Type: Article
Publication Date: 1973-01-01
Citations: 28
DOI: https://doi.org/10.3792/pja/1195519291
Introduction.In this paper we shall introduce the oscillatory integral o the orm 0--[[e-'p(, x)dxd or C-unction p(, x)o class (defined in Section 1), and by using this integral study the algebra o pseudo-differential operators o2 class S?.,., 0=<3=<p=<1, 31, whose basic weight function 2 2(x, ) varies even in x and may increase in polynomial order.*) The Friedrichs part P o the operator P o class S,,. will be defined as in .Then, the Lboundedness or the operator P o class S.,. for /p, can be proved by using Pr and the Calderon-Vaillancourt theorem in [1]. We have to note that all the results obtained there hold even for operator-valued symbols as in Grushin [3].