Gauge symmetry of the chiral Schwinger model from an improved gauge unfixing formalism

Ambrósio, Gabriella Vieira; Costa, Cleber N.; F., Alves, Paulo R.; Abreu, Éverton M. C.; Neto, Jorge Ananias; Thibes, Ronaldo

doi:10.1209/0295-5075/acc4e5

Cited by 3 publications

(5 citation statements)

References 26 publications

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“…However kinetic energy-like terms [29], and even the combination of mass-like and kinetic energy-like terms [33] are found to materialize as a counter term. A very recent study related to gauge symmetry (gauge unfixing) of chiral bosons is found in [34] and similar types of studies on non-commutative chiral boson is considered in [35]. Application of the gauge unfixing in the chiral Schwinger model is reported in [36].…”

Section: Introductionmentioning

confidence: 86%

A basic examination of the gauged model of the Floreanini-Jackiw chiral boson within the framework of BRST symmetry

Ghoshal,

Rahaman

2024

Phys. Scr.

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We consider the gauged model ofFloreanini-Jackiw chiral boson which is generated from thechiral boson with parameter-free Faddeeviananomaly. This model does not have manifestly Lorentz co-variantstructure. However, it is exactly solvable and has a physicalsubspace that is precisely Lorentz invariant. The recommendationof Mitra and Rajaraman makes this model gauge invariant in theusual phasespace. Additionally, Wess-Zumino terms for this modelis constructed to make it gauge-invariant whichallows BRST embedding of the resulting gauge-invariant theory.Despite the strange structural appearance of the models whenviewed in terms of Lorentz covariance BRST invariant reformulationhas been found possible. Additionally, it has been observed thatbeing supplemented with BRST symmetry, anti-BRST symmetry plays acrucial role in pinpointing the specific symmetric physicalstates.

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Section: Introductionmentioning

confidence: 86%

A basic examination of the gauged model of the Floreanini-Jackiw chiral boson within the framework of BRST symmetry

Ghoshal,

Rahaman

2024

Phys. Scr.

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“…Concerning gauge achievability, the gauge-fixing function Γ 1 must be chosen in such a way that the determinant in the integration measure in (54) does not vanish. This concludes the functional quantization of the gauge-invariant description of the NCCB, with gauge transformations generated by Ω 1 .…”

Section: Brief Review Of the Modified Gu Formalism -mentioning

confidence: 99%

“…Nonetheless, we claim that a consistent NCCB abelianization can be done without the need of any auxiliary fields whatsoever. That is one of the main advantages of the gauge-unfixing (GU) method [47][48][49][50][51][52][53][54][55]. Building on the original work of Mitra and Rajaraman [47], which first conjectured the interpretation of second-class constraints in phase space as resulting from gauge-fixing conditions within a larger gauge-invariant theory, Anishetty and Vytheeswaran constructed a Lie projection operator, whose action in the second-class functions was able to reveal hidden symmetries [48][49][50].…”

mentioning

confidence: 99%

“…Building on the original work of Mitra and Rajaraman [47], which first conjectured the interpretation of second-class constraints in phase space as resulting from gauge-fixing conditions within a larger gauge-invariant theory, Anishetty and Vytheeswaran constructed a Lie projection operator, whose action in the second-class functions was able to reveal hidden symmetries [48][49][50]. Those ideas were further elaborated to produce the improved or modified gauge-unfixing formalism [51,52], centered on the construction of the invariant GU variables, and have found recent appeal in quantum field theory [53][54][55]. In this way, the main goal of the present letter is to develop a gauge-invariant theory for the NCCB model, without auxiliary fields, by directly applying the modified GU formalism [51][52][53][54][55] to the noncommutative fields space.…”

mentioning

confidence: 99%

“…Those ideas were further elaborated to produce the improved or modified gauge-unfixing formalism [51,52], centered on the construction of the invariant GU variables, and have found recent appeal in quantum field theory [53][54][55]. In this way, the main goal of the present letter is to develop a gauge-invariant theory for the NCCB model, without auxiliary fields, by directly applying the modified GU formalism [51][52][53][54][55] to the noncommutative fields space.…”

mentioning

confidence: 99%

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Modified gauge-unfixing formalism and gauge symmetries in the noncommutative chiral bosons theory

Neto

Costa

Ambrósio

et al. 2023

EPL

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We use the gauge unfixing (GU) formalism framework in a two dimensional noncommutative chiral bosons (NCCB) model to disclose new hidden symmetries. That amounts to converting a second-class system to a first-class one without adding any extra degrees of freedom in phase space. The NCCB model has two second-class constraints -- one of them turns out as a gauge symmetry generator while the other one, considered as a gauge-fixing condition, is disregarded in the converted gauge-invariant system. We show that it is possible to apply a conversion technique based on the GU formalism direct to the second-class variables present in the NCCB model, constructing deformed gauge-invariant GU variables, a procedure which we name here as modified GU formalism. For the canonical analysis in noncommutative phase space, we compute the deformed Dirac brackets between all original phase space variables. We obtain two different gauge invariant versions for the NCCB system and, in each case, a GU Hamiltonian is derived satisfying a corresponding first-class algebra. Finally, the phase space partition function is presented for each case allowing for a consistent functional quantization for the obtained gauge-invariant NCCB.

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Note on an extended chiral bosons system contextualized in a modified gauge-unfixing formalism

Ambrósio,

Costa,

Alves

et al. 2024

EPL

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We analyze the Hamiltonian structure of an extended chiral bosons theory in which the self-dual constraint is introduced via a control α-parameter. The system has two second-class constraints in the non-critical regime and an additional one in the critical regime. We use a modified gauge-unfixing (GU) formalism to derive a first-class system, disclosing hidden symmetries. To this end, we choose one of the second-class constraints to build a corresponding gauge symmetry generator. The worked out procedure converts second-class variables into first-class ones allowing the lifting of gauge symmetry. Any function of these GU variables will also be invariant. We obtain the GU Hamiltonian and Lagrangian densities in a generalized context containing the Srivastava and Floreanini-Jackiw models as particular cases. Additionally, we observe that the resulting GU Lagrangian presents similarities to the Siegel invariant Lagrangian which is known to be suitable for describing chiral bosons theory with classical gauge invariance, however broken at quantum level. The final results signal a possible equivalence between our invariant Lagrangian obtained from the modified GU formalism and the Siegel invariant Lagrangian, with a distinct gauge symmetry.

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Gauge symmetry of the chiral Schwinger model from an improved gauge unfixing formalism

Cited by 3 publications

References 26 publications

A basic examination of the gauged model of the Floreanini-Jackiw chiral boson within the framework of BRST symmetry

A basic examination of the gauged model of the Floreanini-Jackiw chiral boson within the framework of BRST symmetry

Modified gauge-unfixing formalism and gauge symmetries in the noncommutative chiral bosons theory

Note on an extended chiral bosons system contextualized in a modified gauge-unfixing formalism

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