Occurrence of gap for one-dimensional scalar autonomous functionals with one end point condition

Abstract

Let L: R× R [0, +∞[\,\+∞\ be a Borel function. We consider the problem equationP F(y)=∫01L(y(t), y'(t))\,dt: y(0)=0,\, y∈ W1,1([0,1], R).equation We give an example of a real valued Lagrangian L for which the Lavrentiev phenomenon occurs. We state a condition, involving only the behavior of L on the graph of two functions, that ensures the non-occurrence of the phenomenon. Our criterium weakens substantially the well-known condition, that L is bounded on bounded sets.