Under the assumption of sixth power large.sieve mean-value of Dirichlet L-function, we improve Bombieri's theorem in short intervals by virtue of the large sieve method and Heath-Brown's identity.
The main purpose of this paper is to study the mean value properties of the character sums over the interval [1,p/8) by using the mean value theorems of the Dirichlet L-functions, and give an interesting mean value f...The main purpose of this paper is to study the mean value properties of the character sums over the interval [1,p/8) by using the mean value theorems of the Dirichlet L-functions, and give an interesting mean value formula for this study.展开更多
Letk be a positive integer and n a nonnegative integer,0 〈 λ1,...,λk+1 ≤ 1 be real numbers and w =(λ1,λ2,...,λk+1).Let q ≥ max{[1/λi ]:1 ≤ i ≤ k + 1} be a positive integer,and a an integer coprime to ...Letk be a positive integer and n a nonnegative integer,0 〈 λ1,...,λk+1 ≤ 1 be real numbers and w =(λ1,λ2,...,λk+1).Let q ≥ max{[1/λi ]:1 ≤ i ≤ k + 1} be a positive integer,and a an integer coprime to q.Denote by N(a,k,w,q,n) the 2n-th moment of(b1··· bk c) with b1··· bk c ≡ a(mod q),1 ≤ bi≤λiq(i = 1,...,k),1 ≤ c ≤λk+1 q and 2(b1+ ··· + bk + c).We first use the properties of trigonometric sum and the estimates of n-dimensional Kloosterman sum to give an interesting asymptotic formula for N(a,k,w,q,n),which generalized the result of Zhang.Then we use the properties of character sum and the estimates of Dirichlet L-function to sharpen the result of N(a,k,w,q,n) in the case ofw =(1/2,1/2,...,1/2) and n = 0.In order to show our result is close to the best possible,the mean-square value of N(a,k,q) φk(q)/2k+2and the mean value weighted by the high-dimensional Cochrane sum are studied too.展开更多
Let P(x) denote the greatest prime factor of ∏<sub>x【n≤x+x<sup>1/2</sup></sub>n. In this paper, we shall prove that P(x)】x<sup>0.728</sup>holds true for sufficiently large x.
In this paper, we study Rényi's problem and other related problems about the additive functions in short intervals. As corollaries, we improve Ivic's results.
Let the arithmetic function a(n) denote the number of non-isomorphic Abeliangroups of order n;k, positive integer, and x≥0. We setA_k(x)= sum from n≤x a(n)=k to (1)andA_k(x;h) =A_k(x+h)-A_k(x). A. Ivice first invest...Let the arithmetic function a(n) denote the number of non-isomorphic Abeliangroups of order n;k, positive integer, and x≥0. We setA_k(x)= sum from n≤x a(n)=k to (1)andA_k(x;h) =A_k(x+h)-A_k(x). A. Ivice first investigated the distribution of the values of finite non-isomorphicAbelian groups in short intervals. E. Kratzel reduced the problem to estimate theerror term △(1, 2, 3;x) in the three-dimensional multiplicative problem, and furtherimproved Ivice’s result.展开更多
Let k≥1 be an integer.Assume that RH holds.In this paper we prove that a suitable asymptotic formula for the average number of representations of integers n=p^(k)_(1)+p^(3)_(2)+p^(3)_(3)+p^(3)_(4)+p^(3)_(5),where p_(...Let k≥1 be an integer.Assume that RH holds.In this paper we prove that a suitable asymptotic formula for the average number of representations of integers n=p^(k)_(1)+p^(3)_(2)+p^(3)_(3)+p^(3)_(4)+p^(3)_(5),where p_(1),p_(2),p_(3),p_(4),p_(5)are prime numbers.This expands the previous results.展开更多
We prove that each sufficiently large odd integer N can be written as sum of the form N = p1^3 +p2^3 +... +p9^3 with [pj - (N/9)^1/31 ≤ N^(1/3)-θ, where pj, j = 1,2,...,9, are primes and θ = (1/51) -ε.
It is proved unconditionally that every sufficiently large positive integer satisfying some necessary congruence conditions can be represented as the sum of s almost equal k-th powers of prime numbers for 2 ≤ k ≤ 10...It is proved unconditionally that every sufficiently large positive integer satisfying some necessary congruence conditions can be represented as the sum of s almost equal k-th powers of prime numbers for 2 ≤ k ≤ 10 and s =2k + 1, which gives a short interval version of Hun's theorem.展开更多
Let π△ be the automorphic representation of GL(2, QA) associated with Ramanujan modular form A and L(s, π△) the global L-function attached to π△. We study Selberg's integral for the automorphic L-function L...Let π△ be the automorphic representation of GL(2, QA) associated with Ramanujan modular form A and L(s, π△) the global L-function attached to π△. We study Selberg's integral for the automorphic L-function L(s, π△) under GRH. Our results give the information for the number of primes in short intervals attached to Ramanujan automorphic representation.展开更多
基金Tianyuan Mathematics Foundation (11026075)the NSF (10971119) of Chinathe NSF (ZR2009AQ007) of Shandong Province
文摘Under the assumption of sixth power large.sieve mean-value of Dirichlet L-function, we improve Bombieri's theorem in short intervals by virtue of the large sieve method and Heath-Brown's identity.
