Witten's perturbation on strata with general adapted metrics

Abstract

Let M be a stratum of a compact stratified space A. It is equipped with a general adapted metric g, which is slightly more general than the adapted metrics of Nagase and Brasselet-Hector-Saralegi. In particular, g has a general type, which is an extension of the type of an adapted metric. A restriction on this general type is assumed, and then g is called good. We consider the maximum/minimun ideal boundary condition, d max/min, of the compactly supported de~Rham complex on M, in the sense of Br\"uning-Lesch. Let H* max/min(M) and max/min denote the cohomology and Laplacian of d max/min. The first main theorem states that max/min has a discrete spectrum satisfying a weak form of the Weyl's asymptotic formula. The second main theorem is a version of Morse inequalities using H max/min*(M) and what we call rel-Morse functions. An ingredient of the proofs of both theorems is a version for d max/min of the Witten's perturbation of the de~Rham complex. Another ingredient is certain perturbation of the Dunkl harmonic oscillator previously studied by the authors using classical perturbation theory. Assume that A is a stratified pseudomanifold, and consider its intersection homology I pH*(A) with perversity p; in particular, the lower and upper middle perversities are denoted by m and n, respectively. Then, for any perversity p m, there is an associated good adapted metric on M satisfying the Nagase isomorphism Hr max(M) I pHr(A)* (r∈). If M is oriented and p n, we also get Hr min(M) I pHr(A). Thus our version of the Morse inequalities can be described in terms of I pH*(A).