Variation of the canonical height in a family of rational maps
Abstract
Let d 2 be an integer, let c(t) be any rational map, and let ft(z) := (zd+t)/z be a family of rational maps indexed by t. For each algebraic number t, we let hft(c(t)) be the canonical height of c(t) with respect to the rational map ft. We prove that the map H(t):=hft(c(t)) (as t varies among the algebraic numbers) is a Weil height.
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