Spectral analysis of Grushin type operators on the quarter plane

Abstract

We investigate spectral properties of self-adjoint extensions of the operator Gα,β=-(∂2∂ r2+2+1r∂∂ r ) -r2 (∂2∂ s2+2+1s∂∂ s ), ,∈, with domain \, Gα,β=C∞(2+)⊂ L2(2+,r2+1s2+1drds), which for some specific values of ,, is a bi-radial part of the Grushin operator. Alternatively, we investigate Gα,β, the Liouville form of Gα,β, which is a symmetric and nonnegative operator on L2(2+, drds). One of the main tools used is an integral transform which combines the Laguerre scaled transform and the Hankel transform. Self-adjoint extensions Gα,β of Gα,β are defined in terms of this transform, and the spectral decompositions of them are given. Another approach to construct self-adjoint extensions of Gα,β, based on the technique of sesquilinear forms, is also presented and then the two approaches are compared. We also establish a closed form of the heat kernel corresponding to Gα,β.

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