Mahler Formula for Self Maps on the N-dimensional Projective Space
نویسنده
چکیده
The Mahler formula gives an expression for the height of an algebraic number, as the integral of the log of the minimal equation with respect to the Haar measure on the circle. In the present work we prove that a similar result holds for nice self maps on the n-dimensional projective space. The height of the number is replaced by the canonical height of a hypersurface, and the Haar measure is replaced by the canonical invariant measure.
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