Geomorphology of Lagrangian ridges

Abstract

We prove an "h-principle without pre-conditions" for the elimination of tangencies of a Lagrangian submanifold with respect to a Lagrangian distribution. The main result states that such tangencies can always be completely removed at the cost of allowing the Lagrangian to develop certain non-smooth points, called Lagrangian ridges, modeled on the corner \p=|q|\ ⊂ R2 together with its products and stabilizations. This result plays an essential role in the arborealization program.