Hecke Algebras and the Socle of the Projective Indecomposable Modules

We here develop some new algorithms for computing several invariants attached to a projective scheme (dimension, Hilbert polynomial, unmixed part,... ) that are based on liaison theory and therefore connected to properties of the canonical module. The main features of these algorithms are their simp

Let E denote the natural module for the general linear group GL k n over an infinite field k of non-zero characteristic p. We consider here modules which are direct summands of the dth tensor power E md . The original motivation was to study the free Lie algebra. Let L be the d homogeneous component

## IN MEMORIAM MARY GLAZMAN We shall show that the Hecke order H H of the dihedral group of order 2 и p n D n w y1 x over ‫ޚ‬ q, q for an odd prime p is a projectively cellular order. We describe the corresponding cell ideals and compute the extension groups between the correw y1 x sponding cell m

We give a new and shorter proof of the associativity of tensor product for modules for rational vertex operator algebras under certain convergence conditions.