文摘The main purpose of this paper is to study the mean value properties of the character sums over the interval [1,p/8) by using the mean value theorems of the Dirichlet L-functions, and give an interesting mean value formula for this study.
基金Supported by National Natural Science Foundation of China(Grant Nos.11001218,11201275)the Research Fund for the Doctoral Program of Higher Education of China(Grant No.20106101120001)the Natural Science Foundation of Shaanxi Province of China(Grant No.2011JQ1010)
文摘Letk be a positive integer and n a nonnegative integer,0 〈 λ1,...,λk+1 ≤ 1 be real numbers and w =(λ1,λ2,...,λk+1).Let q ≥ max{[1/λi ]:1 ≤ i ≤ k + 1} be a positive integer,and a an integer coprime to q.Denote by N(a,k,w,q,n) the 2n-th moment of(b1··· bk c) with b1··· bk c ≡ a(mod q),1 ≤ bi≤λiq(i = 1,...,k),1 ≤ c ≤λk+1 q and 2(b1+ ··· + bk + c).We first use the properties of trigonometric sum and the estimates of n-dimensional Kloosterman sum to give an interesting asymptotic formula for N(a,k,w,q,n),which generalized the result of Zhang.Then we use the properties of character sum and the estimates of Dirichlet L-function to sharpen the result of N(a,k,w,q,n) in the case ofw =(1/2,1/2,...,1/2) and n = 0.In order to show our result is close to the best possible,the mean-square value of N(a,k,q) φk(q)/2k+2and the mean value weighted by the high-dimensional Cochrane sum are studied too.
基金Project supported by the Tian Yuan Item in the National Natural Science Foundation of China.
文摘Let P(x) denote the greatest prime factor of ∏<sub>x【n≤x+x<sup>1/2</sup></sub>n. In this paper, we shall prove that P(x)】x<sup>0.728</sup>holds true for sufficiently large x.
基金National Natural Science Foundation of China(10301018)
文摘In this paper, we study Rényi's problem and other related problems about the additive functions in short intervals. As corollaries, we improve Ivic's results.
文摘Let the arithmetic function a(n) denote the number of non-isomorphic Abeliangroups of order n;k, positive integer, and x≥0. We setA_k(x)= sum from n≤x a(n)=k to (1)andA_k(x;h) =A_k(x+h)-A_k(x). A. Ivice first investigated the distribution of the values of finite non-isomorphicAbelian groups in short intervals. E. Kratzel reduced the problem to estimate theerror term △(1, 2, 3;x) in the three-dimensional multiplicative problem, and furtherimproved Ivice’s result.
基金the National Natural Science Foundation of China(Grant No.11761048)the Natural Science Foundation of Jiangxi Province for Distinguished Young Scholars(Grant No.20212ACB211007)Natural Science Foundation of Jiangxi Province(Grant No.20224BAB201001).
文摘Let k≥1 be an integer.Assume that RH holds.In this paper we prove that a suitable asymptotic formula for the average number of representations of integers n=p^(k)_(1)+p^(3)_(2)+p^(3)_(3)+p^(3)_(4)+p^(3)_(5),where p_(1),p_(2),p_(3),p_(4),p_(5)are prime numbers.This expands the previous results.
文摘We prove that each sufficiently large odd integer N can be written as sum of the form N = p1^3 +p2^3 +... +p9^3 with [pj - (N/9)^1/31 ≤ N^(1/3)-θ, where pj, j = 1,2,...,9, are primes and θ = (1/51) -ε.
基金Supported by National'Natural Science Foundation of China (Grant No. 10701048)
文摘It is proved unconditionally that every sufficiently large positive integer satisfying some necessary congruence conditions can be represented as the sum of s almost equal k-th powers of prime numbers for 2 ≤ k ≤ 10 and s =2k + 1, which gives a short interval version of Hun's theorem.
基金Supported by National Natural Science Foundation of China (Grant No. 10571107)Acknowledgements The author expresses her thanks to Professor Jianya Liu and Professor Yangbo Ye for encouragernent, and to Professor Xiumin Ren for valuable suggestions. This work was completed when the author visited The University of Iowa supported by CSC. The author would like to thank Department of Mathematics, The University of Iowa for hospitality and support.
文摘Let π△ be the automorphic representation of GL(2, QA) associated with Ramanujan modular form A and L(s, π△) the global L-function attached to π△. We study Selberg's integral for the automorphic L-function L(s, π△) under GRH. Our results give the information for the number of primes in short intervals attached to Ramanujan automorphic representation.
