English

Multipliers spaces and pseudo-differential operators

Analysis of PDEs 2007-05-23 v1

Abstract

Let σ(x,ξ)\sigma(x,\xi) be a sufficiently regular function defined on Rd×Rd.R^d \times R^d. The pseudo-differential operator with symbol σ\sigma is defined on the Schwartz class by the formula: fσf(x)=Rdσ(x,ξ)f^(ξ)e2πixξdξ,f\to\sigma f(x)=\int_{R^d} \sigma(x,\xi) \hat{f}(\xi)e^{2\pi ix\xi}d\xi, where f^(ξ)=Rdf(x)e2πixξdx\hat{f}(\xi)=\int_{R^d} f(x)e^{-2\pi ix\xi}dx is the Fourier transform of f.f. In this paper, we shall consider the regularity of the following type : \begin{description} \item[(a)] ξασ(x,ξ)Aα(1+ξ)α,| \partial_{\xi}^{\alpha}\sigma(x,\xi) | \leq A_{\alpha}(1+| \xi|) ^{-| \alpha|}, \item[(b)] ξασ(x+y,ξ)ξασ(x,ξ)Aαω(y)(1+ξ)α,| \partial_{\xi}^{\alpha}\sigma(x+y,\xi) -\partial_{\xi}^{\alpha}\sigma(x,\xi) | \leq A_{\alpha}\omega(| y|) (1+| \xi|) ^{-| \alpha|}, \end{description} %

Keywords

Cite

@article{arxiv.math/0505021,
  title  = {Multipliers spaces and pseudo-differential operators},
  author = {Sadek Gala},
  journal= {arXiv preprint arXiv:math/0505021},
  year   = {2007}
}