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Numerical Hermitian Yang-Mills Connections and Vector Bundle Stability in Heterotic Theories

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arxiv 1004.4399 v2 pith:CWKLU2WY submitted 2010-04-26 hep-th

Numerical Hermitian Yang-Mills Connections and Vector Bundle Stability in Heterotic Theories

classification hep-th
keywords bundleshermitianslope-stablevectoryang-millsalgorithmbundleconnection
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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A numerical algorithm is presented for explicitly computing the gauge connection on slope-stable holomorphic vector bundles on Calabi-Yau manifolds. To illustrate this algorithm, we calculate the connections on stable monad bundles defined on the K3 twofold and Quintic threefold. An error measure is introduced to determine how closely our algorithmic connection approximates a solution to the Hermitian Yang-Mills equations. We then extend our results by investigating the behavior of non slope-stable bundles. In a variety of examples, it is shown that the failure of these bundles to satisfy the Hermitian Yang-Mills equations, including field-strength singularities, can be accurately reproduced numerically. These results make it possible to numerically determine whether or not a vector bundle is slope-stable, thus providing an important new tool in the exploration of heterotic vacua.

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