Equiangular lines via nodal domains

Abstract

For given >0 and 0<λ<3/2, we show that the maximum multiplicity that λ can appear as the second largest eigenvalue of a connected graph with maximum degree at most is O,λ(1). This result answers a question due to Jiang, Tidor, Yao, Zhang and Zhao [Question 6.4, Ann. of Math. (2) 194 (2021), no. 3, 729-743] in the case of 0<λ<3/2, and consequently leads to improvements in their results on equiangular lines. Our proof is based on the concept of nodal domains of eigenfunctions. Indeed, we establish a multiplicity estimate in terms of maximum degree and cyclomatic number of the graph, via a novel construction of eigenfunctions with large number of nodal domains.