摘要
对Hardy-Hilbert不等式进行了研究,并将其进一步改进如下:若p>1,1/p+1/q=1,0<A,B≤1,an,bn≥0,使0<∑∞n=0apn<∞,0<∑∞n=0bqn<∞,则∑∞m=0∑∞n=0ambn/Am+Bn+1<{∑∞n=0(π/Bsin(π/p)-(3p-B)( p-1)/6p(2An+)11/p)anp}1/p{∑∞n=0(π/Asin(π/p)-(3q-A)(q-1)/6q(2Bn+1)1/q)bnq}1/q.所得结果改进和推广了最近文献的一些相应结果.
This paper carries out study on Hardy-Hilbert's inequality and makes the following improvement: provided that p1,1/p+1/q=1,0A,B≤1,an,bn≥0,and 0∑∞n=0bqn∞,Then we have:∑∞m=0∑∞n=0ambn/Am+Bn+1{∑∞n=0(π/Bsin(π/p)-(3p-B)(p-1)/6p(2An+)11/p)anp}1/p{∑∞n=0(π/Asin(π/p)-(3q-A)(q-1)/6q(2Bn+1)1/q)bnq}1/q.The results presented in this paper improve and generalize some corresponding results in recent works.
出处
《贵州师范学院学报》
2011年第12期6-9,共4页
Journal of Guizhou Education University
基金
四川省教育厅自然科学青年基金(09ZA091)
