Rational sieve: Difference between revisions

Latest revision as of 17:20, 14 March 2013

In mathematics, a quadratic differential on a Riemann surface is a section of the symmetric square of the holomorphic cotangent bundle. If the section is holomorphic, then the quadratic differential is said to be holomorphic. The vector space of holomorphic quadratic differentials on a Riemann surface has a natural interpretation as the cotangent space to the Riemann moduli space or Teichmueller space.

Local form

Each quadratic differential on a domain $U$ in the complex plane may be written as $f(z)dz\otimes dz$ where $z$ is the complex variable and $f$ is a complex valued function on $U$ . Such a `local' quadratic differential is holomorphic if and only if $f$ is holomorphic. Given a chart $\mu$ for a general Riemann surface $R$ and a quadratic differential $q$ on $R$ , the pull-back $(\mu ^{-1})^{*}(q)$ defines a quadratic differential on a domain in the complex plane.

Relation to abelian differentials

If $\omega$ is an abelian differential on a Riemann surface, then $\omega \otimes \omega$ is a quadratic differential.

Singular Euclidean structure

A holomorphic quadratic differential $q$ determines a Riemannian metric $|q|$ on the complement of its zeroes. If $q$ is defined on a domain in the complex plane and $q=f(z)dz\otimes dz$ , then the associated Riemannian metric is $|f(z)|(dx^{2}+dy^{2})$ where $z=x+iy$ . Since $f$ is holomorphic, the curvature of this metric is zero. Thus, a holomorphic quadratic differential defines a flat metric on the complement of the set of $z$ such that $f(z)=0$ .

References

Kurt Strebel, Quadratic differentials. Ergebnisse der Mathematik und ihrer Grenzgebiete (3), 5. Springer-Verlag, Berlin, 1984. xii+184 pp. ISBN 3-540-13035-7

Y. Imayoshi and M. Taniguchi, M. An introduction to Teichmüller spaces. Translated and revised from the Japanese version by the authors. Springer-Verlag, Tokyo, 1992. xiv+279 pp. ISBN 4-431-70088-9

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+In [[mathematics]], a '''quadratic differential''' on a [[Riemann surface]] is a section of the [[symmetric square]] of the holomorphic [[cotangent bundle]].
+If the section is holomorphic, then the quadratic differential
+is said to be holomorphic. The vector space of holomorphic quadratic differentials on a Riemann surface
+has a natural interpretation as the cotangent space to the Riemann moduli space or [[Teichmueller space]].
+==Local form==
+Each quadratic differential on a domain <math> U </math> in the [[complex plane]] may be written as
+<math> f(z) dz \otimes dz </math>  where <math> z </math> is the complex variable and
+<math> f</math> is a complex valued function on <math> U </math>.
+Such a `local'  quadratic differential is holomorphic if and only if <math> f</math> is [[holomorphic]].
+Given a chart <math> \mu </math> for a general Riemann surface <math> R</math>
+and a quadratic differential <math> q </math> on <math>R</math>, the [[pull-back]]
+<math> (\mu^{-1})^*(q)</math>  defines a quadratic differential on a domain in the complex plane.
+==Relation to abelian differentials==
+If <math> \omega </math> is an [[abelian differential]] on a Riemann surface,
+then <math> \omega \otimes \omega </math> is a quadratic differential.
+==Singular Euclidean structure==
+A holomorphic quadratic differential <math>q</math> determines a [[Riemannian metric]] <math>|q|</math> on
+the complement of its zeroes. If <math>q</math> is defined on a domain in the complex plane
+and <math> q = f(z) dz \otimes dz </math>, then the associated Riemannian metric is
+<math> |f(z)| (dx^2 + dy^2) </math> where <math>z=x + i y </math>.
+Since <math>f</math>  is holomorphic, the [[curvature]] of this metric is zero.  Thus,
+a holomorphic quadratic differential defines a flat metric on the complement of the
+set of <math> z </math> such that <math> f(z)=0 </math>.
+==References==
+* Kurt Strebel, ''Quadratic differentials''. Ergebnisse der Mathematik und ihrer Grenzgebiete (3), 5. Springer-Verlag, Berlin, 1984. xii+184 pp. ISBN 3-540-13035-7
+* Y. Imayoshi and M. Taniguchi, M. ''An introduction to Teichmüller spaces''. Translated and revised from the Japanese version by the authors. Springer-Verlag, Tokyo, 1992. xiv+279 pp. ISBN 4-431-70088-9
+[[Category:Complex manifolds]]

Rational sieve: Difference between revisions

Latest revision as of 17:20, 14 March 2013

Contents

Local form

Relation to abelian differentials

Singular Euclidean structure

References

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Rational sieve: Difference between revisions

Latest revision as of 17:20, 14 March 2013

Local form

Relation to abelian differentials

Singular Euclidean structure

References

Navigation menu

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