Rainbow Solutions to the Sidon Equation in Cyclic Groups
Abstract
Given a coloring of group elements, a rainbow solution to an equation is a solution whose every element is assigned a different color. The rainbow number of Zn for an equation eq, denoted rb(Zn,eq), is the smallest number of colors r such that every exact r-coloring of Zn admits a rainbow solution to the equation eq. We prove that for every exact 4-coloring of Zp, where p≥ 3 is prime, there exists a rainbow solution to the Sidon equation x1+x2=x3+x4. Furthermore, we determine the rainbow number of Zn for the Sidon equation.
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