Asymptotics of singular values for quantum derivatives
Abstract
We obtain Weyl type asymptotics for the quantised derivative f of a function f from the homgeneous Sobolev space W1d(Rd) on Rd. The asymptotic coefficient \|∇ f\|Ld( Rd) is equivalent to the norm of f in the principal ideal Ld,∞, thus, providing a non-asymptotic, uniform bound on the spectrum of f. Our methods are based on the C-algebraic notion of the principal symbol mapping on Rd, as developed recently by the last two authors and collaborators.
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