Ashish Shrivastava and C. Pandu Ranga, Indian Institute of Technology - Madras, India

We consider a variant of socially stable marriage problem where preference lists may be incomplete, may contain ties and may have bounded length. In real world application like NRMP and Scottish medical matching scheme such restrictions arise very frequently where set of agents (man/woman) is very large and providing a complete and strict order preference list is practically in-feasible. In presence of ties in preference lists, the most common solution is weakly socially stable matching. It is a fact that in an instance, weakly stable matching can have different sizes. This motivates the problem of finding a maximum cardinality weakly ocially stable matching. In this paper, we find maximum size weakly socially stable matching for an instance of Stable Marriage problem with Ties and Incomplete bounded length preference list with Social Stability. The motivation to consider this instance is the known fact, any larger instance of this problem is NP-hard.

Stable Marriage Problem, Socially Stable Matching, Bipartite Matching, Stable Marriage Problem with Ties and Incomplete list.