亚纯函数及其n阶导数权分担两个值
2009-07-05徐洪焱易才凤
徐洪焱,易才凤
(1.景德镇陶瓷学院信息学院,江西景德镇 333403;2.江西师范大学数信学院,江西南昌 330027)
亚纯函数及其n阶导数权分担两个值
徐洪焱1,易才凤2
(1.景德镇陶瓷学院信息学院,江西景德镇 333403;2.江西师范大学数信学院,江西南昌 330027)
研究亚纯函数及其n阶导数权分担两个值的唯一性问题.得到了:如果两个非常数亚纯函数f,g分担(∞,∞),f(n)与g(n)分担(1,0),n(≥0)为一整数,且满足△C0:= (4n+6)λ+δn+1(0,f)+δn+1(0,g)+δn+2(0,f)+δn+2(0,g)+δn(0,f)>4n+10,其中λ=max{min{Θ(∞,f),Θ(0,f)},min{Θ(∞,g),Θ(0,g)}},那么f(n)·g(n)≡1,或者f≡g.该结果改进了前人的有关定理.
亚纯函数;权分担;唯一性
1 引言及主要结果
2 引理
3 定理1.1的证明
这样很容易知道H的极点只可能发生以下几种情况:(1)F,G的重级零点;(2)F,G的重级极点;(3)F,G的1-值点且其重数不相等;(4)F'的零点但非F(F−1)的零点;(5)G'的零点但非G(G−1)的零点.
(i)由(i)的条件,知F,G分担(1,0),(∞,∞),再根据H的表达式很容易知道F,G的极点不是H的极点.
如果H/≡0,由引理2.7,有
类似于情形1也可得到矛盾.
如果a−1=0,则f(n)≡g(n).由此方程可得到f=g+p(z),这里p(z)为多项式,显然T(r,f)=T(r,g)+S(r,f).如果p(z)/≡0,根据引理2.2,有
由(1.1)式很容易得到T(r,f)≤S(r,f),r∈I矛盾.因此p(z)≡0,即f≡g.
综合三种情形,定理1.1(i)得证.下证定理1.1(ii).
(ii)因为f(n)与g(n)分担(1,0),所以F,G分担(1,0).
如果H/≡0,则(3.1)式变为
4 定理1.2的证明
如果H≡0,类似于定理1.1可以证得f(n)·g(n)≡1,或者f≡g,即定理1.2(i)得证.
类似于定理1.1(ii)证明方法并结合(4.1)-(4.4)式及f,g分担(∞,0),也很容易证明.这里略之.
综上所述,则完成了定理1.2的证明.
[1]Hayman W K.Meromorphic Functions[M].Oxford:Clarendon Press,1964.
[2]Yi H X,Yang C C.Uniqueness Theory of Meromorphic Functions[M].Beijing:Science Press,1995.
[3]Yang C C.On two entire functions which together with their first derivatives have the same zeros[J].J.Math. Anal.Appl.,1976,56:1-6.
[4]Yi H X.A question of C C Yang on uniqueness of entire functions[J].Kodai Math.J.,1990,13:39-46.
[5]Yuan W J,Tian H G.Further results of some uniqueness theorems for meromorphic functions whose n-th derivatives share the same 1-points[J].Advances in Applied Clifford Algebras,2001,11(S2):317-325.
[6]Lahiri I.Weighted sharing and uniqueness of meromorphic functions[J].Nagoya Math.J.,2001,161:193-206.
[7]Lahiri I.On a result of Ozawa concerning uniqueness of meromorphic functions I[J].J.Math.Anal.Appl., 2003,283:66-76.
[8]Banerjee A.Weighted sharing of a small function by a meromorphic function and its derivative[J].Comput. Math.Appl.,2007,53:1750-1761.
[9]Banerjee A.Meromorphic functions sharing one value[J].Int.J.Math.Math.Sci.,2005,22:3587-3598.
[10]Lahiri I.Weighted value sharing and uniqueness of meromorphic functions[J].Complex Variables Theory Appl.,2001,46(3):241-253.
[11]Zhang Q C.Meromorphic function that shares one small function with its derivative[J].J.Inequal.Pure Appl.Math.,2005,6(4):Article 116,13pp.http://jipam.vn.edu.au/.
Mermorphic functions concerning their n-th derivative sharing two values with weight
XU Hong-yan1,YI Cai-feng2
(1.Department of Informatics and Engineering,Jingdezhen Ceramic Institute,Jingdezhen333403,China; 2.Institute of Mathematics and Informatics,Jiangxi Normal University,Nanchang330027,China)
In this paper,we deal with the uniqueness problem of meromorphic functions concerning their n-th derivative sharing two values with weight and obtain the following theorem:if two nonconstant meromorphic functions f,g share(∞,∞),fn,gnshare(1,0),and satisfy△C0:=(4n+6)λ+δn+1(0,f)+δn+1(0,g)+δn+2(0,f)+ δn+2(0,g)>4n+10,where λ=max{min{Θ(∞,f),Θ(0,f)},min{Θ(∞,g),Θ(0,g)}},then either f(n)·g(n)≡1 or f≡g,where n(>0)is an integer.These results extend the former theorems.
meromorphic function,weighted sharing,uniqueness
O174.52
A
1008-5513(2009)04-0777-09
2008-04-21.
国家自然科学基金(10871108),景德镇陶瓷学院科研项目(景陶院发[2009]86号).
徐洪焱(1980-),硕士,研究方向:复分析.
2000MSC:30D30,30D35
