Soliton Solutions on Noncommutative Orbifold T2N/G

Abstract

In this paper, we construct the common eigenstates of "translation" operators \Us\ and establish the generalized Kq representation on integral noncommutative torus T2N. We then study the finite rotation group G in noncommutative space as a mapping in the Kq representation and prove a Blocking Theorem. We finally obtain the complete set of projection operators on the integral noncommutative orbifold T2N/G in terms of the generalized Kq representation. Since projectors are soliton solutions on noncommutative space in the limit α Bij ∞ (ij/α 0), we thus obtain all soliton solutions on that orbifold T2N/G.

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