About: Weber's theorem

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In mathematics, Weber's theorem, named after Heinrich Martin Weber, is a result on algebraic curves. It states the following. Consider two non-singular curves C and C′ having the same genus g > 1. If there is a rational correspondence φ between C and C′, then φ is a birational transformation.

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dbo:abstract	In mathematics, Weber's theorem, named after Heinrich Martin Weber, is a result on algebraic curves. It states the following. Consider two non-singular curves C and C′ having the same genus g > 1. If there is a rational correspondence φ between C and C′, then φ is a birational transformation. (en) Inom matematiken är Webers sats, uppkallad efter Heinrich Weber, ett resultat om . Satsen lyder: Betrakta två icke-singulära kurvor C och C′ med samma genus g > 1. Om det finns en rationell φ mellan C och C′, då är φ en . (sv)
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dbp:title	Weber's Theorem (en)
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rdfs:comment	In mathematics, Weber's theorem, named after Heinrich Martin Weber, is a result on algebraic curves. It states the following. Consider two non-singular curves C and C′ having the same genus g > 1. If there is a rational correspondence φ between C and C′, then φ is a birational transformation. (en) Inom matematiken är Webers sats, uppkallad efter Heinrich Weber, ett resultat om . Satsen lyder: Betrakta två icke-singulära kurvor C och C′ med samma genus g > 1. Om det finns en rationell φ mellan C och C′, då är φ en . (sv)
rdfs:label	Weber's theorem (en) Webers sats (sv)
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