The standard Penney's game is played by two players. Player $A$ chooses a sequence of $k>2$ bits and $B$ (seeing $A$'s selection) chooses a different sequence of $k$ bits. A fair coin is flipped repeatedly; whichever player's sequence appears first in the (long) sequence of random coin flips is the winner.
Paradoxically, no matter what sequence $A$ chooses, $B$ can choose a different sequence that is more likely to appear before $A$'s. For instance, for $k=3$, if $A$ chooses $HHH$, then $B$ should choose $THH$. In $1/8$ games, the $HHH$ will appear as the first three coin tosses and $A$ will win; in all other games $B$ will win because before $HHH$ can appear, $B$'s sequence $THH$ must appear. If instead $A$ chose $THH$, then $B$ should choose $TTH$, which is more likely to appear first. Here are some simulations illustrating the effect:
- $HHH\underline{TTH}TTTTHHTTT$: B wins
- $H\underline{TTH}TTHTHHTHHTT$: B wins
- $H\underline{TTH}THHHHHHTHTT$: B wins
- $H\underline{TTH}THHTTHTHHHT$: B wins
- $HHHTT\underline{TTH}THHTHTH$: B wins
- $TTTTTT\underline{THH}THHTTH$: A wins
- $\underline{TTH}TTTHTHTHHHTH$: B wins
- $HH\underline{TTH}TTTTTHHTTT$: B wins
- $HHHHHHH\underline{THH}TTHHT$: A wins
- $\underline{TTH}TTTHHHHTHTHT$: B wins
- $\underline{THH}HTHTTTTHTHHT$: A wins
- $TH\underline{THH}TTTHTTHTTH$: A wins
And so on. Thus the available sequences exhibit non-transitive dominance: $\alpha_1 > \alpha_2 > \ldots > \alpha_1$, where the $\alpha_i$ are distinct $k$-bit sequences and "$>$" means "is more likely to appear first in a sequence randomly generated by a fair coin."
In short, if $B$ plays optimally, he is guaranteed (in probability) to win most the games.
Let's call that traditional Penney game a one-level game, because only one sequence match is needed for termination.
Consider a two-level generalization, in which $A$ first chooses two different $k$-bit sequences and $B$ (seeing $A$'s choices) chooses two different sequences (not already chosen by $A$). The game proceeds as before, with random coin flips, but now the winner is the first to have both his chosen sequences appear, in either order and at any separation. (Allow overlaps of sequences.)
Question
Is there an optimal strategy for $B$ such that he is guaranteed (in probability) to win most two-level Penney games?
