Abstract

Within the framework of augmented version of superfield formalism, we derive the superspace unitary operator and show its usefulness in the derivation of Becchi-Rouet-Stora-Tyutin (BRST) and anti-BRST symmetry transformations for a set of interesting models for the Abelian 1-form gauge theories. These models are (i) a one (0+1)-dimensional (1D) toy model of a rigid rotor, (ii) the two (1+1)-dimensional (2D) modified versions of the Proca and anomalous Abelian 1-form gauge theories, and (iii) the 2D self-dual bosonic gauge field theory. We provide, in some sense, the alternatives to the horizontality condition (HC) and the gauge invariant restrictions (GIRs) in the language of the above superspace (SUSP) unitary operator. One of the key observations of our present endeavor is the result that the SUSP unitary operator and its Hermitian conjugate are found to be the same for all the Abelian models under consideration (including the 4D interacting Abelian 1-form gauge theories with Dirac and complex scalar fields which have been discussed earlier). Thus, we establish the universality of the SUSP operator for the above Abelian theories.

1. Introduction

The usual superfield approach [1–8] to Becchi-Rouet-Stora-Tyutin (BRST) formalism is a geometrically rich and physically very intuitive method which sheds light on the physical interpretation of the nilpotency and absolute anticommutativity property of the proper (anti-)BRST symmetries. These properties are sacrosanct because the nilpotency property encodes the fermionic nature of the (anti-)BRST symmetries and the absolute anticommutativity property represents the linear independence of the BRST and anti-BRST symmetries. In addition, the above superfield approach also leads to the derivation of the precise form of the (anti-)BRST symmetries and associated Curci-Ferrari (CF) condition in the description of the -form () (non-)Abelian gauge theories (see, e.g., [4–6, 9, 10], for details). However, this approach is useful only in the derivation of the (anti-)BRST symmetries for the -form gauge and associated (anti-)ghost fields of a given -form gauge theory. It does not shed any light on the derivation of the (anti-)BRST symmetries that are associated with the matter fields in a given interacting -form gauge theory.

The above superfield approach has been consistently generalized so as to derive the (anti-)BRST symmetries for the gauge, associated (anti-)ghost and matter fields of a given interacting (non-)Abelian 1-form gauge theory by invoking the horizontality condition (HC) and the gauge (i.e., (anti-)BRST) invariant restrictions (GIRs) on the superfields defined on the (D, 2)-dimensional supermanifold corresponding to a given D-dimensional interacting (non-)Abelian 1-form gauge theory defined on the D-dimensional flat Minkowski spacetime ordinary manifold (see, e.g., [11–14]). The consistently generalized version of the superfield approach to BRST formalism [4–6] has been christened as the augmented version of superfield approach to BRST formalism in our earlier works [11–14].

In the seminal works [4–6], a superspace (SUSP) unitary operator has been introduced to derive the (anti-)BRST symmetries associated with the gauge field, (anti-)ghost fields, and a generic matter field in the context of the superfield approach to BRST formalism. This SUSP unitary operator has been introduced so as to maintain the explicit group structure in the SUSP transformation space of the fields of a given 4D non-Abelian 1-form gauge theory. However, the precise expressions for this SUSP unitary operator and its Hermitian conjugate have not been explicitly derived mathematically. Rather, these expressions have been chosen intelligently. The Hermitian conjugate operator (corresponding to a SUSP unitary operator) has been derived after imposing some Hermitian conjugation conditions from outside on the fields as well as the Grassmannian parameters of the superfield version of the theory. The above SUSP operators, besides maintaining the group structure, provide the alternatives to the HC and GIRs as we will see in our further discussions.

