论文信息 - Time-Frequency Analysis and PDE's

Time-Frequency Analysis and PDE's

We study the action on modulation spaces of Fourier multipliers with symbols $e^{imu(xi)}$, for real-valued functions $mu$ having unbounded second derivatives. We show that if $mu$ satisfies the usual symbol estimates of order $alphageq2$, or if $mu$ is a positively homogeneous function of degree $alpha$, the corresponding Fourier multiplier is bounded as an operator between the weighted modulation spaces $mathcal{M}^{p,q}_delta$ and $mathcal{M}^{p,q}$, for every $1leq p,qleqinfty$ and $deltageq d(alpha-2)|frac{1}{p}-frac{1}{2}|$. Here $delta$ represents the loss of derivatives. The above threshold is shown to be sharp for {it all} homogeneous functions $mu$ whose Hessian matrix is non-degenerate at some point.

Anita Tabacco

[1] The dilation property of modulation spaces and their inclusion relation with Besov spaces , 2006, math/0606176.

[2] E. Cordero,et al. Some new Strichartz estimates for the Schrödinger equation , 2007, 0707.4584.

[3] Boundedness of Fourier integral operators on modulation spaces , 2008 .

[4] H. Feichtinger. Modulation Spaces on Locally Compact Abelian Groups , 2003 .

[5] L. Rodino,et al. Time-Frequency Analysis of Fourier Integral Operators , 2007, 0710.3652.

[6] Unimodular Fourier multipliers for modulation spaces , 2006, math/0609097.

[7] Baoxiang Wang,et al. Frequency-uniform decomposition method for the generalized BO, KdV and NLS equations , 2007 .

[8] K. Okoudjou,et al. Local well‐posedness of nonlinear dispersive equations on modulation spaces , 2007, 0704.0833.