Cubic and General Extensions of the Lorentz Transformation

We associate with an arbitrary system its Poincare observables. In supposing that its interaction is governed by a Hamiltonian formalism and in imposing Lorentz invariance, we show that the evolution is described by two equations which have the form of the Lorentz equation and the Thomas-Bargmann-Mi

A b s t r a c t , A generalized Dirac equation is presented as a model theory of disturbed Lorentz invariance. The physical properties of this model and experimental consequences are discussed. A program its described how such Lorentz noninvariant equations may be produced by cosmologicel induction

In this paper we generalize the cd -index of the cubical lattice to an r -cd -index , which we denote by Õ ( r ) . The coef ficients of Õ ( r ) enumerate augmented Andre ´ r -signed permutations , a generalization of Purtill's work relating the cd -index of the cubical lattice and signed Andre ´ per