学术文献库

A natural procedure for assigning students to classes in the beginning of the school-year is to let each student write down a list of $d$ other students with whom she/he wants to be in the same class (typically $d=3$). The teachers then gather all the lists and try to assign the students to classes in a way that each student is assigned to the same class with at least one student from her/his list. We refer to such partitions as friendly. In realistic scenarios, the teachers may also consider other constraints when picking the friendly partition: e.g. there may be a group of students whom the teachers wish to avoid assigning to the same class; alternatively, there may be two close friends whom the teachers want to put together; etc. Inspired by such challenges, we explore questions concerning the expressiveness of friendly partitions. For example: Does there always exist a friendly partition? More generally, how many friendly partitions are there? Can every student $u$ be separated from any other student $v$? Does there exist a student $u$ that can be separated from any other student $v$? We show that when $d\geq 3$ there always exist at least $2$ friendly partitions and when $d\geq 15$ there always exists a student $u$ which can be separated from any other student $v$. The question regarding separability of each pair of students is left open, but we give a positive answer under the additional assumption that each student appears in at most roughly $\exp(d)$ lists. We further suggest several open questions and present some preliminary findings towards resolving them.