Hodge decomposition theorem for Abelian two-form gauge theory

Abstract: Abstract. We show that the BRST/anti-BRST invariant 3 + 1 dimensional 2-form gauge theory has further nilpotent symmetries (dual BRST /anti-dual BRST) that leave the gauge fixing term invariant. The generator for the dual BRST symmetry is analogous to the coexterior derivative of differential geometry. There exists a bosonic symmetry which keeps the ghost terms invariant and it turns out to be the analogue of the Laplacian operator. The Hodge duality operation is shown to correspond to a discrete symmetry in t… Show more

“…Section 3 is central of our present paper and is devoted to the discussion of some special features associated with the 4D 2-form Abelian gauge theory. These features are mainly (i) the proof of this theory to be a field theoretical model for the Hodge theory [25], and (ii) its quasi-topological nature. Both these issues are so elegantly intertwined with each-other that first we present some of the key cohomological properties [25] and, then only, we discuss the quasi-topological nature.…”

“…These features are mainly (i) the proof of this theory to be a field theoretical model for the Hodge theory [25], and (ii) its quasi-topological nature. Both these issues are so elegantly intertwined with each-other that first we present some of the key cohomological properties [25] and, then only, we discuss the quasi-topological nature. We compare and contrast some of the decisive properties of the 4D 2-form and 2D one-form Abelian gauge theories § We adopt here the conventions and notations in which the 4D flat Minkowski metric is: η µν = diag (+1, −1, −1, −1) and totally anti-symmetric Levi-Civita tensor (ε µνκζ ) is chosen such that: in section 4.…”

“…We provide here a concise synopsis of our earlier work [25] on the existence of the offshell nilpotent (s …”

“…These results are intimately connected with the proof of the fact that the 4D 2-form gauge theory is a field theoretic model for the Hodge theory. In this work [25], all the de Rham cohomology operators (d, δ, ∆) are identified with some specific symmetry transformations (and their generators) for the Lagrangian density of the theory. It is straightforward to check that all the six symmetries (on-shell as well as off-shell versions) obey the following operator form of the algebra…”

“…where the local expressions for the conserved charges Q r can be found in [25]. For our present discussions, these expressions are not required to be quoted here.…”

Abelian 2-form gauge theory: special features

“…Section 3 is central of our present paper and is devoted to the discussion of some special features associated with the 4D 2-form Abelian gauge theory. These features are mainly (i) the proof of this theory to be a field theoretical model for the Hodge theory [25], and (ii) its quasi-topological nature. Both these issues are so elegantly intertwined with each-other that first we present some of the key cohomological properties [25] and, then only, we discuss the quasi-topological nature.…”

“…These features are mainly (i) the proof of this theory to be a field theoretical model for the Hodge theory [25], and (ii) its quasi-topological nature. Both these issues are so elegantly intertwined with each-other that first we present some of the key cohomological properties [25] and, then only, we discuss the quasi-topological nature. We compare and contrast some of the decisive properties of the 4D 2-form and 2D one-form Abelian gauge theories § We adopt here the conventions and notations in which the 4D flat Minkowski metric is: η µν = diag (+1, −1, −1, −1) and totally anti-symmetric Levi-Civita tensor (ε µνκζ ) is chosen such that: in section 4.…”

“…We provide here a concise synopsis of our earlier work [25] on the existence of the offshell nilpotent (s …”

“…These results are intimately connected with the proof of the fact that the 4D 2-form gauge theory is a field theoretic model for the Hodge theory. In this work [25], all the de Rham cohomology operators (d, δ, ∆) are identified with some specific symmetry transformations (and their generators) for the Lagrangian density of the theory. It is straightforward to check that all the six symmetries (on-shell as well as off-shell versions) obey the following operator form of the algebra…”

“…where the local expressions for the conserved charges Q r can be found in [25]. For our present discussions, these expressions are not required to be quoted here.…”

Abelian 2-form gauge theory: special features

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