x_and_d

Variables <code>x</code> and <code>d</code> correspond to operator \(x\) and
 \(\partial_x\); they are provided for convenience. These
 elements generate the one-dimensional Weyl algebra.
Note that a similar system for multivariate Weyl algebras is not
 desirable. We might want to consider the Weyl algebra generated by
 \(\left\lbrace
 x,y,z,\partial_x,\partial_y,\partial_z\right\rbrace\)
 and correspondingly define R variables <code>x,y,z,dx,dy,dz</code>. But
 then variable <code>x</code> is ambiguous: is it a member of the first Weyl
 algebra or the third?

datasets

A suite of routines for Weyl algebras. Notation follows
Coutinho (1995, ISBN 0-521-55119-6, "A Primer of Algebraic
D-Modules"). Uses 'disordR' discipline
(Hankin 2022 <doi:10.48550/arXiv.2210.03856>). To cite
the package in publications, use Hankin
2022 <doi:10.48550/arXiv.2212.09230>.

Robin K S Hankin

weyl

The Weyl Algebra

x_and_d function

Author

Variables <code>x</code> and <code>d</code> correspond to operator \(x\) and
 \(\partial_x\); they are provided for convenience. These
 elements generate the one-dimensional Weyl algebra.
Note that a similar system for multivariate Weyl algebras is not
 desirable. We might want to consider the Weyl algebra generated by
 \(\left\lbrace
 x,y,z,\partial_x,\partial_y,\partial_z\right\rbrace\)
 and correspondingly define R variables <code>x,y,z,dx,dy,dz</code>. But
 then variable <code>x</code> is ambiguous: is it a member of the first Weyl
 algebra or the third?

x_and_d: Generating elements for the first Weyl algebra

Description

Usage

Arguments

Author

Examples