Minimal kernels of Dirac operators along maps

Abstract

Let M be a closed spin manifold and let N be a closed manifold. For maps f M N and Riemannian metrics g on M and h on N, we consider the Dirac operator Dfg,h of the twisted Dirac bundle MR 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 Dfg,h out of this index. We investigate the question whether this lower bound is obtained for generic tupels (f,g,h).