Add to ORKGABSTRACT. We prove a recent conjecture of Duchêne and Rigo, stating that every complementary pair of homogeneous Beatty sequences represents the solution to an invariant impartial game. Here invariance means that each available move in a game can be played anywhere inside the game-board. In fact, we establish such a result for a wider class of pairs of complementary sequences, and in the process generalize the notion of a subtraction game. Given a pair of complementary sequences (an) and (bn) of positive integers, we define a game G by setting {{an, bn}} as invariant moves. We then introduce the invariant game G⋆, whose moves are all non-zero P-positions of G. Provided the set of non-zero P-positions of G ⋆ equals {{an, bn}}, this is the de...
In the context of 2-player removal games, we define the notion of invariant game for which each allo...
AbstractAn invariant subtraction game is a 2-player impartial game defined by a set of invariant mov...
We characterize pairs of complementary non-homogeneous Beatty sequences $(A_n)_{n>0}$ and $(B_n)_{n>...
We prove a recent conjecture of Duchene and Rigo, stating that every complementary pair of homogeneo...
We prove a recent conjecture of Duchene and Rigo, stating that every complementary pair of homogeneo...
We study 2-player impartial games, so called \emph{invariant subtraction games}, of the type, given ...
We study 2-player impartial games, so called \emph{invariant subtraction games}, of the type, given...
International audienceDuchêne and Rigo introduced the notion of invariance for take-away games on he...
22 pages, 2 figuresInternational audienceWe characterize all the pairs of complementary non-homogeno...
22 pages, 2 figuresInternational audienceWe characterize all the pairs of complementary non-homogeno...
AbstractIn the context of 2-player removal games, we define the notion of invariant game for which e...
22 pages, 2 figuresInternational audienceWe characterize all the pairs of complementary non-homogeno...
In the context of 2-player removal games, we define the notion of invariant game for which each allo...
International audienceIn the context of 2-player removal games, we define the notion of invariant ga...
The aim of this talk is to introduce some notions arising in combinatorial game theory and make the ...
In the context of 2-player removal games, we define the notion of invariant game for which each allo...
AbstractAn invariant subtraction game is a 2-player impartial game defined by a set of invariant mov...
We characterize pairs of complementary non-homogeneous Beatty sequences $(A_n)_{n>0}$ and $(B_n)_{n>...
We prove a recent conjecture of Duchene and Rigo, stating that every complementary pair of homogeneo...
We prove a recent conjecture of Duchene and Rigo, stating that every complementary pair of homogeneo...
We study 2-player impartial games, so called \emph{invariant subtraction games}, of the type, given ...
We study 2-player impartial games, so called \emph{invariant subtraction games}, of the type, given...
International audienceDuchêne and Rigo introduced the notion of invariance for take-away games on he...
22 pages, 2 figuresInternational audienceWe characterize all the pairs of complementary non-homogeno...
22 pages, 2 figuresInternational audienceWe characterize all the pairs of complementary non-homogeno...
AbstractIn the context of 2-player removal games, we define the notion of invariant game for which e...
22 pages, 2 figuresInternational audienceWe characterize all the pairs of complementary non-homogeno...
In the context of 2-player removal games, we define the notion of invariant game for which each allo...
International audienceIn the context of 2-player removal games, we define the notion of invariant ga...
The aim of this talk is to introduce some notions arising in combinatorial game theory and make the ...
In the context of 2-player removal games, we define the notion of invariant game for which each allo...
AbstractAn invariant subtraction game is a 2-player impartial game defined by a set of invariant mov...
We characterize pairs of complementary non-homogeneous Beatty sequences $(A_n)_{n>0}$ and $(B_n)_{n>...