Mean value formulas for classical solutions to subelliptic evolution equations in stratified Lie groups

Abstract

We prove mean value formulas for classical solutions to second order linear differential equations in the form ∂t u = Σi,j=1m Xi (aij Xj u) + X0 u + f, where A = (aij)i,j=1, …,m is a bounded, symmetric and uniformly positive matrix with C1 coefficients under the assumption that the operator Σj=1m Xj2 + X0 - ∂t is hypoelliptic and the vector fields X1, …, Xm and Xm+1 :=X0 - ∂t are invariant with respect to a suitable homogeneous Lie group. Our results apply e.g. to degenerate Kolmogorov operators and parabolic equations on Carnot groups ∂t u = Σi,j=1m Xi (aij Xj u) + f.