When a system of real quadratic equations has a solution
Abstract
We provide a sufficient condition for solvability of a system of real quadratic equations pi(x)=yi, i=1, …, m, where pi: Rn R are quadratic forms. By solving a positive semidefinite program, one can reduce it to another system of the type qi(x)=αi, i=1, …, m, where qi: Rn R are quadratic forms and αi=tr\ qi. We prove that the latter system has solution x ∈ Rn if for some (equivalently, for any) orthonormal basis A1,…, Am in the space spanned by the matrices of the forms qi, the operator norm of A12 + … + Am2 does not exceed η/m for some absolute constant η > 0. The condition can be checked in polynomial time and is satisfied, for example, for random qi provided m ≤ γ n for an absolute constant γ >0. We prove a similar sufficient condition for a system of homogeneous quadratic equations to have a non-trivial solution. While the condition we obtain is of an algebraic nature, the proof relies on analytic tools including Fourier analysis and measure concentration.
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