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1.
We proved:Let F be a family of meromorphic functions in a domain D and a≠0,b∈C.If f′(z)-a(f(z))~2≠b,f≠0 and the poles of f(z)are of multiplicity>=3 for each f(z)∈F,then F is normal in D. 相似文献
2.
Commutators of Toeplitz Operators On A~p(ψ) 总被引:1,自引:0,他引:1
Let denote the positive continous function on [0,1). be called normal, if there exist two constants a and b (0<a<b) such that (t)(1-t2)a decreases and (t)(1-t2)b increases on [0,1). Let dm denote the normalized area measure on the open unit disk D in the complex plane. Define dmp as the measure on D: dmp=p(|z|)1-|z|2dm(z). For 1p<∞, let Lp() denote the Banach space of measurable functions f with norm ‖f‖p,φ=∫D|f|pdmpφ1/p<∞. Ap() denote the closed subspac… 相似文献
3.
Donggao Deng Yanbo Xu Lixin Yan 《分析论及其应用》2006,22(1):41-55
Let X be a space of homogeneous type with finite measure. Let T be a singular integral operator which is bounded on Lp (X), 1 < p <∞. We give a sufficient condition on the kernel k(x,y) of Tso that when a function b ∈ BMO (X) ,the commutator [b, T] (f) = T (b f) - bT (f) is aounded on spaces Lp for all p, 1 < p <∞. 相似文献
4.
In the paper,we prove the main result:Let k(≥2)be an integer,and a,b and c be three distinct complex numbers.Let F be a family of functions holomorphic in a domain D in complex plane,all of whose zeros have multiplicity at least k.Suppose that for each f∈F,f(z)and f(k)(z)share the set{a,b,c}.Then F is a normal family in D. 相似文献
5.
Let f(z) be a meromorphic function in the complex plane, whose zeros have multiplicity at least k + 1(k ≥ 2). If sin z is a small function with respect to f(z), then f~(k)(z)-P(z) sin z has infinitely many zeros in the complex plane, where P(z) is a nonzero polynomial of deg(P(z)) ≠ 1. 相似文献
6.
In this paper, we continue to discuss the normality concerning omitted holomorphic function and get the following result. Let F be a family of meromorphic functions on a domain D, k ≥ 4 be a positive integer, and let a(z) and b(z) be two holomorphic functions on D, where a(z) 0 and f(z) ≠ ∞ whenever a(z)=0. If for any f ∈ F, f'(z) -a(z)fk(z) ≠ b(z), then F is normal on D. 相似文献
7.
《数学研究及应用》2015,(2)
Let(a, b, c) be a primitive Pythagorean triple. Je′smanowicz conjectured in 1956 that for any positive integer n, the Diophantine equation(an)x+(bn)y=(cn)z has only the positive integer solution(x, y, z) =(2, 2, 2). Let p ≡ 3(mod 4) be a prime and s be some positive integer. In the paper, we show that the conjecture is true when(a, b, c) =(4p2s-1, 4p s, 4p2s+ 1) and certain divisibility conditions are satisfied. 相似文献
8.
Let(a, b, c) be a primitive Pythagorean triple. Je′smanowicz conjectured in 1956 that for any positive integer n, the Diophantine equation(an)x+(bn)y=(cn)z has only the positive integer solution(x, y, z) =(2, 2, 2). Let p ≡ 3(mod 4) be a prime and s be some positive integer. In the paper, we show that the conjecture is true when(a, b, c) =(4p2s-1, 4p s, 4p2s+ 1) and certain divisibility conditions are satisfied. 相似文献
9.
Let T be the class of functions of the form f(z)=z sum from n=2 to∞a_nz~n which are analytic inthe unit disc U={z:|z|<1}.A function f(z)∈T is said to be a member of the classR(a,b)if and only if it satisfies 相似文献
10.
Let Γ be a regular curve and Lp (Γ), 1
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