MATHEMATICAL SUPPORT FOR MAKING DECISIONS IN CONDITIONS OF INDEFINITY BY MEANS OF TIES BETWEEN THE ATTRIBUTES OF DECISIONS OF MATRIXAL GAMES AND THE PRINCIPLE OF DOMINATION
The ties between solutions of two matrixal games if the lines and the columns of matrixes of these games the demands of domination are satisfied are analysed. There are five theorems developed by the authors. The author sets an example how to find a solution of a matrixal game using attributes of decisions of the matrixal games, with ties between decisions and successive simplification of this game.