Quotient Problem For Entire Functions with Moving Targets

Abstract

As an analogue of the Hadamard quotient problem in number theory, the quotient problem (in the sense of complex entire functions) for two sequences F(n)=a0+a1f1n+·s+alfln and G(n)=b0+b1g1n+·s+bmgmn, has been solved, where the fi and gj are nonconstant entire functions and ai and bj are non-zero constants except that a0 can be zero. In this paper, we consider the generalization of this problem in which we allow ai and bj to be small growth entire functions with respect to (g1, ·s, gm) by modifying the second main theorem with moving targets to a truncated version. We also compare our result to a special case in exponential polynomials first studied by Ritt.