Standard-Model Bundles on Non-Simply Connected Calabi--Yau Threefolds
Abstract
We give a proof of the existence of G=SU(5), stable holomorphic vector bundles on elliptically fibered Calabi--Yau threefolds with fundamental group 2. The bundles we construct have Euler characteristic 3 and an anomaly that can be absorbed by M-theory five-branes. Such bundles provide the basis for constructing the standard model in heterotic M-theory. They are also applicable to vacua of the weakly coupled heterotic string. We explicitly present a class of three family models with gauge group SU(3)C× SU(2)L× U(1)Y.
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