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- Siegel–Weil_formula abstract "In mathematics, the Siegel–Weil formula, introduced by Weil (1964, 1965) as an extension of the results of Siegel (1951, 1952), expresses an Eisenstein series as a weighted average of theta series of lattices in a genus, where the weights are proportional to the inverse of the order of the automorphism group of the lattice.For the constant terms this is essentially the Smith–Minkowski–Siegel mass formula.".
- Siegel–Weil_formula wikiPageID "35198018".
- Siegel–Weil_formula wikiPageRevisionID "573339335".
- Siegel–Weil_formula authorlink "André Weil".
- Siegel–Weil_formula authorlink "Carl Ludwig Siegel".
- Siegel–Weil_formula last "Siegel".
- Siegel–Weil_formula last "Weil".
- Siegel–Weil_formula year "1951".
- Siegel–Weil_formula year "1952".
- Siegel–Weil_formula year "1964".
- Siegel–Weil_formula year "1965".
- Siegel–Weil_formula subject Category:Number_theory.
- Siegel–Weil_formula comment "In mathematics, the Siegel–Weil formula, introduced by Weil (1964, 1965) as an extension of the results of Siegel (1951, 1952), expresses an Eisenstein series as a weighted average of theta series of lattices in a genus, where the weights are proportional to the inverse of the order of the automorphism group of the lattice.For the constant terms this is essentially the Smith–Minkowski–Siegel mass formula.".
- Siegel–Weil_formula label "Formule van Siegel-Weil".
- Siegel–Weil_formula label "Siegel–Weil formula".
- Siegel–Weil_formula sameAs Siegel%E2%80%93Weil_formula.
- Siegel–Weil_formula sameAs Formule_van_Siegel-Weil.
- Siegel–Weil_formula sameAs Q7510576.
- Siegel–Weil_formula sameAs Q7510576.
- Siegel–Weil_formula wasDerivedFrom Siegel–Weil_formula?oldid=573339335.