Abstract We consider noncompact complete Kähler manifolds with nonnegative bisectional curvature. Our main results are as follows: (1) Precise relations among refined minimal degree of polynomial growth holomorphic functions and holomorphic volume forms, AVR (asymptotic volume ratio) and ASCD (average of scalar curvature decay) are established. (2) The Lyapunov asymptotic behavior of the Kähler–Ricci flow can be described in terms of polynomial growth holomorphic functions. This provides a unifying perspective that bridges the two distinct proofs of Yau’s uniformization conjecture by Liu and Chau–Lee–Tam. These resolve two conjectures made by Yang.
Y Shi (Sun,) studied this question.