Spectral asymmetry on the ball and asymptotics of the asymmetry kernel

Abstract

Let be the Dirac operator on a D=2d dimensional ball with radius R. We calculate the spectral asymmetry η(0,) for D=2 and D=4, when local chiral bag boundary conditions are imposed. With these boundary conditions, we also analyze the small-t asymptotics of the heat trace (F P e-t P2) where P is an operator of Dirac type and F is an auxiliary smooth smearing function.

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