Polynomials with a common composite

Robert Beals; Joseph Wetherell; Michael Zieve

doi:10.1007/s11856-009-0105-y

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Journal article

Peer reviewed

Polynomials with a common composite

Robert Beals, Joseph Wetherell and Michael Zieve

Israel journal of mathematics, Vol.174(1), pp.93-117

11/2009

DOI: https://doi.org/10.1007/s11856-009-0105-y

Abstract

Algebra

Analysis

Applications of Mathematics

Group Theory and Generalizations

Mathematics

Mathematics, general

Theoretical, Mathematical and Computational Physics

Let f and g be nonconstant polynomials over a field K. In this paper we study the pairs (f, g) for which the intersection K[f] ∩ K[g] is larger than K. We describe all such pairs in case K has characteristic zero, as a consequence of classical results due to Ritt. For fields K of positive characteristic we present various results, examples, and algorithms.

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Details

Title: Polynomials with a common composite
Creators: Robert Beals - Center for Communications Research 805 Bunn Drive Princeton NJ 08540-1966 USA
Joseph Wetherell - Center for Communications Research 4320 Westerra Court San Diego CA 92121-1967 USA
Michael Zieve - Center for Communications Research 805 Bunn Drive Princeton NJ 08540-1966 USA
Publication Details: Israel journal of mathematics, Vol.174(1), pp.93-117
Date published: 11/2009
Publisher: The Hebrew University Magnes Press
Academic Unit: Mathematics (SAS)
Language: English
Resource Type: Journal article
Identifiers: 991031665428004646