Let k be a field. We study infinite strictly descending sequences A0⊃A1⊃⋯ of rings where each Ai is a polynomial ring in two variables over k, the aim being to describe those sequences satisfying the property that their intersection is different from k . We give a complete answer in characteristic zero, and partial results in arbitrary characteristic. We apply those results to the study of dominant morphisms A2→An and their factorizations, where n∈{1,2} and An is the affine n-space over k.