Global Wellposedness of a Class of Weakly Hyperbolic Cauchy Problems with Variable Multiplicities on Rd

Abstract

We study a class of weakly hyperbolic Cauchy problems on Rd, involving linear operators with characteristics of variable multiplicities, whose coefficients are unbounded in the space variable. The behaviour in the time variable is governed by a suitable "shape function". We develop a parameter-dependent symbolic calculus, corresponding to an appropriate subdivision of the phase space. By means of such calculus, a parametrix can be constructed, in terms of (generalized) Fourier integral operators naturally associated with the employed symbol class. Further, employing the parametrix, we prove S(Rd)-wellposedness and give results about the global decay and regularity of the solution, within a scale of weighted Sobolev space.