Microlocal regularity of nonlinear PDE in quasi-homogeneous Fourier Lebesgue spaces
Abstract
We study the continuity in weighted Fourier Lebesgue spaces for a class of pseudodifferential operators, whose symbol has finite Fourier Lebesgue regularity with respect to x and satisfies a quasi-homogeneous decay of derivatives with respect to the variable. Applications to Fourier Lebesgue microlocal regularity of linear and nonlinear partial differential equations are given.
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