solidot新版网站常见问题,请点击这里查看。
消息
本文已被查看147次
Symmetric tensor categories in characteristic 2. (arXiv:1807.05549v1 [math.RT])
来源于:arXiv
We construct and study a nested sequence of finite symmetric tensor
categories ${\rm Vec}=\mathcal{C}_0\subset \mathcal{C}_1\subset\cdots\subset
\mathcal{C}_n\subset\cdots$ over a field of characteristic $2$ such that
$\mathcal{C}_{2n}$ are incompressible, i.e., do not admit tensor functors into
tensor categories of smaller Frobenius--Perron dimension. This generalizes the
category $\mathcal{C}_1$ described by Venkatesh and the category
$\mathcal{C}_2$ defined by Ostrik. The Grothendieck rings of the categories
$\mathcal{C}_{2n}$ and $\mathcal{C}_{2n+1}$ are both isomorphic to the ring of
real cyclotomic integers defined by a primitive $2^{n+2}$-th root of unity,
$\mathcal{O}_n=\mathbb Z[2\cos(\pi/2^{n+1})]$. 查看全文>>