A Z2 Structure in the Configuration Space of Yang-Mills Theories

Abstract

We argue for the presence of a Z2 topological structure in the space of static gauge-Higgs field configurations of SU(2n) and SO(2n) Yang-Mills theories. We rigorously prove the existence of a Z2 homotopy group of mappings from the 2-dim. projective sphere RP2 into SU(2n)/ Z2 and SO(2n)/ Z2 Lie groups respectively. Consequently the symmetric phase of these theories admits infinite surfaces of odd-parity static and unstable gauge field configurations which divide into two disconnected sectors with integer Chern-Simons numbers n and n+1/2 respectively. Such a Z2 structure persists in the Higgs phase of the above theories and accounts for the existence of CS=1/2 odd-parity saddle point solutions to the field equations which correspond to spontaneous symmetry breaking mass scales.

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