Hypoellipticity and Higher Order Gaussian Bounds
Abstract
Let (M,,μ) be a metric measure space satisfying a doubling condition, p0∈ (1,∞), and T(t):Lp0(M,μ)→ Lp0(M,μ), t≥ 0, a strongly continuous semi-group. We provide sufficient conditions under which T(t) is given by integration against an integral kernel satisfying higher-order Gaussian bounds of the form \[ | Kt(x,y) | ≤ C ( -c ( (x,y)2t )12-1 ) μ( B(x,(x,y)+t1/2) )-1, \] where B denotes the metric ball. We also provide conditions for similar bounds on ``derivatives'' of Kt(x,y) and our results are localizable. If A is the generator of T(t) the main hypothesis is that ∂t -A and ∂t-A* satisfy a hypoelliptic estimate at every scale, uniformly in the scale. We present applications to subelliptic PDEs.
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