Energy Structure of Optimal Positional Strategies in Mean Payoff Games

Abstract

This note studies structural aspects concerning Optimal Positional Strategies (OPSs) in Mean Payoff Games (MPGs), it is a contribution to understanding the relationship between OPSs in MPGs and Small Energy-Progress Measures (SEPMs) in reweighted Energy Games (EGs). Firstly, it is observed that the space of all OPSs, optM0, admits a unique complete decomposition in terms of so-called extremal-SEPMs in reweighted EGs; this points out what we called the "Energy-Lattice X* of optM0". Secondly, it is offered a pseudo-polynomial total-time recursive procedure for enumerating (w/o repetitions) all the elements of X*, and for computing the corresponding partitioning of optM0. It is observed that the corresponding recursion tree defines an additional lattice B*, whose elements are certain subgames '⊂eq that we call basic subgames. The extremal-SEPMs of a given coincide with the least-SEPMs of the basic subgames of ; so, X* is the energy-lattice comprising all and only the least-SEPMs of the basic subgames of . The complexity of the proposed enumeration for both B* and X* is O(|V|3|E|W |B*|) total time and O(|V||E|)+(|E| B*|) working space. Finally, it is constructed an for which |B*| > |X*|, this proves that B* and X* are not isomorphic.