Smoothing effect for third order operators with variable coefficients
Abstract
In this work we study the smoothing effect of some variable coefficient operators of the form Dt-A, where A is a Weyl-quantized pseudo-differential operator of order m=2,3. The class under consideration includes, among others, KdV-type and ultrahyperbolic Schr\"odinger operators. We prove homogeneous and inhomogeneous smoothing estimates and use them to get well-posedness results for some NLIVPs with derivative nonlinearities. Finally, we investigate the so called non-trapping property of the bicharacteristic curves of the principal symbol of our operators.
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