The Deformed Hermitian--Yang--Mills Equation, the Positivstellensatz, and the Solvability

Abstract

Let (M, ω) be a compact connected K\"ahler manifold of complex dimension four and let [] ∈ H1,1(M; R). We confirmed the conjecture by Collins--Jacob--Yau [arXiv:1508.01934] of the solvability of the deformed Hermitian--Yang--Mills equation, which is given by the following nonlinear elliptic equation Σi (λi) = θ, where λi are the eigenvalues of with respect to ω and θ is a topological constant. This conjecture was stated in [arXiv:1508.01934], wherein they proved that the existence of a supercritical C-subsolution or the existence of a C-suboslution when θ ∈ [ ( (n-2) + 2/n ) π/2, nπ/2 ) will give the solvability of the deformed Hermitian--Yang--Mills equation. Collins--Jacob--Yau conjectured that their existence theorem can be improved when θ ∈ ( (n-2 ) π/2, ( (n-2) + 2/n ) π/2 ), where n is the complex dimension of the manifold. In this paper, we confirmed their conjecture that when the complex dimension equals four and θ is close to the supercritical phase π from the right, then the existence of a C-subsolution implies the solvability of the deformed Hermitian--Yang--Mills equation.