In this paper, we prove a conjecture posed by Li-Yang in \cite{ly3}. We prove the following result: Let $f(z)$ be a nonconstant entire function, and let $a(z)\not\equiv\infty, b(z)\not\equiv\infty$ be two distinct small meromorphic functions of $f(z)$. If $f(z)$ and $f^{(k)}(z)$ share $a(z)$ and $b(z)$ IM. Then $f(z)\equiv f^{(k)}(z)$, which confirms a conjecture due to Li and Yang (in Illinois J. Math. 44:349-362, 2000).
Comment: arXiv admin note: substantial text overlap with 2012.13775, arXiv:2103.06235, arXiv:2009.08066