Abstract
We show that differential calculus on discrete group Z{sub 2} is equivalent to A. Connes` approach in the case of two discrete points. They are the same theory in terms of different basis and the discrete group Z{sub 2} is the permutation group of two discrete point. (author). 11 refs.
Citation Formats
Hanying, Guo, Ke, Wu, and Jianming, Li.
Equivalence of two non-commutative geometry approaches.
IAEA: N. p.,
1994.
Web.
Hanying, Guo, Ke, Wu, & Jianming, Li.
Equivalence of two non-commutative geometry approaches.
IAEA.
Hanying, Guo, Ke, Wu, and Jianming, Li.
1994.
"Equivalence of two non-commutative geometry approaches."
IAEA.
@misc{etde_10112507,
title = {Equivalence of two non-commutative geometry approaches}
author = {Hanying, Guo, Ke, Wu, and Jianming, Li}
abstractNote = {We show that differential calculus on discrete group Z{sub 2} is equivalent to A. Connes` approach in the case of two discrete points. They are the same theory in terms of different basis and the discrete group Z{sub 2} is the permutation group of two discrete point. (author). 11 refs.}
place = {IAEA}
year = {1994}
month = {Oct}
}
title = {Equivalence of two non-commutative geometry approaches}
author = {Hanying, Guo, Ke, Wu, and Jianming, Li}
abstractNote = {We show that differential calculus on discrete group Z{sub 2} is equivalent to A. Connes` approach in the case of two discrete points. They are the same theory in terms of different basis and the discrete group Z{sub 2} is the permutation group of two discrete point. (author). 11 refs.}
place = {IAEA}
year = {1994}
month = {Oct}
}