The orbit intersection problem in positive characteristic

Abstract

In this paper, we study the orbit intersection problem for the linear space and the algebraic group in positive characteristic. Let K be an algebraically closed field of positive characteristic and let 1, 2: Kd Kd be affine maps, i( x) = Ai ( x) + xi (where each Ai is a d× d matrix and x∈ Kd). If none of the eigenvalues of the matrices Ai are roots of unity and each ai ∈ Kd is not i-preperiodic, then we prove that the set \(n1, n2) ∈ 2 1n1( a1) = 2n2( a2)\ is p-normal in Z2 of order at most d. Further, let 1, 2: Gmd Gmd be regular self-maps and a1, a2∈ Gmd(K). Let 10 and 20 be group endomorphisms of Gmd and y, z ∈ Gmd(K) such that 1( x) = 10( x) + y and 2( x) = 20( x) + z. We show, under some conditions on the roots of the minimal polynomial of 10 and 20, that the set \(n1, n2) ∈ 02 1n1( a1) = 2n2( a2)\ (where a1, a2∈ Gmd(K)) is a finite union of singletons and one-parameter linear families. To do so, we use results on linear equations over multiplicative groups in positive characteristic and some results on systems of polynomial-exponential equations.