Log Enriques surfaces of index 7 and type $A_{15}$

Shingo Taki

arXiv:1808.03751·math.AG·August 22, 2018·1 cites

Log Enriques surfaces of index 7 and type $A_{15}$

Shingo Taki

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TL;DR

This paper proves the uniqueness of a specific class of algebraic surfaces, called log Enriques surfaces, with index 7 and type A_{15}, establishing a precise classification result.

Contribution

The paper demonstrates that there exists exactly one log Enriques surface with index 7 and type A_{15}, providing a complete classification for this case.

Findings

01

Only one such surface exists.

02

The classification is complete for index 7, type A_{15}.

03

The result advances understanding of log Enriques surfaces.

Abstract

We show that there is only one log Enriques surface of index 7 and type $A_{15}$ .

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Commutative Algebra and Its Applications · Polynomial and algebraic computation