Rigidity Expander Graphs

被引：0

作者：

Lew, Alan ^{[1
]}

Nevo, Eran ^{[2
]}

Peled, Yuval ^{[2
]}

Raz, Orit E. ^{[2
]}

机构：

[1] Carnegie Mellon Univ, Dept Math Sci, Pittsburgh, PA 15213 USA

[2] Hebrew Univ Jerusalem, Einstein Inst Math, IL-91904 Jerusalem, Israel

来源：

COMBINATORICA | 2025年 / 45卷 / 02期

基金：

美国安德鲁·梅隆基金会;

关键词：

Framework rigidity; Stiffness matrix; Algebraic connectivity; Expander graph; ALGEBRAIC CONNECTIVITY; LAPLACIAN SPECTRUM; FAMILIES;

D O I：

10.1007/s00493-025-00149-z

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Jordan and Tanigawa recently introduced the d-dimensional algebraic connectivity ad(G) of a graph G. This is a quantitative measure of the d-dimensional rigidity of G which generalizes the well-studied notion of spectral expansion of graphs. We present a new lower bound for ad(G) defined in terms of the spectral expansion of certain subgraphs of G associated with a partition of its vertices into d parts. In particular, we obtain a new sufficient condition for the rigidity of a graph G. As a first application, we prove the existence of an infinite family of k-regular d-rigidity-expander graphs for every d >= 2 and k >= 2d+1. Conjecturally, no such family of 2d-regular graphs exists. Second, we show that ad(Kn)>=(1)/(2)& LeftFloor;(n)/(d)& RightFloor;, which we conjecture to be essentially tight. In addition, we study the extremal values ad(G) attains if G is a minimally d-rigid graph.

引用

页数：25

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