On Courant's nodal domain property for linear combinations of eigenfunctions, Part I

Abstract

According to Courant's theorem, an eigenfunction as\-sociated with the n-th eigenvalue λ\n has at most n nodal domains. A footnote in the book of Courant and Hilbert, states that the same assertion is true for any linear combination of eigenfunctions associated with eigenvalues less than or equal to λ\n. We call this assertion the Extended Courant Property. this paper, we propose simple and explicit examples for which the extended Courant property is false: convex domains in n (hypercube and equilateral triangle), domains with cracks in R2, on the round sphere S2, and on a flat torus T2.