Improved semiclassical eigenvalue estimates for the Laplacian and the Landau Hamiltonian
Abstract
The Berezin--Li--Yau and the Kr\"oger inequalities show that Riesz means of order ≥ 1 of the eigenvalues of the Laplacian on a domain of finite measure are bounded in terms of their semiclassical limit expressions. We show that these inequalities can be improved by a multiplicative factor that depends only on the dimension and the product ||1/d, where is the eigenvalue cut-off parameter in the definition of the Riesz mean. The same holds when ||1/d is replaced by a generalized inradius of . Finally, we show similar inequalities in two dimensions in the presence of a constant magnetic field.
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