On the Solvability of General Inverse σk Equations
Abstract
We prove that if there exists a C-subsolution to a constant coefficients strictly -stable general inverse σk equation, then there exists a unique solution. As a consequence, this result covers all the analytical results of the classical strictly -stable general inverse σk equations, for example, the complex Monge--Amp\`ere equation, the complex Hessian equation, the J-equation, the deformed Hermitian--Yang--Mills equation, etc. Hence, we confirm an analytical conjecture by Collins--Jacob--Yau [arXiv:1508.01934] of the solvability of the deformed Hermitian--Yang--Mills equation. Their conjecture states that the existence of a C-subsolution to a supercritical phase deformed Hermitian--Yang--Mills equation gives the solvability.
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