A non-commutative neutrix product of distributions

The following definition of a non-commutative neutrix product of distributions on R' Definition 1. Let f and g be arbitrary distributions and let gn = g \* Sn , Sn = ne(nz) 12 = 1,2, . . . Where Q be a fixed infinitely differentiable function having the properties (1) e(z) = 0 for 1x1 2 1, (2) e (

Contents. 0. Introduction. 1. The bundle algebra A. 2. Representation of the bundle algebra A. 3. The dual action and the trace. 4. The local characteristic square extended unitary group and modular automorphism group. 5. Conclusions.

Let (X, [R i ] 0 i d ) be a primitive commutative association scheme. If there is a non-symmetric relation R i with valency 3, then the cardinality of X is equal to either p or p 2 where p is an odd prime. Moreover, if |X | = p then (X, [R i ] 0 i d ) is isomorphic to a cyclotomic scheme.