In a very recent couple of papers [15, 16], we have been able to derive explicitly the expressions for the SUSP unitary operator and its Hermitian conjugate without imposing any outside Hermitian conjugation conditions on the fields and/or the Grassmannian variables of the supersymmetrized version of the interacting 4D Abelian and (non-)Abelian 1-form gauge theories. In the former case, we have discussed the QED with Dirac and complex scalar fields coupled with the Abelian 1-form gauge field [15] and, in the latter case, we have considered the 4D non-Abelian interacting theory with Dirac fields. The purpose of our present endeavor is to show the universality of the above SUSP unitary operator and its Hermitian conjugate in the description of the 1D and 2D Abelian 1-form gauge theories of different kinds where the covariant derivatives are not explicitly defined. For this purpose, we take into consideration the 1D toy model of a rigid rotor and the 2D modified versions of the Proca as well as the anomalous gauge theories and the 2D self-dual bosonic theory. These models are very interesting Abelian 1-form theories in one and two dimensions of spacetime because these have been proven to provide the physical examples of Hodge theory (see, e.g., [17–23]) where there exist many interesting internal symmetries (and corresponding conserved charges). To be precise, the models under considerations respect the proper (anti-)BRST and (anti-)co-BRST symmetry transformations, a unique bosonic symmetry transformation, and the ghost-scale symmetry transformations which together provide the physical realizations of the cohomological operators of differential geometry.

In our present investigation, we have applied the augmented version of superfield/supervariable formalism to derive the (anti-)BRST symmetries for the 2D and 1D Abelian 1-form gauge theories and expressed these results in terms of the SUSP unitary operators. We have shown that the mathematical form of the SUSP unitary operator and its Hermitian conjugate is universal for the 1D, 2D, and 4D 1-form gauge theories. In fact, we have obtained the universal form of the above operators which maintain the group structure in the SUSP transformation space of the gauge variables/fields and other variables/fields of these theories. Furthermore, the SUSP unitary operators have also been shown to provide the alternatives to the HC and GIRs that enable us to derive the full set of proper (anti-)BRST symmetry transformations for all the variables/fields of a given theory. The universality of the mathematical form of the SUSP unitary operator (and its Hermitian conjugate) is one of the highlights of our present investigation where we have considered different kinds of Abelian 1-form gauge theories.

Our present investigation is essential because it is motivated by the following key factors. First and foremost, we have demonstrated the universality of the SUSP unitarity operator (and its Hermitian conjugate) for all the Abelian 1-form gauge theories defined on the 1D, 2D, and 4D flat background Minkowski spacetime manifolds. This observation is one of the decisive features of our present investigation. Second, the existence of the SUSP unitarity operator (and its Hermitian conjugate) provides the alternatives to the HC and the GIRs where the group structure is very explicitly and elegantly maintained. This is a very nice feature of the SUSP unitary operator and its Hermitian conjugate. This group structure is somewhat hidden when we exploit the potential and power of the HC and the GIRs. Third, the Abelian models under considerations are interesting because they provide a set of tractable examples of the Hodge theory within the framework of BRST formalism [17–23]. Finally, our present work is our modest first step towards our central goal of providing a theoretical generality for the existence of the SUSP unitarity operator and its Hermitian conjugate for the interacting non-Abelian gauge theories as well.

The material of our present investigation is organized as follows. In Section 2, to set up the convention and notations, we discuss briefly the (anti-)BRST symmetries in the Lagrangian formulation for the one (0+1)-dimensional (1D) toy model of a rigid rotor and 2D modified versions of the Proca theory as well as the anomalous gauge theory and 2D self-dual bosonic field theory; Section 3 is devoted to a concise description of the HC and the GIRs which enable us to derive the above (anti-)BRST symmetry transformations within the framework of augmented superfield formalism. Section 4 deals with the derivation of the results, obtained in Section 3, in terms of the superspace unitarity operator and its Hermitian conjugate. Finally, we summarize our key results, make some concluding remarks, and point out a few future directions for further investigations in Section 5.

General Notations and Convention. We denote the (anti-)BRST symmetries for all the Abelian models by the symbols in our present endeavor. For the 2D theories, we adopt the convention such that the 2D background Minkowski spacetime manifold is endowed with the metric with the signatures (+1, −1) so that the dot product between two nonnull vectors and is denoted by , where the Greek indices stand for the spacetime directions and the Latin indices correspond to the space direction only. We choose the 2D Levi-Civita tensor (with ) which satisfy , , and . We denote the scalar field by in the cases of the 2D modified versions of Proca theory, anomalous gauge theory, and the 2D self-dual chiral bosonic theory. The corresponding superfield has been denoted by within the framework of superfield formalism.

