Introduction to commutative algebra and algebraic geometry

of late (all those promises made in the Zurich triple book that are yet to be kept!); but "general" categories have become a little suspect, and unwieldy to boot. On the other hand, general lattices have come back with a vengeance in combinatorics, computer science, and logic; in other words in the

We present recent research of Eisenbud, Fløystad, Schreyer, and others, which was discovered with the help of experimentation with Macaulay 2. In this invited, expository paper, we start by considering the exterior algebra, and the computation of Gröbner bases. We then present, in an elementary mann

In this paper we study the structure of an abelian Hessian algebra. First we show that it can be decomposed into unital abelian Hessian algebras and a complete abelian Hessian algebra (abbreviated by CAHA). Then we show that a unital one is in fact a hyperbolic extension of a CAHA. Next we investiga

We consider a ``dispersive'' evolution equation in a Hilbert space and prove abstract smoothing effects ``in an incoming region'' under a Mourre-type condition ``near infinity.'' For this purpose, we introduce commutator algebras acting on weighted Sobolev spaces associated with two self-adjoint ope

We consider commuting squares of finite dimensional von Neumann algebras having the algebra of complex numbers in the lower left corner. Examples include the vertex models, the spin models (in the sense of subfactor theory), and the commuting squares associated to finite dimensional Kac algebras. To