English

General Superfield Quantization Method. III. Construction of Quantization Scheme

High Energy Physics - Theory 2007-05-23 v1

Abstract

Extension procedure for supermanifold Mcl{\cal M}_{cl} of superfields Aı(θ){\cal A}^{\imath}(\theta), ghost number construction are considered. Classical and \hbar-deformed generating (master) equations, existence theorems for their solutions are formulated in ToddMminT^{\ast}_{odd}{\cal M}_{min}, ToddMextT^{\ast}_{odd}{\cal M}_{ext}. Analogous scheme is realized for BV similar generating equations. Master equations versions for GSQM and BV similar scheme are deformed in powers of superfields Γp(θ){\stackrel{\circ}{\Gamma}}{}^p(\theta) = (ΦB(θ)\bigl({\stackrel{\circ}{\Phi}}{}^B(\theta), ΦB(θ)){\stackrel{\circ}{\Phi}}{}^{\ast}_B(\theta)\bigr) into supermanifold Todd(ToddMext)T_{odd}(T^{\ast}_{odd}{\cal M}_{ext}). Arbitrariness in a choice of solutions for these equations is described. Investigation of formal Hamiltonian systems for II class theories [2] defined via corresponding master equations solutions is conducted. Gauge fixing for those theories is described by two ways. Functional integral of superfunctions on Todd(ToddMext)T_{odd}(T^{\ast}_{odd}{\cal M}_{ext}) is defined. Properties for generating functionals of Green's superfunctions are studied. θ\theta-component quantization formulation, connection with BV method and superfield quantization [3] are established. Quantization scheme realization is demonstrated on 6 models.

Keywords

Cite

@article{arxiv.hep-th/0304142,
  title  = {General Superfield Quantization Method. III. Construction of Quantization Scheme},
  author = {A. A. Reshetnyak},
  journal= {arXiv preprint arXiv:hep-th/0304142},
  year   = {2007}
}

Comments

59 pages, Latex, no figures