English

Bosonization in the path integral formulation

High Energy Physics - Theory 2015-06-23 v3 Strongly Correlated Electrons High Energy Physics - Lattice

Abstract

We establish the direct d=2d=2 on-shell bosonization ψL(x+)=eiξ(x+)\psi_{L}(x_{+})=e^{i\xi(x_{+})} and ψR(x)=eiξ(x)\psi_{R}^{\dagger}(x_{-})=e^{i\xi(x_{-})} in path integral formulation by deriving the off-shell relations ψL(x)ψR(x)=exp[iξ(x)]\psi_{L}(x)\psi_{R}^{\dagger}(x)=\exp[i\xi(x)] and ψR(x)ψL(x)=exp[iξ(x)]\psi_{R}(x)\psi_{L}^{\dagger}(x)=\exp[-i\xi(x)]. Similarly, the on-shell bosonization of the bosonic commuting spinor, ϕL(x+)=ieiξ(x+)+eiχ(x+)\phi_{L}(x_{+})=ie^{-i\xi(x_{+})}\partial^{+}e^{-i\chi(x_{+})}, ϕR(x)=eiξ(x)iχ(x)\phi^{\dagger}_{R}(x_{-})=e^{-i\xi(x_{-})-i\chi(x_{-})} and ϕR(x)=ieiξ(x)e+iχ(x)\phi_{R}(x_{-})=ie^{i\xi(x_{-})}\partial^{-}e^{+i\chi(x_{-})}, ϕL(x+)=eiξ(x+)+iχ(x+)\phi^{\dagger}_{L}(x_{+})=e^{i\xi(x_{+})+i\chi(x_{+})}, is established in path integral formulation by deriving the off-shell relations ϕL(x)ϕR(x)=ieiξ(x)+eiχ(x)\phi_{L}(x)\phi^{\dagger}_{R}(x)=ie^{-i\xi(x)}\partial^{+}e^{-i\chi(x)} and ϕR(x)ϕL(x)=ieiξ(x)eiχ(x)\phi_{R}(x)\phi^{\dagger}_{L}(x)=ie^{i\xi(x)}\partial^{-}e^{i\chi(x)}.

Cite

@article{arxiv.1501.00766,
  title  = {Bosonization in the path integral formulation},
  author = {Kazuo Fujikawa and Hiroshi Suzuki},
  journal= {arXiv preprint arXiv:1501.00766},
  year   = {2015}
}

Comments

18 pages, the final version to appear in Phys. Rev. D

R2 v1 2026-06-22T07:50:42.559Z