Power maps and subvarieties of the complex algebraic n--torus
Abstract
Given a subvariety V of the complex algebraic torus G mn defined by polynomials of total degree at most d and a power map φ: G mn G mn, the points x whose forward orbits Oφ( x) belong to V form its stable subvariety S(V,φ). The main result of the paper provides an upper bound T=T(n,d,φ) for the number of iterations of the power map φ required to ``cut off'' the points of V that do not belong to S.
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