The cryptohermitian smeared-coordinate representation of wave functions

Abstract

The one-dimensional real line of coordinates is replaced, for simplification or approximation purposes, by an N-plet of the so called Gauss-Hermite grid points. These grid points are interpreted as the eigenvalues of a tridiagonal matrix q0 which proves rather complicated. Via the "zeroth" Dyson-map 0 the "operator of position" q0 is then further simplified into an isospectral matrix Q0 which is found optimal for the purpose. As long as the latter matrix appears non-Hermitian it is not an observable in the manifestly "false" Hilbert space H(F):=RN. For this reason the optimal operator Q0 is assigned the family of its isospectral avatars hα, α=(0,)\,1,2,.... They are, by construction, selfadjoint in the respective α-dependent image Hilbert spaces H(P)α obtained from H(F) by the respective "new" Dyson maps α. In the ultimate step of simplification, the inner product in the F-superscripted space is redefined in an ad hoc, α-dependent manner. The resulting "simplest", S-superscripted representations H(S)α of the eligible physical Hilbert spaces of states (offering different dynamics) then emerge as, by construction, unitary equivalent to the (i.e., indistinguishable from the) respective awkward, P-superscripted and α-subscripted physical Hilbert spaces.