First eigenvalue and nodal domains of the drift Laplacian on symmetric self-shrinkers in R3

Abstract

Consider R3 equipped with the Euclidean metric and the Gaussian measure. Let be a complete embedded self-shrinker in R3 with the induced metric and weighted measure, and let λ1 denote the first eigenvalue of the drift Laplacian in the weighted L2 space. Inspired by Choe and Soret's estimate of the first eigenvalue of the Laplacian on symmetric minimal surfaces in S3, we prove that λ1= 1/2 for self-shrinkers invariant under the dihedral group Dg+1 or the prismatic group Dg+1× Z2. In particular, this holds for known self-shrinkers confirming a universal spectral property tied to their symmetry.