Spectral Properties of Hypoelliptic Operators

Abstract

We study hypoelliptic operators with polynomially bounded coefficients that are of the form K = sumi=1m XiT Xi + X0 + f, where the Xj denote first order differential operators, f is a function with at most polynomial growth, and XiT denotes the formal adjoint of Xi in L2. For any e > 0 we show that an inequality of the form |u|delta,delta <= C(|u|0,eps + |(K+iy)u|0,0) holds for suitable delta and C which are independent of y in R, in weighted Sobolev spaces (the first index is the derivative, and the second the growth). We apply this result to the Fokker-Planck operator for an anharmonic chain of oscillators coupled to two heat baths. Using a method of Herau and Nier [HN02], we conclude that its spectrum lies in a cusp x+iy|x >= |y|tau-c, tau in (0,1], c in R.

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