Faddeev–jackiw Formalism for Constrained Systems With Grassmann Dynamical Field Variables

Abstract: The Faddeev–Jackiw canonical quantization formalism for constrained systems with Grassmann dynamical variables within the framework of the field theory is reviewed. First, by means of a iterative process, the symplectic supermatrix is constructed and their associated constraints are found. Next, by taking into account the phase space of the system, the constraint structure is considered. It is found that, if there are no auxiliary dynamical field variables, the supermatrix whose elements are the Bose–Fermi bra… Show more

“…In this section, we present an extension to the Faddeev-Jackiw technique for the case in which we are dealing with Grassmann variables [46]. As in the previous case, the construction will be done in the context of classical fields.…”

Path integral quantization of generalized Stueckelberg electrodynamics: A Faddeev-Jackiw approach

“…In this section, we present an extension to the Faddeev-Jackiw technique for the case in which we are dealing with Grassmann variables [46]. As in the previous case, the construction will be done in the context of classical fields.…”

Path integral quantization of generalized Stueckelberg electrodynamics: A Faddeev-Jackiw approach

“…This approach has been developed so as to uncover the constraints present and to see what gauge transformations they imply [13][14][15]. (Other topics that have been considered within this Faddeev-Jackiw (FJ) approach are the treatment of Grassmann variables [16,17] and its use in the path integral [18,19]. )…”

Symplectic analysis of the two-dimensional Palatini action

Electron-Phonon Model in the Faddeev-Jackiw Quantization Formalism