Landau (,)-automorphic functions on Cn of magnitude

Abstract

We investigate the spectral theory of the invariant Landau Hamiltonian acting on the space F, of (,)-automotphic functions on n, for given real number >0, lattice of n and a map : U(1) such that the triplet (,,) satisfies a Riemann-Dirac quantization type condition. More precisely, we show that the eigenspace E,(λ)=f∈ F,; f = (2λ+n) f; λ∈, is non trivial if and only if λ=l=0,1,2, .... In such case, E,(l) is a finite dimensional vector space whose the dimension is given explicitly. We show also that the eigenspace E,(0) associated to the lowest Landau level of is isomorphic to the space, O,(n), of holomorphic functions on n satisfying g(z+γ) = (γ) e 2 |γ|2+z,γg(z), (*) that we can realize also as the null space of the differential operator Σj=1n(-∂2∂ zj∂ zj + zj ∂∂ zj) acting on C∞ functions on n satisfying (*).