Local BRST cohomology in the antifield formalism: I. General theorems
Abstract
We establish general theorems on the cohomology H*(s|d) of the BRST differential modulo the spacetime exterior derivative, acting in the algebra of local p-forms depending on the fields and the antifields (=sources for the BRST variations). It is shown that H-k(s|d) is isomorphic to Hk(δ |d) in negative ghost degree -k\ (k>0), where δ is the Koszul-Tate differential associated with the stationary surface. The cohomological group H1(δ |d) in form degree n is proved to be isomorphic to the space of constants of the motion, thereby providing a cohomological reformulation of Noether theorem. More generally, the group Hk(δ|d) in form degree n is isomorphic to the space of n-k forms that are closed when the equations of motion hold. The groups Hk(δ|d) (k>2) are shown to vanish for standard irreducible gauge theories. The group H2(δ|d) is then calculated explicitly for electromagnetism, Yang-Mills models and Einstein gravity. The invariance of the groups Hk(s|d) under the introduction of non minimal variables and of auxiliary
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