Finite-dimensional calculus
Identifieur interne : 006C70 ( Hal/Curation ); précédent : 006C69; suivant : 006C71Finite-dimensional calculus
Auteurs : Philip Feinsilver [États-Unis] ; René Schott [France]Source :
- Journal of Physics A: Mathematical and Theoretical [ 1751-8113 ] ; 2009.
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Abstract
We develop finite-dimensional calculus using matrices. The truncated Heisenberg-Weyl algebra is called a TAA algebra after Tekin, Aydin, and Arik who formulated it in terms of orthofermions. the matrix approach is used to implement our method of polynomial inversion in one-variable and multivariable settings. Here we establish notations, present some algebraic developments, and discuss the univariate case in detail.
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The truncated Heisenberg-Weyl algebra is called a TAA algebra after Tekin, Aydin, and Arik who formulated it in terms of orthofermions. the matrix approach is used to implement our method of polynomial inversion in one-variable and multivariable settings. 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The truncated Heisenberg-Weyl algebra is called a TAA algebra after Tekin, Aydin, and Arik who formulated it in terms of orthofermions. the matrix approach is used to implement our method of polynomial inversion in one-variable and multivariable settings. Here we establish notations, present some algebraic developments, and discuss the univariate case in detail.</abstract></profileDesc></hal></record>Pour manipuler ce document sous Unix (Dilib)
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