2. Preliminaries: (Anti-)BRST Symmetries

We discuss here, first of all, the (anti-)BRST symmetries in the context of a 1D toy model of a rigid rotor (with mass ) which is described by the following first-order (anti-)BRST invariant Lagrangian (see, e.g., [17–19, 24], for details): where is a pair of polar coordinates, the pair corresponds to the conjugate momenta with respect to , is the Lagrange multiplier that turns out to be the analogue of the “gauge” variable, is the Nakanishi-Lautrup type auxiliary variable, and the fermionic , (anti-)ghost variables are needed for the sake of unitarity in our theory. The above Lagrangian (1) respects the following supersymmetric type off-shell nilpotent and absolutely anticommuting (anti-)BRST symmetry transformation : As a consequence, the action integral remains invariant under (because ). In our discussion, all the variables are function of the evolution parameter and the pair , stands for the generalized radial and angular velocities.

We now focus on the Stuckelberg modified version of the 2D Proca theory whose proper (anti-)BRST invariant Lagrangian density is (see, e.g., [20, 21], for details) where is the curvature tensor that is derived from the curvature 2-form . Here, is the exterior derivative (with ) and the 1-form defines the vector potential . The Stueckelberg field (with mass ) has been invoked to convert the second-class constraints of the 2D Proca theory (with mass ) into the first-class constraints. We have the (anti-)ghost fields , too, in our BRST invariant theory for the proof of unitarity. It is elementary to check that the following off-shell nilpotent and absolutely anticommuting (anti-)BRST symmetry transformations leave the action integral invariant for the physically well-defined fields which vanish off at because and .

The next Abelian model of interest is the 2D self-dual bosonic field theory whose precise (anti-)BRST invariant Lagrangian density is (see, e.g., [22, 23]) where , , , and so forth are the generalized “velocities” with respect to the evolution parameter of our present theory. We also follow the notation: , which is nothing but the single space derivative on the 2D self-dual field and Wess-Zumino field . As explained earlier, is the Nakanishi-Lautrup type auxiliary field and are the (anti-)ghost fields. It is straightforward to check that, under the following off-shell nilpotent and absolutely anticommuting (anti-)BRST symmetry transformations (see, e.g., [22, 23], for details) the Lagrangian density transforms as follows: , , thereby leaving the action integral invariant for the physically well-defined fields which vanish off at .

Finally, we concentrate on the modified version of a 2D anomalous Abelian 1-form gauge theory (see, e.g., [25]) in its bosonized version. In this context, the (anti-)BRST invariant Lagrangian density for this Abelian system (with electric charge ) is [25] where the Abelian 1-form defines the vector potential and the curvature 2-form defines (which has only electric field (i.e., ) as its existing component in 2D). In the above, is the parameter of ambiguity in the regularization of the fermionic determinant when the 2D chiral Schwinger model (with electric charge ) is bosonized in terms of the scalar field . A bosonic field has been introduced to convert the second-class constraints of the chiral Schwinger model into the first-class constraints. As discussed earlier, the proper (anti-)BRST invariant Lagrangian density (7) contains the fermionic (anti-)ghost fields and the Nakanishi-Lautrup type auxiliary field . Under the following off-shell nilpotent and absolutely anticommuting (anti-)BRST symmetry transformations the Lagrangian density (7) transforms as follows:As a consequence, the action integral remains invariant under the nilpotent (anti-)BRST symmetry transformations (8) for the physically well-defined fields which vanish off at when we apply the Gauss divergence theorem.

3. (Anti-)BRST Symmetries: Superfield Approach

In this section, we derive the proper (i.e., off-shell nilpotent and absolutely anticommuting) (anti-)BRST symmetry transformations (for all the Abelian models under consideration) by exploiting the potential and power of HC and GIRs. Towards this goal in mind, first of all, we generalize the basic variables , , of the 1D rigid rotor onto a (1, 2)-dimensional supermanifold, parametrized by the superspace coordinate , as follows (see, e.g., [17–19], for details): where the secondary variables and are fermionic and bosonic in nature because of the fermionic ,   nature of the pair of Grassmannian variables of the superspace coordinate . To determine the exact form of the above secondary variables in terms of the basic and auxiliary variables of the Lagrangian (1) for the 1D rigid rotor, we have to exploit the potential and power of the HC defined on the (1, 2)-dimensional supermanifold.

