Smooth invariant foliations and Koopman eigenfunctions about stable equilibria of semiflows

Abstract

We consider a Cr semiflow \ t \t ≥ 0 on a Banach space X admitting a stable fixed point x. We show, along the lines of the parameterization method (Cabr\'e et al., 2003), the existence of a Cr invariant foliation tangent to X1 at x, for an arbitrary D t(x)-invariant subspace X1 ⊂ X satisfying some additional spectral conditions. Uniqueness ensues in a subclass of sufficiently smooth invariant foliations tangent to X1 at x. We then draw relations to Koopman theory, and thereby establish the existence and uniqueness, in some appropriate sense, of Cr Koopman eigenfunctions. We demonstrate that these results apply to the case of the Navier-Stokes system, the archetypal example considered by the modern upheaval of applied 'Koopmanism'.