The group of divisibility of an integral domain is the multiplicative group of nonzero principal fractional ideals of the domain and is a partially ordered group under reverse inclusion. We study the group of divisibility of a finite intersection of valuation overrings of polynomial rings in at most three variables and we classify all semilocal lattice-ordered groups which are realizable over \(k[x_{1}, x_{2},..., x_{n}]\) for \(n\leq 3\).

group of divisibility, valuation domain, Bézout domain, lattice-ordered group