Uniform constants in Hausdorff-Young inequalities for the Cantor group model of the scattering transform (Q2880651)

Hausdorff-Young type inequalities for the Dirac scattering transform or the \(SU(1,1)\) nonlinear Fourier transform have been established by \textit{M. Christ} and \textit{A. Kiselev} [J. Funct. Anal. 179, No. 2, 426--447 (2001; Zbl 0985.34078)]. In [Nonlinearity 16, 219--246 (2003; Zbl 1035.34097)], \textit{C. Muscalu, T. Tao} and \textit{C. Thiele} raised the question whether the constants appearing in these inequalities can be chosen uniformly in \(p\in[1,2)\). The author proves this conjecture for the Cantor group model (the real line is replaced by the positive semiaxis and the exponentials by the Cantor group character function) and for the nonlinear Fourier transform of integrable compactly supported functions.