# F-pure threshold and height of quasi-homogeneous polynomials

**Authors:** Susanne M\"uller

arXiv: 1702.07553 · 2017-02-27

## TL;DR

This paper investigates the relationship between the F-pure threshold and the log canonical threshold of quasi-homogeneous polynomials, linking it to the height of associated formal groups and providing examples where this relationship does not hold.

## Contribution

It establishes a criterion connecting the F-pure threshold and the log canonical threshold via the height of the Artin-Mazur formal group for certain hypersurfaces.

## Key findings

- F-pure threshold equals log canonical threshold iff the formal group height is 1.
- Similar results hold for Fermat hypersurfaces with degree > N+1.
- Examples show other F-pure threshold values are not characterized by height.

## Abstract

We consider a quasi-homogeneous polynomial $f \in \mathbb{Z}[x_0, \ldots, x_N]$ of degree $w$ equal to the degree of $x_0 \cdots x_N$ and show that the $F$-pure threshold of the reduction $f_p \in \mathbb{F}_p[x_0, \ldots, x_N]$ is equal to the log canonical threshold if and only if the height of the Artin-Mazur formal group associated to $H^{N-1}\left( X, {\mathbb{G}}_{m,X} \right)$, where $X$ is the hypersurface given by $f$, is equal to 1. We also prove that a similar result holds for Fermat hypersurfaces of degree $>N+1$. Furthermore, we give examples of weighted Delsarte surfaces which show that other values of the $F$-pure threshold of a quasi-homogeneous polynomial of degree $w$ cannot be characterized by the height.

## Full text

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## References

21 references — full list in the complete paper: https://tomesphere.com/paper/1702.07553/full.md

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Source: https://tomesphere.com/paper/1702.07553