Carvalho, AldaSantos, Carlos Pereira dos2026-01-292026-01-2920230166-218Xhttp://hdl.handle.net/10400.2/21086polychromatic nim is a version of the classic game nim, played with colored stones, in which each pile has stones of a single color, and the player who successfully extinguishes a color wins the game. This game is closely related to the concept of short rule, the ending condition that states that a disjunctive sum ends as soon as any one of the components ends. Here, we discuss that rule, namely when applied to impartial games, and prove that the Grundy-values of polychromatic nim present an arithmetic-periodic behavior.engCombinatorial game theoryDisjunctive short sumImpartial gamesSprague–Grundy theoryArithmetic periodicityPolychromatic nimjournal article10.1016/j.dam.2022.09.018