Natural transformations associated with a locally compact group and universality of the global Terrell law

Abstract

Via the construction of a functor from Cu(H) to an auxiliary category we associate, with any triplet (G,F,), two natural transformations, m morphism of Fct(Cu(H)op,Fct(H,set)) and v morphism of Fct(Cu0(H)op,Fct(H,set)). G and F are locally compact groups, :F Aut(G) is a continuous morphism, H is the external topological semidirect product of G and F relative to , Cu0(H) is a subcategory of Cu(H) a subcategory of the category of C-dynamical systems with symmetry group H and equivariant morphisms. For A in Cu0(H) to assemble mA we exploit the Connes characters generated by JLO cocycles on the unitization of certain C-crossed products relative to A, while to construct vA we exert the states of the C-algebra underlying A associated in a convenient manner with the 0-dimensional components of the 's. Being Cu(H) the category of fissioning systems, we use mA and vA to define the nucleon phases and the fragment states resulting next the fission processes of the fissioning system A occur. We apply the naturality of m and v to establish the universality of the global nucleon masses and the global Terrell law, stated as invariance of the light and heavy nucleon core masses and invariance of the prompt-neutron yield under controvariant action of Cu0(H) and under action of H over the field of fission processes.