On the Casas-Alvero conjecture

J. Draisma; J.P. Jong, de

On the Casas-Alvero conjecture

J. Draisma
, J.P. Jong, de

Research output: Contribution to journal › Article › Academic › peer-review

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Abstract

The Casas–Alvero conjecture says that a complex univariate polynomial having roots in common with each of its derivatives must be a power of a linear polynomial. In this expository note we review some ideas on this conjecture. In particular, we explain the rather successful algebraic attack by Graf von Bothmer et al., which proves the conjecture in infinitely many degrees, and challenge analysts to come up with new approaches.

Original language	English
Pages (from-to)	29-33
Journal	Newsletter of the European Mathematical Society
Volume	80
Publication status	Published - 2011

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title = "On the Casas-Alvero conjecture",

abstract = "The Casas–Alvero conjecture says that a complex univariate polynomial having roots in common with each of its derivatives must be a power of a linear polynomial. In this expository note we review some ideas on this conjecture. In particular, we explain the rather successful algebraic attack by Graf von Bothmer et al., which proves the conjecture in infinitely many degrees, and challenge analysts to come up with new approaches.",

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AB - The Casas–Alvero conjecture says that a complex univariate polynomial having roots in common with each of its derivatives must be a power of a linear polynomial. In this expository note we review some ideas on this conjecture. In particular, we explain the rather successful algebraic attack by Graf von Bothmer et al., which proves the conjecture in infinitely many degrees, and challenge analysts to come up with new approaches.

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VL - 80

SP - 29

EP - 33

JO - Newsletter of the European Mathematical Society

JF - Newsletter of the European Mathematical Society

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On the Casas-Alvero conjecture

Abstract

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