The Deformed Hermitian-Yang-Mills Equation and Level Sets of Harmonic Polynomials

Abstract

Suppose v(x,y): C→ R is an entire harmonic polynomial with no critical points in the right half plane. Let z1, z2∈ C lie on a level set of v , and assume Re(z2)> Re(z1)≥0. We give a necessary and sufficient condition, depending only on algebraic properties of the polynomial v, for when there exists a smooth real function f whose graph x+if(x) lies on a level curve of v connecting z1 to z2. Inspired by GIT, we construct a Kempf-Ness functional on an appropriate function space, and prove the functional is bounded from below and proper if and only if a such a graph exists. As an application, we find a stability condition equivalent to the existence of a solution to the deformed Hermitian-Yang-Mills equation on the family of projective bundles Xr,m:= P( O Pm O Pm(-1) (r+1)) with Calabi Symmetry.