A structure theorem on non-homogeneous linear equations in Hilbert spaces

Abstract

A very particular by-product of the result announced in the title reads as follows: Let (X,<·,·>) be a real Hilbert space, T:X X a compact and symmetric linear operator, and z∈ X such that the equation T(x)-\|T\|x=z has no solution in X. For each r>0, set γ(r)=x∈ SrJ(x), where J(x)=< T(x)-2z,x> and Sr=\x∈ X:\|x\|2=r\. Then, the function γ is C1, increasing and strictly concave in ]0,+∞[, with γ'(]0,+∞[)=]\|T\|,+∞[; moreover, for each r>0, the problem of maximizing J over Sr is well-posed, and one has T( xr)-γ'(r) xr=z where xr is the only global maximum of J|Sr.