AbstractWeakly completely mixed bimatrix games are defined to be games with a completely mixed Nash component. For these games this component turns out to consist of only one point, which is isolated. Special classes of these games are completely mixed matrix and bimatrix games, the first introduced by Kaplansky, the latter by Raghavan. We give a characterization of these games, which can be used for completely mixed matrix games also. Given a completely mixed strategy pair, we are able to construct a (weakly) completely mixed bimatrix game having this pair as an equilibrium. We derive interesting results for the case where the payoff matrices have a nonnegative and irreducible inverse
We study the pure equilibrium set for a specific symmetric finite game in strategic form, referred t...
We study the problem of checking for the existence of constrained pure Nash equilibria in a subclass...
We study strong Nash equilibria in mixed strategies in finite games. A Nash equilibrium is strong if...
Weakly completely mixed bimatrix games are defined to be games with a completely mixed Nash componen...
AbstractWeakly completely mixed bimatrix games are defined to be games with a completely mixed Nash ...
AbstractA two-person non-zero-sum bimatrix game (A, B) is defined to be completely mixed if every so...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
In the literature several refinements of the Nash equilibrium concept have been introduced. Among th...
Abstract In the article the task of finding the most preferred mixed strategies in finite sc...
In this thesis I investigate the solution concept of Nash equilibrium. This thesis is composed of th...
Since the seminal paper of Nash (1950) game theoretic literature has focused mostly on equilibrium a...
AbstractAny non-singular M-matrix is a completely mixed matrix game with positive value. We exploit ...
AbstractIn this note, we present a linear-time algorithm for determining pure-strategy equilibrium p...
A formula is presented for computing the equilibrium payoffs in a generic finite two-person game whe...
We study the pure equilibrium set for a specific symmetric finite game in strategic form, referred t...
We study the problem of checking for the existence of constrained pure Nash equilibria in a subclass...
We study strong Nash equilibria in mixed strategies in finite games. A Nash equilibrium is strong if...
Weakly completely mixed bimatrix games are defined to be games with a completely mixed Nash componen...
AbstractWeakly completely mixed bimatrix games are defined to be games with a completely mixed Nash ...
AbstractA two-person non-zero-sum bimatrix game (A, B) is defined to be completely mixed if every so...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
Starting from the definition of a bimatrix game, we restrict the pair of strategy sets jointly, not ...
In the literature several refinements of the Nash equilibrium concept have been introduced. Among th...
Abstract In the article the task of finding the most preferred mixed strategies in finite sc...
In this thesis I investigate the solution concept of Nash equilibrium. This thesis is composed of th...
Since the seminal paper of Nash (1950) game theoretic literature has focused mostly on equilibrium a...
AbstractAny non-singular M-matrix is a completely mixed matrix game with positive value. We exploit ...
AbstractIn this note, we present a linear-time algorithm for determining pure-strategy equilibrium p...
A formula is presented for computing the equilibrium payoffs in a generic finite two-person game whe...
We study the pure equilibrium set for a specific symmetric finite game in strategic form, referred t...
We study the problem of checking for the existence of constrained pure Nash equilibria in a subclass...
We study strong Nash equilibria in mixed strategies in finite games. A Nash equilibrium is strong if...