Title of article
Solving the Convex Cost Integer Dual Network Flow Problem
Author/Authors
Ahuja، Ravindra K. نويسنده , , Hochbaum، Dorit S. نويسنده , , Orlin، James B. نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
-94
From page
95
To page
0
Abstract
This paper presents a formal theory of subjective rationality and demonstrates its application to corporate strategy. An agent is said to be subjectively rational when decisions are consistent with the available facts and, where these are lacking, with the agentʹs own subjective assessments. A self-confirming equilibrium arises when agentsʹ subjectively rational actions generate events that are consistent with their own expectations. Equilibrium strategies may be suboptimal because certain counterfactual beliefs may be erroneous and yet fail to be contradicted by events observed in equilibrium. This weakening of the stronger rationality assumptions inherent in many of the more familiar equilibrium ideas appears well suited to applications in strategy. In particular, performance advantage may be sustained by a firm when its subjectively rational competitors persistently employ suboptimal self-confirming strategies.
Keywords
Minimum Cost Flow , Convex Cost Flow , Lagrangian Relaxation , Scaling Algorithm , duality theory , integer programming
Journal title
Management Science
Serial Year
2003
Journal title
Management Science
Record number
81853
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