Gelfand-Shilov Smoothing Effect for the Radially Symmetric Spatially Homogeneous Landau Equation under the Hard Potential $\gamma=2$
DOI:
https://doi.org/10.4208/jpde.v35.n1.2Keywords:
Gelfand-Shilov smoothing effect, spectral decomposition, Landau equation, hard potential $\gamma=2.$Abstract
Based on the spectral decomposition for the linear and nonlinear radially symmetric homogeneous non-cutoff Landau operators under the hard potential $\gamma=2$ in perturbation framework, we prove the existence and Gelfand-Shilov smoothing effect for solution to the Cauchy problem of the symmetric homogenous Landau equation with small initial datum.