We consider exceptional sets in the Waring-Goldbach problem for fifth powers.For example,we prove that all but O(N^(131/132))integers satisfying the necessary local conditions can be represented as the sum of 11 fifth...We consider exceptional sets in the Waring-Goldbach problem for fifth powers.For example,we prove that all but O(N^(131/132))integers satisfying the necessary local conditions can be represented as the sum of 11 fifth powers of primes,which improves the previous results due to A.V.Kumchev[Canad.J.Math.,2005,57:298–327]and Z.X.Liu[Int.J.Number Theory,2012,8:1247–1256].展开更多
It is established that all even positive integers up to N but at most O(N15/16+ε) exceptions can be expressed in the form p1^2+ p2^3+ p3^4+ p4^5,where p1,p2,p3 and p4 are prime numbers.
For real valued functions defined on Cantor triadic set, a derivative with corresponding formula of Newton Leibniz’s type is given. In particular, for the self similar functions and alternately jumping f...For real valued functions defined on Cantor triadic set, a derivative with corresponding formula of Newton Leibniz’s type is given. In particular, for the self similar functions and alternately jumping functions defined in this paper, their derivative and exceptional sets are studied accurately by using ergodic theory on Σ 2 and Duffin Schaeffer’s theorem concerning metric diophantine approximation. In addition, Haar basis of L 2(Σ 2) is constructed and Haar expansion of standard self similar function is given.展开更多
Let N be a sufficiently large integer.In this paper,it is proved that with at most O(N17/18+ε)exceptions,all positive integers satisfying some necessary congruence conditions up to N can be represented in the form p_...Let N be a sufficiently large integer.In this paper,it is proved that with at most O(N17/18+ε)exceptions,all positive integers satisfying some necessary congruence conditions up to N can be represented in the form p_(1)^(3)+p_(2)^(4)+p_(3)^(4)+p_(5)^(4)+p_(6)^(4)+p_(7)^(4)+p_(8)^(4)+p_(9)^(4)+p_(10)^(4),where p1,p2,…,P_(10)are prime numbers.展开更多
In this paper, it is proved that with at most O(N65/66) exceptions, all even positive integers up to N are expressible in the form p^2 2+p^3 3+p^4 4+p^5 5. This improves a recent result O(N19193/19200+ε) due...In this paper, it is proved that with at most O(N65/66) exceptions, all even positive integers up to N are expressible in the form p^2 2+p^3 3+p^4 4+p^5 5. This improves a recent result O(N19193/19200+ε) due to C. Bauer.展开更多
基金The first author was supported by the Scientific Research Project of the Education Department of Fujian Province(Grant No.JAT190370)the Natural Science Foundation of Fujian Province(Grant No.2020J05162)+1 种基金The second author was supported by the National Natural Science Foundation of China(Grant No.11871367)the Natural Science Foundation of Tianjin City(Grant No.19JCQNJC14200).
文摘We consider exceptional sets in the Waring-Goldbach problem for fifth powers.For example,we prove that all but O(N^(131/132))integers satisfying the necessary local conditions can be represented as the sum of 11 fifth powers of primes,which improves the previous results due to A.V.Kumchev[Canad.J.Math.,2005,57:298–327]and Z.X.Liu[Int.J.Number Theory,2012,8:1247–1256].
基金Supported by National Natural Science Foundation of China(Grant No.11326205)
文摘It is established that all even positive integers up to N but at most O(N15/16+ε) exceptions can be expressed in the form p1^2+ p2^3+ p3^4+ p4^5,where p1,p2,p3 and p4 are prime numbers.
文摘For real valued functions defined on Cantor triadic set, a derivative with corresponding formula of Newton Leibniz’s type is given. In particular, for the self similar functions and alternately jumping functions defined in this paper, their derivative and exceptional sets are studied accurately by using ergodic theory on Σ 2 and Duffin Schaeffer’s theorem concerning metric diophantine approximation. In addition, Haar basis of L 2(Σ 2) is constructed and Haar expansion of standard self similar function is given.
文摘Let N be a sufficiently large integer.In this paper,it is proved that with at most O(N17/18+ε)exceptions,all positive integers satisfying some necessary congruence conditions up to N can be represented in the form p_(1)^(3)+p_(2)^(4)+p_(3)^(4)+p_(5)^(4)+p_(6)^(4)+p_(7)^(4)+p_(8)^(4)+p_(9)^(4)+p_(10)^(4),where p1,p2,…,P_(10)are prime numbers.
基金Supported by Post-Doctoral Fellowship of The University of Hong KongThe National Natural Science Foundation(Grant No.10571107)Supported by a grant from the Research Grant Council of Hong Kong(Project No.HKU7028/03P)
文摘In this paper, it is proved that with at most O(N65/66) exceptions, all even positive integers up to N are expressible in the form p^2 2+p^3 3+p^4 4+p^5 5. This improves a recent result O(N19193/19200+ε) due to C. Bauer.
