Elena Cordero, Gianluca Giacchi, Luigi Rodino, Mario Valenzano
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引用次数: 0
摘要
我们研究了 I 型和 II 型傅里叶积分算子的维格纳核的衰变特性。考虑的相位是所谓的驯服相位,它们出现在薛定谔传播者中。相关的规范变换允许是非线性的。这些变换的非线性是在赫曼德类(S^{0}_{0,0}({\mathbb {R}^{2d}})\) 中提取符号时实现良好内核定位的主要障碍。在这里,我们证明舒宾类克服了这一问题,并允许一个很好的内核定位,它随着阶数 m 的减小而改善。
Wigner analysis of fourier integral operators with symbols in the Shubin classes
We study the decay properties of Wigner kernels for Fourier integral operators of types I and II. The symbol spaces that allow a nice decay of these kernels are the Shubin classes \(\Gamma ^m({\mathbb {R}^{2d}})\), with negative order m. The phases considered are the so-called tame ones, which appear in the Schrödinger propagators. The related canonical transformations are allowed to be nonlinear. It is the nonlinearity of these transformations that are the main obstacles for nice kernel localizations when symbols are taken in the Hörmander’s class \(S^{0}_{0,0}({\mathbb {R}^{2d}})\). Here we prove that Shubin classes overcome this problem and allow a nice kernel localization, which improves with the decreasing of the order m.