The regularized free fall II -- Homology computation via heat flow

Abstract

In [BOV20] Barutello, Ortega, and Verzini introduced a non-local functional which regularizes the free fall. This functional has a critical point at infinity and therefore does not satisfy the Palais-Smale condition. In this article we study the L2 gradient flow which gives rise to a non-local heat flow. We construct a rich cascade Morse complex which has one generator in each degree k 1. Calculation reveals a rather poor Morse homology having just one generator. In particular, there must be a wealth of solutions of the heat flow equation. These can be interpreted as solutions of the Schr\"odinger equation after a Wick rotation.