ricci curvature we relate the equality case in the volume-doubling bound to Gromov largeness, obtaining in particular a consequence for complete manifolds with positive scalar curvature.

Keywords

Cite

@article{arxiv.2411.16660,
  title  = {Asymptotic-Type Dimension Bounds through Combinatorial Approaches},
  author = {Jing Yu and Xingyu Zhu},
  journal= {arXiv preprint arXiv:2411.16660},
  year   = {2026}
}

Comments

29 pages, title changed

R2 v1 2026-06-28T20:11:53.150Z