Remarks on the unimodular Fourier multipliers on \(\alpha \)-modulation spaces (Q403227)

In the paper under review, the authors study boundedness properties of the Fourier multiplier operator \(\exp (i \mu(D))\) on \(\alpha\)-modulation spaces \(M^{s,\alpha}_{p,q}\) and Besov spaces \(B^s_{p,q}\), where the \(\alpha\)-modulation spaces are given by NEWLINE\[NEWLINE M^{s,\alpha}_{p,q}(\mathbb R^n)=\left\{ f \in S^\prime(\mathbb R^n): \|f | M^{s,\alpha}_{p,q}(\mathbb R^n) \|= \left( \sum_{k \in \mathbb Z^n} \langle k \rangle^{sq/(1-\alpha)} \| F^{-1} \eta^\alpha_k F f \|_p^q \right)^{1/q}<\infty \right\} NEWLINE\]NEWLINE and \(\{\eta^\alpha_k\}_{k \in \mathbb Z^n}\) is a smooth decomposition of unity of Schwartz functions. They give improved conditions for the boundedness of Fourier multipliers with compact support and for the boundedness of \(\exp(i \mu(D))\) on the space \(M^{s, \alpha}_{p,q}\). The authors also obtain necessary and sufficient conditions for the boundedness of \(\exp(i \phi(|D|))\) between \(M^{s_1, \alpha}_{p_1,q_1}\) and \(M^{s_2, \alpha}_{p_2,q_2}\) when \(\phi\) satisfies a certain size condition and is radial.