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On the Finiteness of the CrissCross Method
 European Journal of Operations Research
, 1989
"... . In this short paper, we prove the finiteness of the crisscross method by showing a certain binary number of bounded digits associated with each iteration increases monotonically. This new proof immediately suggests the possibility of relaxing the pivoting selection in the crisscross method witho ..."
Abstract

Cited by 6 (2 self)
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. In this short paper, we prove the finiteness of the crisscross method by showing a certain binary number of bounded digits associated with each iteration increases monotonically. This new proof immediately suggests the possibility of relaxing the pivoting selection in the crisscross method without sacrificing the finiteness. Key Words: linear programming. simplex method, finite pivoting rules. 1 The CrissCross Method Let A be an m2 n matrix. Let E be the index set of columns of the matrix A; and f; g be two distinct members of E: Here we consider the standard form linear program: (P ) maximize x f (1.1) subject to A x = 0; (1.2) x g = 1; (1.3) x j 0; 8 j 2 E 0 ff; gg: (1.4) A vector x is said to be feasible if it satisfies the constraints (1.2), (1.3), and (1.4). If a linear program has a feasible solution, then it is called feasible, otherwise it is called infeasible. For any linear program, we will refer to following three situations as characters: 3 Supported by Grant...