References
A. A. Karatsuba, Dokl. Math. 63, 9–10 (2001).
A. A. Karatsuba, Math. Notes 70(5), 724–726 (2001).
A. A. Karatsuba, Izv. Math. 68(6), 1157–1163 (2004).
A. A. Karatsuba, Funct. Approx. Comment. Math. 35, 195–207 (2006).
M. Z. Garaev, Taiwanese J. Math. 6(4), 573 (2002).
S. J. Feng, Acta Arithm. 114(3), 295 (2004).
M. E. Changa, Math. Notes 76(6), 859–864 (2004).
M. E. Changa, Russ. Math. Surveys 60(3), 564–565 (2005).
R. Balasubramanian, Hardy-Ramanujan J. 9, 1–10 (1986).
A. Selberg, Dixieme Congres Math. Scandinaves, Copenhagen, 1946 (Jul. Gjellerups Forlag, Copenhagen, 1947), pp. 187–200.
R. N. Boyarinov, Dokl. Math. 83, 290–292 (2011).
M. A. Korolev, Izv. Math. 76(2), 275–309 (2012).
A. Selberg, Arch. Math. Naturvid. 48(5), 89–155 (1946).
A. A. Karatsuba and S. M. Voronin, The Riemann Zeta-Function (Walter de Gruyter, Berlin, 1992; Fizmatlit, Moscow, 1994).
M. A. Korolev, Sb. Math. 203(12), 1808–1816 (2012).
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Original Russian Text © M.A. Korolev, 2015, published in Doklady Akademii Nauk, 2015, Vol. 460, No. 6, pp. 642–644.
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Korolev, M.A. Large values of the Riemann zeta-function on short intervals of the critical line. Dokl. Math. 91, 102–104 (2015). https://doi.org/10.1134/S1064562415010329
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DOI: https://doi.org/10.1134/S1064562415010329