Compactness and Density Estimates for Weighted Fractional Heat Semigroups
Abstract
We prove that the operator L0=-(1+|x|)β(-)α/2 with α∈(0,2), d>α and β0 generates a compact semigroup or resolvent on L2(d;(1+|x|)-β\,dx), if and only if β>α. When β>α, we obtain two-sided asymptotic estimates for high order eigenvalues, and sharp bounds for the corresponding heat kernel.
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