中文

On quandle representations

表示论 2026-05-14 v1

摘要

A unitary finite dimensional quandle representation is decomposable into a direct sum of irreducible represenations. Not all quandle representations satisfy this property. We prove that a finite dimensional quandle represenation ρ:QGL(V)\rho :Q \to GL(V) of a finite quandle QQ over C\mathbb{C} is decomposable into a direct sum of irreducibles if and only if every element in the image of ρ\rho is diagonlizable. We show that an irreducible representation ρ:QGL(V)\rho :Q \to GL(V) of a finite quandle over C\mathbb{C} is unitary for some inner product if and only if every element of the image of ρ\rho has determinant of modulus 11. It follows that any irreducible representation of a finite quandle QQ over C\mathbb{C} can be twisted by a quandle character to obtain a unitary irreducible representation. We also prove that the enveloping group G(Q)G(Q), of a finite quandle QQ, admit a faithfull finite dimensional unitary representation over C\mathbb{C} and that the irreducible representations of a finite quandle QQ over C\mathbb{C} are 11-dimensional if and only if G(Q)G(Q) is abelian. Finaly, we determine the irreducible representations over C\mathbb{C} of a family of finite quandles.

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引用

@article{arxiv.2605.12692,
  title  = {On quandle representations},
  author = {Mohamad Maassarani},
  journal= {arXiv preprint arXiv:2605.12692},
  year   = {2026}
}