|
ON THE ANNIVERSARY OF A. I. GENERALOV
Ramanujan denesting formulae for cubic radicals
M. A. Antipovab, K. I. Pimenovb a National Research University Higher School of Economics, 16, ul. Soyuza Pechatnikov, St. Petersburg, 190121, Russian Federation
b St. Petersburg State University, 7-9, Universitetskaya nab., St. Petersburg, 199034, Russian Federation
Abstract:
This paper contains an explanation of Ramanujan-type formulas with cubic radicals of cubic irrationalities in the situation when these radicals are contained in a pure cubic extension. We give a complete description of formulas of such type, answering the Zippel's question. It turns out that Ramanujan-type formulas are in some sense unique in this situation. In particular, there must be no more than three summands in the right-hand side and the norm of the irrationality in question must be a cube. In this situation we associate with cubic irrationalities a cyclic cubic polinomial, which is reducible if and only if one can simplify the corresponding cubic radical. This correspondence is inverse to the so-called Ramanujan correspondence defined in the preceding papers, where one associates a pure cubic extension to some cyclic polinomial.
Keywords:
Ramanujan formulas, simplification of radicals, Ramanujan correspondence.
Received: 18.11.2019 Revised: 12.12.2019 Accepted: 12.12.2019
Citation:
M. A. Antipov, K. I. Pimenov, “Ramanujan denesting formulae for cubic radicals”, Vestnik of Saint Petersburg University. Mathematics. Mechanics. Astronomy, 7:2 (2020), 187–196; Vestn. St. Petersbg. Univ., Math., 7:2 (2020), 115–121
Linking options:
https://www.mathnet.ru/eng/vspua180 https://www.mathnet.ru/eng/vspua/v7/i2/p187
|
|