Cubic Polynomials, Linear Shifts, and Ramanujan Cubics

Published 2 Sep 2017 in math.NT | (1709.00534v2)

Abstract: We show that every monic polynomial of degree three with complex coefficients and no repeated roots is either a (vertical and horizontal) translation of $y=x^3$ or can be composed with a linear function to obtain a Ramanujan cubic. As a result, we gain some new insights into the roots of cubic polynomials.

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Cubic Polynomials, Linear Shifts, and Ramanujan Cubics

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Cubic Polynomials, Linear Shifts, and Ramanujan Cubics

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