Abstract
Performing a dual transformation numerically, we obtain an effective monopole action from vacuum configurations in compact QED both in the Villain and in the Wilson forms. (1) The DeGrand-Toussaint monopole definition may be useful for {beta}{sub V} larger than about 0.5. (2) The Villain model well approximates the Wilson one for {beta} smaller than {beta}{sub c}. We also apply the method to SU(2) QCD after abelian projection in the maximally abelian gauge. Extended monopoles are considered also, which corresponds to a block spin transformation on the dual lattice. The action obtained might be regarded as the renormalized trajectory on which one can take the continuum limit. ((orig.)).
Citation Formats
Suzuki, T, and Shiba, H.
Monopole actions in compact QED and in (a{yields}0, L{yields}{infinity}) SU(2) QCD.
Netherlands: N. p.,
1995.
Web.
doi:10.1016/0920-5632(95)00227-Z.
Suzuki, T, & Shiba, H.
Monopole actions in compact QED and in (a{yields}0, L{yields}{infinity}) SU(2) QCD.
Netherlands.
https://doi.org/10.1016/0920-5632(95)00227-Z
Suzuki, T, and Shiba, H.
1995.
"Monopole actions in compact QED and in (a{yields}0, L{yields}{infinity}) SU(2) QCD."
Netherlands.
https://doi.org/10.1016/0920-5632(95)00227-Z.
@misc{etde_101168,
title = {Monopole actions in compact QED and in (a{yields}0, L{yields}{infinity}) SU(2) QCD}
author = {Suzuki, T, and Shiba, H}
abstractNote = {Performing a dual transformation numerically, we obtain an effective monopole action from vacuum configurations in compact QED both in the Villain and in the Wilson forms. (1) The DeGrand-Toussaint monopole definition may be useful for {beta}{sub V} larger than about 0.5. (2) The Villain model well approximates the Wilson one for {beta} smaller than {beta}{sub c}. We also apply the method to SU(2) QCD after abelian projection in the maximally abelian gauge. Extended monopoles are considered also, which corresponds to a block spin transformation on the dual lattice. The action obtained might be regarded as the renormalized trajectory on which one can take the continuum limit. ((orig.)).}
doi = {10.1016/0920-5632(95)00227-Z}
journal = []
volume = {42}
journal type = {AC}
place = {Netherlands}
year = {1995}
month = {Apr}
}
title = {Monopole actions in compact QED and in (a{yields}0, L{yields}{infinity}) SU(2) QCD}
author = {Suzuki, T, and Shiba, H}
abstractNote = {Performing a dual transformation numerically, we obtain an effective monopole action from vacuum configurations in compact QED both in the Villain and in the Wilson forms. (1) The DeGrand-Toussaint monopole definition may be useful for {beta}{sub V} larger than about 0.5. (2) The Villain model well approximates the Wilson one for {beta} smaller than {beta}{sub c}. We also apply the method to SU(2) QCD after abelian projection in the maximally abelian gauge. Extended monopoles are considered also, which corresponds to a block spin transformation on the dual lattice. The action obtained might be regarded as the renormalized trajectory on which one can take the continuum limit. ((orig.)).}
doi = {10.1016/0920-5632(95)00227-Z}
journal = []
volume = {42}
journal type = {AC}
place = {Netherlands}
year = {1995}
month = {Apr}
}