Lower bounds for resonance counting functions for Schr\"odinger operators with fixed sign potentials in even dimensions
Abstract
If the dimension d is even, the resonances of the Schr\"odinger operator - +V on Rd with V bounded and compactly supported are points on , the logarithmic cover of C \0\. We show that for fixed sign potentials V and for nonzero integers m, the resonance counting function for the mth sheet of has maximal order of growth.
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