Indefinite Sturm-Liouville operators in polar form

Abstract

We consider the indefinite Sturm-Liouville differential expression \[a(f) := - 1w( 1r f' )',\] where a is defined on a finite or infinite open interval I with 0∈ I and the coefficients r and w are locally summable and such that r(x) and (sgn x) w(x) are positive a.e. on I. With the differential expression a we associate a nonnegative self-adjoint operator A in the Krein space L2w(I), which is viewed as a coupling of symmetric operators in Hilbert spaces related to the intersections of I with the positive and the negative semi-axis. For the operator A we derive conditions in terms of the coefficients w and r for the existence of a Riesz basis consisting of generalized eigenfunctions of A and for the similarity of A to a self-adjoint operator in a Hilbert space L2|w|(I). These results are obtained as consequences of abstract results about the regularity of critical points of nonnegative self-adjoint operators in Krein spaces, which are couplings of two symmetric operators acting in Hilbert spaces.