A Jost-Pais-type reduction of (modified) Fredholm determinants for semi-separable operators in infinite dimensions

Abstract

We study the analog of semi-separable integral kernels in H of the type K(x,x')=cases F1(x)G1(x'), & a<x'< x< b, \\ F2(x)G2(x'), & a<x<x'<b, cases where -∞≤ a<b≤ ∞, and for a.e.\ x ∈ (a,b), Fj (x) ∈ B2(Hj,H) and Gj(x) ∈ B2(H,Hj) such that Fj(·) and Gj(·) are uniformly measurable, and \|Fj(·)\|B2(Hj,H) ∈ L2((a,b)), \; \|Gj (·)\|B2(H,Hj) ∈ L2((a,b)), j=1,2, with H and Hj, j=1,2, complex, separable Hilbert spaces. Assuming that K(·, ·) generates a Hilbert-Schmidt operator K in L2((a,b);H), we derive the analog of the Jost-Pais reduction theory that succeeds in proving that the modified Fredholm determinant 2, L2((a,b);H)(I - α K), α ∈ C, naturally reduces to appropriate Fredholm determinants in the Hilbert spaces H (and H H). Some applications to Schr\"odinger operators with operator-valued potentials are provided.