Bifurcating extremal domains for the first eigenvalue of the Laplacian

Abstract

We prove the existence of a smooth family of non-compact domains Omegas ⊂ Rn+1 bifurcating from the straight cylinder Bn × R for which the first eigenfunction of the Laplacian with 0 Dirichlet boundary condition also has constant Neumann data at the boundary. The domains Omegas are rotationally symmetric and periodic with respect to the R-axis of the cylinder; they are of the form Omegas = (x,t) ∈ Rn × R |x| < 1+s ((2π)/Ts t) + O(s2) where Ts = T0 + O(s) and T0 is a positive real number depending on n. For n 2 these domains provide a smooth family of counter-examples to a conjecture of Berestycki, Caffarelli and Nirenberg. We also give rather precise upper and lower bounds for the bifurcation period T0. This work improves a recent result of the second author.