Finite-Rank Perturbations of the Dirac Operator

Given a commuting d-tuple T ¯=(T 1 , ..., T d ) of otherwise arbitrary operators on a Hilbert space, there is an associated Dirac operator D T ¯. Significant attributes of the d-tuple are best expressed in terms of D T ¯, including the Taylor spectrum and the notion of Fredholmness. In fact, all pro

For bounded potentials which behave like &cx &# at infinity we investigate whether discrete eigenvalues of the radial Dirac operator H } accumulate at +1 or not. It is well known that #=2 is the critical exponent. We show that c=1Â8+ }(}+1)Â2 is the critical coupling constant in the case #=2. Our ap

We represent the real hyperbolic space H" as the rank one homogeneous space Spin (1, n)/ Spin (n) and the spinor bundle S of H as the homogeneous bundle Spin (1, n) x (",V, where V, is the spinor representation space of Spin (n). The representation theoretic decomposition of L2(H, S) combined with t