Corrigendum: The Conley conjecture for Hamiltonian systems on the cotangent bundle and its analogue for Lagrangian systems

Abstract

In lines 8-11 of [pp. 2977]Lu we wrote: "For integer m 3, if M is Cm-smooth and Cm-1-smooth L:× TM satisfies the assumptions (L1)-(L3), then the functional Lτ is C2-smooth, bounded below, satisfies the Palais-Smale condition, and all critical points of it have finite Morse indexes and nullities (see [Prop.4.1, 4.2]AbF and Be)." However, as proved in AbSc1 the claim that Lτ is C2-smooth is true if and only if for every (t,q) the function v L(t,q,v) is a polynomial of degree at most 2. So the arguments in Lu is only valid for the physical Hamiltonian in (1.2) and corresponding Lagrangian therein. In this note we shall correct our arguments in Lu with a new splitting lemma obtained in Lu2.