Morse theory for Lagrange multipliers and adiabatic limits

Abstract

Given two Morse functions f, μ on a compact manifold M, we study the Morse homology for the Lagrange multiplier function on M × R which sends (x, η) to f(x) + η μ(x). Take a product metric on M × R, and rescale its R-component by a factor λ2. We show that generically, for large λ, the Morse-Smale-Witten chain complex is isomorphic to the one for f and the metric restricted to μ-1(0), with grading shifted by one. On the other hand, let λ 0, we obtain another chain complex, which is geometrically quite different but has the same homology as the singular homology of μ-1(0) and the isomorphism between them is provided by the homotopy by varying λ. Our proofs contain both the implicit function theorem on Banach manifolds and geometric singular perturbation theory.