A Bernstein Theorem for the Self-Shrinking $J$-Equation and Some Generalizations

We prove that every entire smooth plurisubharmonic solution of the self-shrinking $J$-equation on $\mathbb{C}^n$ is a quadratic polynomial.

This removes the asymptotic lower bound assumption on the complex Hessian in \cite[Theorem 4]{HJ}.

The result also recovers the corresponding real rigidity theorem in \cite[Theorem 1.1]{HOW} as a special case.

More generally, our method applies to a broad class of fully nonlinear elliptic operators satisfying suitable structural conditions, including the inverse complex Hessian quotient operators $-\sigma_{k-1}/\sigma_{k}$ for $1\leq k\leq n$.