We define an Abelian 1-form so that a null 2-form (where is the exterior derivative) could be constructed on a 1D ordinary manifold. This can be generalized onto an appropriate (1, 2)-dimensional supermanifold as where we have used the following generalizationsin addition to the generalizations in (10). We demand the equality due to the requirement of the HC. This condition yields the following relationships between the secondary variables and the basic as well as the auxiliary variables of the Lagrangian (1) (see, e.g., [17–19], for details): If we choose , we obtain the following expansions: where the superscript () denotes the expansions of the supervariables after the application of the HC. The above expansions of the supervariables lead to the derivation of proper (i.e., offshell nilpotent and absolutely anticommuting) (anti-)BRST symmetries that have been mentioned in (2). It is to be emphasized that the relationship in (13) is nothing but the CF-condition which turns out to be trivial for our Abelian theory. Furthermore, these expansions imply a relationship between the (anti-)BRST symmetries and the translational generators () along the Grassmannian directions of the (1, 2)-dimensional supermanifold. This relationship is as follows: , . In view of this mapping, it is clear that we have the following equalities; namely, because of the fact that we have the (anti-)BRST invariance: .

We now focus on the GIR that leads to the expansions of (in terms of the basic and auxiliary variables) which is the generalizations of onto the (1, 2)-dimensional supermanifold. We observe that . It should be pointed out that all the gauge (i.e., (anti-)BRST) invariant quantities are required to be independent of the Grassmannian variables when they are generalized onto the appropriately chosen supermanifold. This statement implies the following equality under the basic tenets of the augmented version of superfield formalism (see, e.g., [11–14]):where . The super expansions for , , and are given in (14). Equating the coefficients of , , and from the l.h.s and r.h.s of (16), we obtain the following: It is clear that the solution for the above conditions is the following relationship: A careful observation of (14), (15), and (18) demonstrates that we have already derived the (anti-)BRST symmetry transformations (2) for the 1D toy model of a rigid rotor. We would like to emphasize that our present method of derivation is totally different from our earlier works [17–19] on the supervariable approach to a 1D rigid rotor.

We exploit the mathematical power of the HC in the context of the 2D Abelian 1-form () gauge theories of the modified versions of the Proca and anomalous gauge theories. In both these theories, we have the basic fields , , and which can be generalized onto an appropriately chosen (2, 2)-dimensional supermanifold, parametrized by . The generalizations of the gauge field are and the generalizations of the fields ,   are given in (10) where we have to replace the parameter by the 2D spacetime coordinate (with ). Furthermore, we have the following generalizations: for the exterior derivative to super exterior derivative and the connection 1-form to super connection 1-form on the (2, 2)-dimensional supermanifold.

The requirement of HC (i.e., ) yields the following relationship between the secondary fields and basic and auxiliary fields of the Lagrangian densities (3) and (7) for the Abelian 1-form gauge theories under considerations; namely, We observe that is the trivial (anti)-BRST invariant CF-condition which emerges out from our superfield formalism. This is one of the decisive features of our superfield approach. The substitution of these values into the appropriate super expansions yields the following equations (see, e.g., [6–8, 11–14], for details): where the superscript () denotes the expansions of the superfields after the application of the HC. The expansions (22) are common to all the 2D theories of our interest. It is clear that we have the mappings: ,  , as pointed out earlier.

We now focus on the derivation of the (anti-)BRST symmetries for the Stueckelberg field of the modified version of the 2D Proca theory. We observe that . Thus, we have the following restrictions due to the basic tenets of the augmented version of superfield formalism (see, e.g., [20, 21], for details): where and . Exploiting the expansions of (22), we obtain the following conditions:from (23). The solution of the above conditions is the following: where the superscript () denotes the expansions of the above superfields after the application of the GIR in (23). Thus, it is evident that we have already obtained the (anti-)BRST symmetry transformations for the field . The (anti-)BRST invariance of the Nakanishi-Lautrup type field implies that we have .