6533b86ffe1ef96bd12cd1ab
RESEARCH PRODUCT
Generalised Deformations, Koszul Resolutions, Moyal Products
Franc Ois Nadaudsubject
AlgebraSymmetric algebraQuadratic algebraQuaternion algebraIncidence algebraSubalgebraDivision algebraAlgebra representationCellular algebraStatistical and Nonlinear PhysicsMathematical PhysicsMathematicsdescription
We generalise Gerstenhaber's theory of deformations, by dropping the assumption that the deformation parameter should commute with the elements of the original algebra. We give the associated cohomology and construct a Koszul resolution for the polynomial algebra [Formula: see text] in the "homogeneous" case. We then develop examples in the case of [Formula: see text] and find some Moyal-like products of a new type. Finally, we show that, for any field K, matrix algebras with coefficients in K and finite degree extensions of K are rigid, as in the commutative case.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1998-07-01 | Reviews in Mathematical Physics |