Strong and flexible domain typing for dynamic E-business
Yigal Hoffner, Simon Field, et al.
EDOC 2004
Two-step mixed integer rounding (MIR) inequalities are valid inequalities derived from a facet of a simple mixed integer set with three variables and one constraint. In this paper we investigate how to effectively use these inequalities as cutting planes for general mixed integer problems. We study the separation problem for single-constraint sets and show that it can be solved in polynomial time when the resulting inequality is required to be sufficiently different from the associated MIR inequalities. We discuss computational issues and present numerical results based on a number of data sets. © 2010 INFORMS.
Yigal Hoffner, Simon Field, et al.
EDOC 2004
Marshall W. Bern, Howard J. Karloff, et al.
Theoretical Computer Science
Michael C. McCord, Violetta Cavalli-Sforza
ACL 2007
Sabine Deligne, Ellen Eide, et al.
INTERSPEECH - Eurospeech 2001