6533b85afe1ef96bd12b96b1

RESEARCH PRODUCT

Jordan Decompositions of Tensors

Frederic HolweckLuke Oeding

subject

Mathematics - Algebraic GeometryMathematics::Rings and Algebras81P18 15A69 15A72FOS: Mathematics[PHYS.MPHY] Physics [physics]/Mathematical Physics [math-ph]Algebraic Geometry (math.AG)[PHYS.QPHY] Physics [physics]/Quantum Physics [quant-ph]

description

We expand on an idea of Vinberg to take a tensor space and the natural Lie algebra which acts on it and embed them into an auxiliary algebra. Viewed as endomorphisms of this algebra we associate adjoint operators to tensors. We show that the group actions on the tensor space and on the adjoint operators are consistent, which endows the tensor with a Jordan decomposition. We utilize aspects of the Jordan decomposition to study orbit separation and classification in examples that are relevant for quantum information.

yearjournalcountryeditionlanguage
2022-06-27
https://hal.science/hal-03720101