Algebraic dependence of commuting elements in algebras
Silvestrov, Sergei; Svensson, Christian; De Jeu, Marcel (2007). Algebraic dependence of commuting elements in algebras. LUTFMA-5090-2007/1-14/(2007) (24)
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Unpublished
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English
Authors:
Silvestrov, Sergei
;
Svensson, Christian
;
De Jeu, Marcel
Department:
Mathematics (Faculty of Engineering)
Non-commutative Geometry-lup-obsolete
Project:
Non-commutative Analysis of Dynamics, Fractals and Wavelets
Non-commutative Geometry in Mathematics and Physics
Research Group:
Non-commutative Geometry-lup-obsolete
Abstract:
The aim of this paper to draw attention to several aspects of the algebraic dependence in algebras. The article starts with discussions of the algebraic dependence problem in commutative algebras. Then the Burchnall-Chaundy construction for proving algebraic dependence and obtaining the corresponding algebraic curves for commuting differential operators in the Heisenberg algebra is reviewed. Next some old and new results on algebraic dependence of commuting q-difference operators and elements in q-deformed Heisenberg algebras are reviewed. The main ideas and essence of two proofs of this are reviewed and compared. One is the algorithmic dimension growth existence proof. The other is the recent proof extending the Burchnall-Chaundy approach from differential operators and the Heisenberg algebra to the q-deformed Heisenberg algebra, showing that the
Burchnall-Chaundy eliminant construction indeed provides annihilating curves for commuting elements in the
q-deformed Heisenberg algebras for q not a root of unity.
Keywords:
eliminant ;
commuting elements ;
Burchnall-Chaundy construction ;
algebraic dependence ;
q-difference operators ;
q-deformed Heisenberg algebras
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