Existence of solution to modified Gursky-Streets equation
Abstract
We solve the modified Gursky-Streets equation, which is a fully nonlinear equation arising in conformal geometry with uniform C1, 1 estimates when (i) γ > 0 and 1 ≤ k ≤ n or (ii) r > 0 and 2 s k ≤ r n. We also prove the existence of a Lipschitz continuous viscosity solution when r ≠ 0.
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