- Weil reciprocity law
In
mathematics , the Weil reciprocity law is a result ofAndré Weil holding in thefunction field "K"("C") of analgebraic curve "C" over analgebraically closed field "K". Given functions "f" and "g" in "K"("C"), i.e. rational functions on "C", then:"f"(("g")) = "g"(("f"))
where the notation has this meaning: ("h") is the divisor of the function "h", or in other words the
formal sum of its zeroes and poles counted withmultiplicity ); and a function applied to a formal sum means the product (with multiplicities, poles counting as a negative multiplicity) of the values of the function at the points of the divisor. With this definition there must be the side-condition, that the divisors of "f" and "g" have disjoint support (which can be removed).In the case of the
projective line , this can be proved by manipulations with theresultant of polynomials.To remove the condition of disjoint support, for each point "P" on "C" a "local symbol"
:("f", "g")"P"
is defined, in such a way that the statement given is equivalent to saying that the product over all "P" of the local symbols is 1. When "f" and "g" both take the values 0 or ∞ at "P", the definition is essentially in limiting or
removable singularity terms, by considering (up to sign):"f""a""g""b"
with "a" and "b" such that the function has neither a zero nor a pole at "P". This is achieved by taking "a" to be the multiplicity of "g" at "P", and −"b" the multiplicity of "f" at "P". The definition is then
::("f", "g")"P" = (−1)"ab" "f""a""g""b".
See for example
Jean-Pierre Serre , "Groupes algébriques et corps de classes", pp.44-46, for this as a special case of a theory on mapping algebraic curves into commutative groups.There is a generalisation of
Serge Lang toabelian varieties (Lang, "Abelian Varieties").References
*André Weil, "Oeuvres Scientifiques I", p. 291 (in "Lettre à Artin", a 1942 letter to Artin, explaining the 1940 "Comptes Rendus" note "Sur les fonctions algébriques à corps de constantes finis")
*Phillip Griffiths and Joseph Harris, "Principles of Algebraic Geometry", pp.242-3 for a proof in theRiemann surface case
*E. Arbarello, C. de Concini, V.G. Kac, The infinite wedge representation and the reciprocity law for algebraic curves, Proc. Symp. Pure Math., vol. 49 Part I, 1989
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