The images of Lie polynomials evaluated on matrices

Alexei Kanel-Belov; Sergey Malev; Louis Rowen

doi:10.1080/00927872.2017.1282959

The images of Lie polynomials evaluated on matrices

Alexei Kanel-Belov, Sergey Malev, Louis Rowen

פרסום מחקרי: פרסום בכתב עת › מאמר › ביקורת עמיתים

20 ציטוטים ‏(Scopus)

תקציר

Kaplansky asked about the possible images of a polynomial f in several noncommuting variables. In this paper, we consider the case of f a Lie polynomial. We describe all the possible images of f in M₂(K) and provide an example of f whose image is the set of non-nilpotent trace zero matrices, together with 0. We provide an arithmetic criterion for this case. We also show that the standard polynomial s_k is not a Lie polynomial, for k>2.

שפה מקורית	אנגלית
עמודים (מ-עד)	4801-4808
מספר עמודים	8
כתב עת	Communications in Algebra
כרך	45
מספר גיליון	11
מזהי עצם דיגיטלי (DOIs)	https://doi.org/10.1080/00927872.2017.1282959
סטטוס פרסום	פורסם - 2 נוב׳ 2017
פורסם באופן חיצוני	כן

גישה למסמך

10.1080/00927872.2017.1282959

קבצים וקישורים אחרים

Link to publication in Scopus

פורמט ציטוט ביבליוגרפי

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The images of Lie polynomials evaluated on matrices

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