Half-sided modular inclusion and the construction of the Poincaré group

Let 0 be a finite set of n elements, R a ring of characteristic p>0 and denote by M k the R-module with k-element subsets of 0 as basis. The set inclusion map : M k Ä M k&1 is the homomorphism which associates to a k-element subset 2 the sum (2)=1 1 +1 2 + } } } +1 k of all its (k&1)-element subsets

Monomial representations of familiar finite groups over finite fields are used to Ž . construct infinite semi-direct products of free products of cyclic groups by groups of monomial automorphisms. Finite homomorphic images of these progenitors in which the actions on the group of automorphisms and o

describing quasistable states. In the relativistic domain this leads to Poincare semigroup representations which are í 2 characterized by spin j and by complex invariant mass square s s s s M y G . Relativistic Gamow kets have all the Ž . R R R 2 properties required to describe relativistic resonanc

We construct a special class of noncongruence modular subgroups and curves, analogous in some ways to the usual congruence ones. The subgroups are obtained via the Burau representation, and the associated quotient curves have a natural moduli space interpretation. In fact, they are reduced Hurwitz s