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The $k$-convex functions are the viscosity subsolutions to the fully nonlinear elliptic equations $F_k\left[u\right]=0$, where $F_k\left[u\right]$ is the elementary symmetric function of order $k$, $1\le k\le n$, of the eigenvalues of the Hessian matrix $D^{2}u$. For example, $F_1\left[u\right]$ is the Laplacian $\Delta u$ and $F_n\left[u\right]$ is the real Monge-Ampère operator det $D^{2}u$, while $1$-convex functions and $n$-convex functions are subharmonic and convex in the classical sense, respectively. In this paper, we establish an approximation theorem for negative $k$-convex functions, and give several...