Toric Varieties with NC Toric Actions: NC Type IIA Geometry
Abstract
Extending the usual C r actions of toric manifolds by allowing asymmetries between the various C factors, we build a class of non commutative (NC) toric varieties V%d+1(nc). We construct NC complex d dimension Calabi-Yau manifolds embedded in Vd+1(nc) by using the algebraic geometry method. Realizations of NC C r toric group are given in presence and absence of quantum symmetries and for both cases of discrete or continuous spectrums. We also derive the constraint eqs for NC Calabi-Yau backgrounds Mdnc embedded in Vd+1nc and work out their solutions. The latters depend on the Calabi-Yau condition % Σiqia=0, qia being the charges of C r% ; but also on the toric data qia,iA;pIα, iA of the polygons associated to V%d+1. Moreover, we study fractional D branes at singularities and show that, due to the complete reducibility property of C r group representations, there is an infinite number of fractional D branes. We also give the generalized Berenstein and Leigh quiver diagrams for discrete and continuous C r representation spectrums. An illustrating example is presented.
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