Generalizing previous results for orbifolds, in this paper we describe the
compactification of Matrix model on an orientifold which is a quotient space as
a Yang-Mills theory living on a quantum space. The information of the
compactification is encoded in the action of the discrete symmetry group G on
Euclidean space and a projective representation U of G. The choice of Hilbert
space on which the algebra of U is realized as an operator algebra corresponds
to the choice of a physical background for the compactification. All these data
are summarized in the spectral triple of the quantum space.Comment: 28 pages, late

A. Connes

A. Fayyazuddin

C. Hofman

C.V. Johnson

D. Brace

D. Kabat

D.A. Lowe

E.G. Gimon

F. Ardalan

M.A. Rieffel

M.R. Douglas

N. Kim

N. Nekrasov

O.J. Ganor

P.-M. Ho

Pei-Ming Ho

R. Casalbuoni

S. Ramgoolam

S.-J. Rey

T. Banks

T. Kawano

U.H. Danielsson

W. Taylor IV

Y.-K.E. Cheung

Yong-Shi Wu

English

arXiv

journal articleGeneralizing previous results for orbifolds, in this paper we describe the compactification of the matrix model on an orientifold which is a quotient space Rd/G as a Yang-Mills theory residing on a quantum space. The information of the compactification is encoded in the action of the discrete symmetry group G on Euclidean  space Rd and a projective representation U of G. The choice of Hilbert space on which the algebra of U is  realized as an operator algebra corresponds to the choice of a physical background for the compactification. All these data are summarized in the spectral triple of the quantum space

Matrix Compactification On Orientifolds

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