Hasse–Witt matrix
In mathematics, the Hasse–Witt matrix H of a non-singular algebraic curve C over a finite field F is the matrix of the Frobenius mapping (p-th power mapping where F has q elements, q a power of the prime number p) with respect to a basis for the differentials of the first kind. It is a g × g matrix where C has genus g. The rank of the Hasse–Witt matrix is the Hasse or Hasse–Witt invariant.
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Cartier-Manin operatorCartier operatorCartier–Manin operatorErnst WittFormal group lawH-matrixHasse-Witt matrixHasse invariantHasse invariant of an elliptic curveHelmut HasseHodge–de Rham spectral sequenceList of things named after Ernst WittManin-Cartier operatorP-rank of an abelian varietyPierre Cartier (mathematician)Supersingular abelian varietiesSupersingular elliptic curveSuperspecial curveTate moduleTheta characteristicYuri Manin
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Hasse–Witt matrix
In mathematics, the Hasse–Witt matrix H of a non-singular algebraic curve C over a finite field F is the matrix of the Frobenius mapping (p-th power mapping where F has q elements, q a power of the prime number p) with respect to a basis for the differentials of the first kind. It is a g × g matrix where C has genus g. The rank of the Hasse–Witt matrix is the Hasse or Hasse–Witt invariant.
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In mathematics, the Hasse–Witt ...... Hasse or Hasse–Witt invariant.
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In mathematics, the Hasse–Witt ...... Hasse or Hasse–Witt invariant.
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Hasse–Witt matrix
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