Mean-field theory based on the Jacobi~hsp := semi-direct sum hN sp(2N,R)C algebra of boson operators

Abstract

In this paper, we give an expression for canonical transformation group with Grassmann variables, basing on the Jacobi~hsp \!:= semi-direct sum hN sp(2N,R)C algebra of boson operators. We assume a mean-field Hamiltonian (MFH) linear in the Jacobi generators. We diagonalize the boson MFH. We show a new aspect of eigenvalues of the MFH. An excitation energy arisen from additional self-consistent field (SCF) parameters has never been seen in the traditional boson MFT. We derive this excitation energy. We extend the Killing potential in the Sp(2N,R)CU(N) coset space to the one in the Sp(2N+2,R)CU(N+1) coset space and make clear the geometrical structure of K\"ahler manifold, a non-compact symmetric space Sp(2N+2,R)CU(N+1). The Jacobi~hsp transformation group is embedded into an Sp(2N+2,R)C group and an Sp(2N+2,R)CU(N+1) coset variable is introduced. Under such mathematical manipulations, extended bosonization of Sp(2N+2,R)C Lie operators, vacuum function and differential forms for extended boson are presented by using integral representation of boson state on the Sp(2N+2,R)CU(N+1) coset variables.