The geometry of the critical set of nonlinear periodic Sturm-Liouville operators

Abstract

We study the critical set C of the nonlinear differential operator F(u) = -u" + f(u) defined on a Sobolev space of periodic functions Hp(S1), p >= 1. Let R2xy ⊂ R3 be the plane z = 0 and, for n > 0, let conen be the cone x2 + y2 = tan2 z, |z - 2 pi n| < pi/2; also set Sigma = R2xy U Un > 0 conen. For a generic smooth nonlinearity f: R -> R with surjective derivative, we show that there is a diffeomorphism between the pairs (Hp(S1), C) and (R3, Sigma) x H where H is a real separable infinite dimensional Hilbert space.