English

Unicity on entire function concerning its differential-difference operators

Complex Variables 2021-06-07 v8

Abstract

In this paper, we study the uniqueness of the differential-difference polynomials of entire functions on Cn\mathbb{C}^{n}. We prove the following result: Let f(z)f(z) be a transcendental entire function on Cn\mathbb{C}^{n} of hyper-order less than 11 and g(z)=b1+i=0nbif(ki)(z+ηi)g(z)=b_{-1}+\sum_{i=0}^{n}b_{i}f^{(k_{i})}(z+\eta_{i}), where b1b_{-1} and bi(i=0,n)b_{i} (i=0\ldots,n) are small meromorphic functions of ff on Cn\mathbb{C}^{n}, ki0(i=0,n)k_{i}\geq0 (i=0\ldots,n) are integers, and ηi(i=0,n)\eta_{i} (i=0\ldots,n) are finite values. Let a1(z)≢,a2(z)≢a_{1}(z)\not\equiv\infty, a_{2}(z)\not\equiv\infty be two distinct small meromorphic functions of f(z)f(z) on Cn\mathbb{C}^{n}. If f(z)f(z) and g(z)g(z) share a1(z)a_{1}(z) CM, and a2(z)a_{2}(z) IM. Then either f(z)g(z)f(z)\equiv g(z) or a1=2a2=2a_{1}=2a_{2}=2, f(z)e2p2ep+2,f(z)\equiv e^{2p}-2e^{p}+2, and g(z)ep,g(z)\equiv e^{p}, where p(z)p(z) is a non-constant entire function on Cn\mathbb{C}^{n}. Especially, in the case of g(z)=(Δηnf(z))kg(z)=(\Delta_{\eta}^{n}f(z))^{k}, we obtain f(z)(Δηnf(z))kf(z)\equiv (\Delta_{\eta}^{n}f(z))^{k}.

Keywords

Cite

@article{arxiv.2009.08066,
  title  = {Unicity on entire function concerning its differential-difference operators},
  author = {Xiao Huang},
  journal= {arXiv preprint arXiv:2009.08066},
  year   = {2021}
}

Comments

15 pages, Comments Welcomed

R2 v1 2026-06-23T18:36:14.195Z