Weyl asymptotics for fractional-order Dirichlet realizations in nonsmooth cases

Abstract

Let P be a symmetric 2a-order classical strongly elliptic pseudodifferential operator with even symbol p(x, ) on Rn (0<a<1), for example a perturbation of (- )a. Let ⊂ Rn be bounded, and let PD be the Dirichlet realization in L2( ) defined under the exterior condition u=0 in Rn . When p(x, ) and are C∞ , it is known that the eigenvalues λ j (ordered in a nondecreasing sequence for j∞ ) satisfy a Weyl asymptotic formula λ j(PD)=C(P, )j2a/n+o(j2a/n) for j ∞, with C(P, ) determined from the principal symbol of P. We now show that this result is valid for more general operators with a possibly nonsmooth x-dependence, over Lipschitz domains, and that it extends to P=P+P'+P'', where P' is an operator of order <\2a, a+12\ with certain mapping properties, and P'' is bounded in L2( ) (e.g. P''=V(x)∈ L∞ ( )). Also the regularity of eigenfunctions of PD is discussed.