Superspace BRST/BV operators of superfield gauge theories

Abstract

We consider the superspace BRST and BV description of 4D,~N=1 Super Maxwell theory and its non-abelian generalization Super Yang-Mills. By fermionizing the superspace gauge transformation of the gauge superfields we define the nilpotent superspace BRST symmetry transformation (s). After introducing an appropriate set of anti-superfields and define the superspace antibracket, we use it to construct the BV-BRST nilpotent differential operator (s) in terms of superspace covariant derivatives. The anti-superfield independent terms of s provide a superspace generalization of the Koszul-Tate resolution (δ). In the linearized limit, the set of superspace differential operators that appear in s satisfy a nonlinear algebra which can be used to construct a BRST charge Q without requiring pure spinor variables. Q acts on the Hilbert space of superfield states and its cohomology generates the expected superspace equations of motion.

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