Weyl algebra
C17818
concept
The Weyl algebra is the associative algebra generated by variables and their corresponding differential operators subject to canonical commutation relations, typically modeling the algebraic structure of quantum mechanical observables.
Observed surface forms (1)
| Surface form | Occurrences |
|---|---|
| differential operator | 6 |
Instances (7)
| Instance | Via concept surface |
|---|---|
|
Weyl algebra
surface form:
first Weyl algebra A1(k)
|
— |
| Laplace operator | differential operator |
| Lie derivative | differential operator |
| Dirac operator | differential operator |
| dAlembert operator | differential operator |
| Hodge Laplacian | differential operator |
| Schrödinger operators | differential operator |