S-Lemma with Equality and Its Applications

Abstract

Let f(x)=xTAx+2aTx+c and h(x)=xTBx+2bTx+d be two quadratic functions having symmetric matrices A and B. The S-lemma with equality asks when the unsolvability of the system f(x)<0, h(x)=0 implies the existence of a real number μ such that f(x) + μ h(x)0, ~∀ x∈ Rn. The problem is much harder than the inequality version which asserts that, under Slater condition, f(x)<0, h(x)0 is unsolvable if and only if f(x) + μ h(x)0, ~∀ x∈ Rn for some μ0. In this paper, we show that the S-lemma with equality does not hold only when the matrix A has exactly one negative eigenvalue and h(x) is a non-constant linear function (B=0, b=0). As an application, we can globally solve ∈f\f(x) h(x)=0\ as well as the two-sided generalized trust region subproblem ∈f\f(x) l h(x) u\ without any condition. Moreover, the convexity of the joint numerical range \(f(x), h1(x),…, hp(x)):~x∈ Rn\ where f is a (possibly non-convex) quadratic function and h1(x),…,hp(x) are affine functions can be characterized using the newly developed S-lemma with equality.