People can chose up to 5 of 25 lectures in advance. All these lectures are given on one day in five rooms at five time slots. Each (preferred) lecture a listener can attend to makes her a bit happier, each lecture he chose but can't attend to (because another preferred lecture is in the same time slot) makes him a bit unhappier. The list of preferred lectures is not weighted (at least the registrants have not been told to order their preferences, but if it makes things easier I could assume that the first choice has the highest priority and so on, that information is available).
Is there a way to maximize the overall happiness or an approximation without trying every single possible schedule? I've found an empty stub for the hospitals/residents problem on wikipedia which pretty much sounds like a similar problem(?)
The hospitals/residents problem — also known as the college admissions problem — differs from the stable marriage problem in that the "women" can accept "proposals" from more than one "man" (e.g., a hospital can take multiple residents, or a college can take an incoming class of more than one student). Algorithms to solve the hospitals/residents problem can be hospital-oriented (female-optimal) or resident-oriented (male-optimal).