Spectrum of the ∂-Laplace operator on zero forms for the quantum quadric Oq(QN)

Abstract

We study the Laplacian operator ∂ associated to a K\"ahler structure ((, ), ) for the Heckenberger--Kolb differential calculus of the quantum quadrics Oq(QN), which is to say, the irreducible quantum flag manifolds of types Bn and Dn. We show that the eigenvalues of ∂ on zero forms tend to infinity and have finite multiplicity.

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