A Complete Characterization of Determinantal Quadratic Polynomials

Abstract

The problem of expressing a multivariate polynomial as the determinant of a monic (definite) symmetric or Hermitian linear matrix polynomial (LMP) has drawn a huge amount of attention due to its connection with optimization problems. In this paper we provide a necessary and sufficient condition for the existence of monic Hermitian determinantal representation as well as monic symmetric determinantal representation of size 2 for a given quadratic polynomial. Further we propose a method to construct such a monic determinantal representtaion (MDR) of size 2 if it exists. It is known that a quadratic polynomial f()=TA+bT+1 has a symmetric MDR of size n+1 if A is negative semidefinite. We prove that if a quadratic polynomial f() with A which is not negative semidefinite has an MDR of size greater than 2, then it has an MDR of size 2 too. We also characterize quadratic polynomials which exhibit diagonal MDRs.