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Minimal kernels of Dirac operators along maps

Published 9 Feb 2018 in math.DG | (1802.03263v2)

Abstract: Let $M$ be a closed spin manifold and let $N$ be a closed manifold. For maps $f\colon M\to N$ and Riemannian metrics $g$ on $M$ and $h$ on $N$, we consider the Dirac operator $Df_{g,h}$ of the twisted Dirac bundle $\Sigma M\otimes_{\mathbb{R}} f*TN$. To this Dirac operator one can associate an index in $KO{-dim(M)}(pt)$. If $M$ is $2$-dimensional, one gets a lower bound for the dimension of the kernel of $Df_{g,h}$ out of this index. We investigate the question whether this lower bound is obtained for generic tupels $(f,g,h)$.

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