{"title":"Fields of moduli and the arithmetic of tame quotient singularities","authors":"Giulio Bresciani, Angelo Vistoli","doi":"10.1112/s0010437x2400705x","DOIUrl":null,"url":null,"abstract":"<p>Given a perfect field <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline1.png\"><span data-mathjax-type=\"texmath\"><span>$k$</span></span></img></span></span> with algebraic closure <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline2.png\"><span data-mathjax-type=\"texmath\"><span>$\\overline {k}$</span></span></img></span></span> and a variety <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline3.png\"><span data-mathjax-type=\"texmath\"><span>$X$</span></span></img></span></span> over <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline4.png\"><span data-mathjax-type=\"texmath\"><span>$\\overline {k}$</span></span></img></span></span>, the field of moduli of <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline5.png\"><span data-mathjax-type=\"texmath\"><span>$X$</span></span></img></span></span> is the subfield of <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline6.png\"><span data-mathjax-type=\"texmath\"><span>$\\overline {k}$</span></span></img></span></span> of elements fixed by field automorphisms <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline7.png\"><span data-mathjax-type=\"texmath\"><span>$\\gamma \\in \\operatorname {Gal}(\\overline {k}/k)$</span></span></img></span></span> such that the Galois conjugate <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline8.png\"><span data-mathjax-type=\"texmath\"><span>$X_{\\gamma }$</span></span></img></span></span> is isomorphic to <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline9.png\"><span data-mathjax-type=\"texmath\"><span>$X$</span></span></img></span></span>. The field of moduli is contained in all subextensions <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline10.png\"><span data-mathjax-type=\"texmath\"><span>$k\\subset k'\\subset \\overline {k}$</span></span></img></span></span> such that <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline11.png\"><span data-mathjax-type=\"texmath\"><span>$X$</span></span></img></span></span> descends to <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline12.png\"><span data-mathjax-type=\"texmath\"><span>$k'$</span></span></img></span></span>. In this paper, we extend the formalism and define the field of moduli when <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline13.png\"><span data-mathjax-type=\"texmath\"><span>$k$</span></span></img></span></span> is not perfect. Furthermore, Dèbes and Emsalem identified a condition that ensures that a smooth curve is defined over its field of moduli, and prove that a smooth curve with a marked point is always defined over its field of moduli. Our main theorem is a generalization of these results that applies to higher-dimensional varieties, and to varieties with additional structures. In order to apply this, we study the problem of when a rational point of a variety with quotient singularities lifts to a resolution. As a consequence, we prove that a variety <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline14.png\"><span data-mathjax-type=\"texmath\"><span>$X$</span></span></img></span></span> of dimension <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline15.png\"><span data-mathjax-type=\"texmath\"><span>$d$</span></span></img></span></span> with a smooth marked point <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline16.png\"><span data-mathjax-type=\"texmath\"><span>$p$</span></span></img></span></span> such that <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline17.png\"><span data-mathjax-type=\"texmath\"><span>$\\operatorname {Aut}(X,p)$</span></span></img></span></span> is finite, étale and of degree prime to <span><span><img data-mimesubtype=\"png\" data-type=\"\" src=\"https://static.cambridge.org/binary/version/id/urn:cambridge.org:id:binary:20240326174202036-0722:S0010437X2400705X:S0010437X2400705X_inline18.png\"/><span data-mathjax-type=\"texmath\"><span>$d!$</span></span></span></span> is defined over its field of moduli.</p>","PeriodicalId":55232,"journal":{"name":"Compositio Mathematica","volume":"158 1","pages":""},"PeriodicalIF":1.3000,"publicationDate":"2024-03-27","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Compositio Mathematica","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1112/s0010437x2400705x","RegionNum":1,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q1","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0
Abstract
Given a perfect field $k$ with algebraic closure $\overline {k}$ and a variety $X$ over $\overline {k}$, the field of moduli of $X$ is the subfield of $\overline {k}$ of elements fixed by field automorphisms $\gamma \in \operatorname {Gal}(\overline {k}/k)$ such that the Galois conjugate $X_{\gamma }$ is isomorphic to $X$. The field of moduli is contained in all subextensions $k\subset k'\subset \overline {k}$ such that $X$ descends to $k'$. In this paper, we extend the formalism and define the field of moduli when $k$ is not perfect. Furthermore, Dèbes and Emsalem identified a condition that ensures that a smooth curve is defined over its field of moduli, and prove that a smooth curve with a marked point is always defined over its field of moduli. Our main theorem is a generalization of these results that applies to higher-dimensional varieties, and to varieties with additional structures. In order to apply this, we study the problem of when a rational point of a variety with quotient singularities lifts to a resolution. As a consequence, we prove that a variety $X$ of dimension $d$ with a smooth marked point $p$ such that $\operatorname {Aut}(X,p)$ is finite, étale and of degree prime to $d!$ is defined over its field of moduli.
期刊介绍:
Compositio Mathematica is a prestigious, well-established journal publishing first-class research papers that traditionally focus on the mainstream of pure mathematics. Compositio Mathematica has a broad scope which includes the fields of algebra, number theory, topology, algebraic and differential geometry and global analysis. Papers on other topics are welcome if they are of broad interest. All contributions are required to meet high standards of quality and originality. The Journal has an international editorial board reflected in the journal content.
$k$ with algebraic closure 
$\overline {k}$ and a variety 
$X$ over 
$\overline {k}$, the field of moduli of 
$X$ is the subfield of 
$\overline {k}$ of elements fixed by field automorphisms 
$\gamma \in \operatorname {Gal}(\overline {k}/k)$ such that the Galois conjugate 
$X_{\gamma }$ is isomorphic to 
$X$. The field of moduli is contained in all subextensions 
$k\subset k'\subset \overline {k}$ such that 
$X$ descends to 
$k'$. In this paper, we extend the formalism and define the field of moduli when 
$k$ is not perfect. Furthermore, Dèbes and Emsalem identified a condition that ensures that a smooth curve is defined over its field of moduli, and prove that a smooth curve with a marked point is always defined over its field of moduli. Our main theorem is a generalization of these results that applies to higher-dimensional varieties, and to varieties with additional structures. In order to apply this, we study the problem of when a rational point of a variety with quotient singularities lifts to a resolution. As a consequence, we prove that a variety 
$X$ of dimension 
$d$ with a smooth marked point 
$p$ such that 
$\operatorname {Aut}(X,p)$ is finite, étale and of degree prime to 
$d!$ is defined over its field of moduli.
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