Primes between consecutive squares and the Lindelof hypothesis

被引：0

作者：

Bazzanella, Danilo ^{[1
]}

机构：

[1] Politecn Torino, Dipartimento Matemat, I-10129 Turin, Italy

来源：

PERIODICA MATHEMATICA HUNGARICA | 2013年 / 66卷 / 01期

关键词：

distribution of prime numbers; primes between squares; SHORT INTERVALS;

D O I：

10.1007/s10998-013-1457-y

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

At present noone knows an unconditional proof that between two consecutive squares there is always a prime number. In a previous paper the author proved that, under the assumption of the Lindelof hypothesis, each of the intervals [n (2), (n+1)(2)] aS, [1,N], with at most O(N (E >)) exceptions, contains the expected number of primes, for every constant E > > 0. In this paper we improve the result by weakening the hypothesis in two different ways.

引用

页码：111 / 117

页数：7

共 11 条

[1] Primes between consecutive squares [J].

Bazzanella, D .

ARCHIV DER MATHEMATIK, 2000, 75 (01) :29-34

[2] The exceptional set for the number of primes in short intervals [J].

Bazzanella, D ;

Perelli, A .

JOURNAL OF NUMBER THEORY, 2000, 80 (01) :109-124

[3] A note on primes in short intervals [J].

Bazzanella, Danilo .

ARCHIV DER MATHEMATIK, 2008, 91 (02) :131-135

[4]

Bazzanella D, 2011, FUNCT APPROX COMM MA, V45, P255, DOI 10.7169/facm/1323705816

[5]

DAVENPORT H., 1980, GRADUATE TEXTS MATH, V74

[6]

Heath-Brown D. R., 1990, TRIBUTE PAUL ERDOS, P277

[7]

HEATHBROWN DR, 1979, J LOND MATH SOC, V19, P207

[8]

Ingham A.E., 1937, Quart. J. Math. Oxford Ser., Vos-8, P255

[9]

Ivic A., 1985, The Riemann Zeta-Function

[10] LARGE SIEVE [J].

MONTGOMERY, HL ;

VAUGHAN, RC .

MATHEMATIKA, 1973, 20 (40) :119-134

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