Impartial achievement and avoidance games for generating finite groups

Abstract: Abstract. We study two impartial games introduced by Anderson and Harary and further developed by Barnes. Both games are played by two players who alternately select previously unselected elements of a finite group. The first player who builds a generating set from the jointly selected elements wins the first game. The first player who cannot select an element without building a generating set loses the second game. After the development of some general results, we determine the nim-numbers of these games for … Show more

“…We now give a more precise description of the achievement game GEN(G) played on a finite group G. We also recall some definitions and results from [9]. In this paper, the cyclic group of order n is denoted by Z n .…”

“…The set M of maximal subgroups play a significant role in the game. The last two authors define in [9] be the the smallest element of J containing P . We write P, g 1 , .…”

“…where P, Q ∈ X I with |P | even and |Q| odd. This is well-defined by [9,Proposition 4.4]. We define the option type of X I to be the set otype(X I ) := {type(X J ) | X J ∈ Opt(X I )}.…”

“…We use the following result of [9] as our main tool to compute nim-numbers. Note that type(X G ) = (|G| mod 2, 0, 0).…”

“…As in the case of the achievement game, Barnes [3] determines the outcome for a few standard families of groups, as well as a general condition to determine the player with the winning strategy. The determination of the nimnumbers for the avoidance game for several families of groups appears in [4,5,9]. Similar algebraic games are studied by Brandenburg in [7].…”

Impartial achievement games for generating nilpotent groups

“…We now give a more precise description of the achievement game GEN(G) played on a finite group G. We also recall some definitions and results from [9]. In this paper, the cyclic group of order n is denoted by Z n .…”

“…The set M of maximal subgroups play a significant role in the game. The last two authors define in [9] be the the smallest element of J containing P . We write P, g 1 , .…”

“…where P, Q ∈ X I with |P | even and |Q| odd. This is well-defined by [9,Proposition 4.4]. We define the option type of X I to be the set otype(X I ) := {type(X J ) | X J ∈ Opt(X I )}.…”

“…We use the following result of [9] as our main tool to compute nim-numbers. Note that type(X G ) = (|G| mod 2, 0, 0).…”

“…As in the case of the achievement game, Barnes [3] determines the outcome for a few standard families of groups, as well as a general condition to determine the player with the winning strategy. The determination of the nimnumbers for the avoidance game for several families of groups appears in [4,5,9]. Similar algebraic games are studied by Brandenburg in [7].…”

Impartial achievement games for generating nilpotent groups

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