Mapping properties of pseudodifferential and Fourier operators (Q6043660)

The author studies the boundedness of the pseudo-differential operators on the function spaces introduced in his classical bookl [Theory of function spaces. Basel-Boston-Stuttgart: Birkhäuser Verlag (1983; Zbl 0546.46027)] and subsequent new editions. The pseudo-differential operators are initially considered in the standard Hörmander form with symbol in the classes of the so-called \(\rho\)-\(\delta\)-type. Under the assumption \(\rho=1\), the author proves boundedness by using an interesting wavelet decomposition. The result improves several preceding contributions in the literature. As a second type of operators, called Fourier operators in the paper, the author considers the composition of the Hörmander class with the inverse Fourier transform. In this framework, a precise result is obtained about asymptotics of eigenvalues for compact operators.