Monomial Golod Quotients of Exterior Algebras

The minimal projective resolution of the left ideal generated by any monomial p in a monomial algebra is described by a combinatorial object, the dimension tree of p. Two algorithms are proposed for computing the desired dimension trees. Determination of finitistic dimensions is then given as one of

The Jones polynomial was originally defined by constructing a Markov trace on the sequence of Temperley-Lieb algebras. In this paper we give a programme for constructing other link invariants by the same method. The data for the constructions is a representation of the three string braid group.

We study the properties of the surjective homomorphism, defined by Beilinson, Lusztig, and MacPherson, from the quantized enveloping algebra of gl to the n Ž . q-Schur algebra, S n, r . In particular, we find an expression for the preimage of q Ž . an arbitrary element of S n, r under this map and a

In this paper we present a minimal projective resolution of a monomial algebra ⌳ over its enveloping algebra. The syzygies for this resolution exhibit an alternating behavior which is explained by the construction of a special sequence of paths from the quiver of ⌳.