English

Higher dimensional Frobenius problem: Maximal saturated cone, growth function and rigidity

Number Theory 2014-11-27 v1

Abstract

We consider mm integral vectors X1,...,XmZsX_1,...,X_m \in \mathbb{Z}^s located in a half-space of Rs\mathbb{R}^s (ms1m\ge s\geq 1) and study the structure of the additive semi-group X1N+...+XmNX_1 \mathbb{N} +... + X_m \mathbb{N}. We introduce and study maximal saturated cone and directional growth function which describe some aspects of the structure of the semi-group. When the vectors X1,...,XmX_1, ..., X_m are located in a fixed hyperplane, we obtain an explicit formula for the directional growth function and we show that this function completely characterizes the defining data (X1,...,Xm)(X_1, ..., X_m) of the semi-group. The last result will be applied to the study of Lipschitz equivalence of Cantor sets (see [H. Rao and Y. Zhang, Higher dimensional Frobenius problem and Lipschitz equivalence of Cantor sets, Preprint 2014]).

Keywords

Cite

@article{arxiv.1411.7118,
  title  = {Higher dimensional Frobenius problem: Maximal saturated cone, growth function and rigidity},
  author = {Ai-hua Fan and Hui Rao and Yuan Zhang},
  journal= {arXiv preprint arXiv:1411.7118},
  year   = {2014}
}
R2 v1 2026-06-22T07:12:41.037Z