Notes on the motivic McKay correspondence for the group scheme   $\alpha_{p}$

Fabio Tonini; Takehiko Yasuda

arXiv:1803.09558·math.AG·February 27, 2024

Notes on the motivic McKay correspondence for the group scheme $\alpha_{p}$

Fabio Tonini, Takehiko Yasuda

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TL;DR

This paper proposes a conjecture linking the motivic McKay correspondence for the group scheme α_p in characteristic p>0 with quotient varieties by α_p and cyclic groups of order p, supported by initial evidence.

Contribution

It formulates a new conjecture relating the motivic McKay correspondence for α_p to quotient varieties by cyclic groups of order p in positive characteristic.

Findings

01

Initial evidence supports the conjecture.

02

Proposes a close relation between quotient varieties by α_p and cyclic groups.

03

Lays groundwork for further research in motivic McKay correspondence in positive characteristic.

Abstract

We formulate a conjecture on the motivic McKay correspondence for the group scheme $α_{p}$ in characteristic $p > 0$ and give a few evidences. The conjecture especially claims that there would be a close relation between quotient varieties by $α_{p}$ and ones by the cyclic group of order $p$ .

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