Enforce and selective operators of combinatorial games

We consider an {\em enforce operator} on impartial rulesets similar to the Muller Twist and the comply/constrain operator of Smith and St\u anic\u a, 2002. Applied to the rulesets $A$ and $B$, on each turn the opponent enforces one of the rulesets and the current player complies, by playing a move in that ruleset. If the outcome table of the enforce variation of $A$ and $B$ is the same as the outcome table of $A$, then we say that $A$ dominates $B$. We find necessary and sufficient conditions for this relation. Additionally, we define a {\em selective operator} and explore a distributive-lattice-like structure within applicable rulesets. Lastly, we define the nim-value of rulesets under the enforce operator and establish well-known properties for impartial games.