A construction for locally free sheaves

This note aims at generalizing of classical Morse inequalities for Betti numbers of compact manifolds (cf. [lo, 1,2]). In this paper, we work with R-constructible sheaves instead and encounter the tight relation between Morse theory and microlocal analysis of sheaves. See Witten [ 111, HellTer and S

The groupings of taxa in a phylogenetic tree cannot represent all the conflicting signals that usually occur among site patterns in aligned homologous genetic sequences. Hence a tree-building program must compromise by reporting a subset of the patterns, using some discriminatory criterion. Thus, in

Let X be a n-dimensional complex Stein manifold and F be a perverse sheaf on X. The main result of this paper is that the complex of formal cohomology R1 c (X; F w O X ) [n] is concentrated in degree zero. This result relies on some preliminaries which may have their own interest: flatness of the sh