Weyl law

The Weyl law has been extended to more general domains and operators. For the Schrödinger operator

${\displaystyle H=-h^{2}\Delta +V(x)}$ 

it was extended to

${\displaystyle N(E,h)\sim (2\pi h)^{-d}\int _{\{|\xi |^{2}+V(x)<E\}}dxd\xi }$ 

as ${\displaystyle E}$  tending to ${\displaystyle +\infty }$  or to a bottom of essential spectrum and/or ${\displaystyle h\to +0}$ .

Here ${\displaystyle N(E,h)}$  is the number of eigenvalues of ${\displaystyle H}$  below ${\displaystyle E}$  unless there is essential spectrum below ${\displaystyle E}$  in which case ${\displaystyle N(E,h)=+\infty }$ .

In the development of spectral asymptotics, the crucial role was played by variational methods and microlocal analysis.

The extended Weyl law fails in certain situations. In particular, the extended Weyl law "claims" that there is no essential spectrum if and only if the right-hand expression is finite for all ${\displaystyle E}$ .

If one considers domains with cusps (i.e. "shrinking exits to infinity") then the (extended) Weyl law claims that there is no essential spectrum if and only if the volume is finite. However for the Dirichlet Laplacian there is no essential spectrum even if the volume is infinite as long as cusps shrinks at infinity (so the finiteness of the volume is not necessary).

On the other hand, for the Neumann Laplacian there is an essential spectrum unless cusps shrinks at infinity faster than the negative exponent (so the finiteness of the volume is not sufficient).

Weyl conjectured that

${\displaystyle N(\lambda )=(2\pi )^{-d}\lambda ^{d/2}\omega _{d}\mathrm {vol} (\Omega )\mp {\frac {1}{4}}(2\pi )^{1-d}\omega _{d-1}\lambda ^{(d-1)/2}\mathrm {area} (\partial \Omega )+o(\lambda ^{(d-1)/2})}$ 

where the remainder term is negative for Dirichlet boundary conditions and positive for Neumann. The remainder estimate was improved upon by many mathematicians.

In 1922, Richard Courant proved a bound of ${\displaystyle O(\lambda ^{(d-1)/2}\log \lambda )}$ . In 1952, Boris Levitan proved the tighter bound of ${\displaystyle O(\lambda ^{(d-1)/2})}$  for compact closed manifolds. Robert Seeley extended this to include certain Euclidean domains in 1978.^[4] In 1975, Hans Duistermaat and Victor Guillemin proved the bound of ${\displaystyle o(\lambda ^{(d-1)/2})}$  when the set of periodic bicharacteristics has measure 0.^[5] This was finally generalized by Victor Ivrii in 1980.^[6] This generalization assumes that the set of periodic trajectories of a billiard in ${\displaystyle \Omega }$  has measure 0, which Ivrii conjectured is fulfilled for all bounded Euclidean domains with smooth boundaries. Since then, similar results have been obtained for wider classes of operators.