Hoelder Continuity of Weak Solutions to Subelliptic Equations with Rough Coefficients

We study interior regularity of weak solutions of second order linear divergence form equations with degenerate ellipticity and rough coefficients. In particular, we show that solutions of large classes of subelliptic equations with bounded measurable coefficients are Hoelder continuous. We present two types of results dealing with such equations. The first type generalizes the celebrated Fefferman-Phong geometric characterization of subellipticity in the smooth case. We introduce a notion of $L^q$-subellipticity for the rough case and develop an axiomatic method which provides a near characterization of the notion of $L^q$-subellipticity. The second type deals with generalizing a case of Hoermanders's celebrated algebraic characterization of subellipticity for sums of squares of real analytic vector fields. In this case, we introduce a "e;flag condition"e; as a substitute for the Hoermander commutator condition which turns out to be equivalent to it in the smooth case. The question of regularity for quasilinear subelliptic equations with smooth coefficients provides motivation for our study, and we briefly indicate some applications in this direction, including degenerate Monge-Ampere equations.