Estimates on the number of rational solutions of Markoff-Hurwitz equations over finite fields
Abstract
Let N denote the number of solutions to the generalized Markoff-Hurwitz-type equation \[(a1X1m+·s + anXnm+a)k=bX1·s Xn \] over the finite field Fq, where m,k are positive integers, and a,b,ai∈ Fq* for i=1,…, n, with k,m 2 and n 3. Using techniques from algebraic geometry, we provide an estimate for N and establish conditions under which the equation admits solutions where all Xi are nonzero.
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