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Second-order estimates for degenerate complex $k$-Hessian and Christoffel-Minkowski equations

Published 28 Feb 2026 in math.AP | (2603.00561v1)

Abstract: It is known that the complex $k$-Hessian equation admits almost $C{1,1}$ regularity (i.e., $\supΔu<\infty$) and the Christoffel-Minkowski equation admits $C{1,1}$ regularity under the sharp degenerate condition $f{1/(k-1)}\in C{1,1}$ for a nonnegative right-hand side $f$. Assuming instead the alternative sharp degenerate condition $f{3/(2k-2)}\in C{2,1}$, we prove almost $C{1,1}$ regularity for the complex $k$-Hessian equation when $k\geq5$ and $C{1,1}$ regularity for the Christoffel-Minkowski equation. The argument deeply exploits various concavity properties of the operators under the stronger regularity assumption on $f$.

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