Problem definition: Unconstrained Set Multicover. The problem is a generalization of Set Cover. An instance is specified by a weighted Set Cover instance, along with an integer demand $d_ e\gt 0$d_ e\gt 0 for every element $e$e. A fractional multicover $x$x assigns a weight (multiplicity) $x_ s$x_ s to each set $s$s such that, for every element $e$e, the total weight assigned to sets containing $e$e is at least $d_ e$d_ e. If each multiplicity $x_ s$x_ s is an integer, then $x$x is called just a multicover. The goal is to find a multicover of minimum cost, $c\cdot x = \sum _ s c_ s x_ s$c\cdot x = \sum _ s c_ s x_ s.

The name “Set Multicover” conventionally refers to the variant of the above problem with the added constraint that each set can be taken at most once ($\forall s. x_ s\le 1$\forall s. x_ s\le 1). Sometimes, this variant is called “constrained” Set Multicover  [1, Ch.13].