The product on -spaces of rational forms

Abstract

Let V be a quasi-conformal grading-restricted vertex algebra, W be its module, and z1, …, zn be the space of rational differential forms with complex parameters (z1, …, zn) for n 0. Using geometric interpretation in terms of two Riemann spheres sewing we define a product of elements of two spaces x1, …, xk and y1, …, yn, and study its properties. A product is introduced also for elements of two spaces Ckm(V, ) × Cnm'(V, ) Ck+nm+m'(V, ) of the corresponding chain complex of rational differential forms invariant with respect to transformations of complex parameters.