Parametrix for wave equations on a rough background I: regularity of the phase at initial time

Abstract

This is the first of a sequence of four papers param1, param2, param3, param4 dedicated to the construction and the control of a parametrix to the homogeneous wave equation g φ=0, where g is a rough metric satisfying the Einstein vacuum equations. Controlling such a parametrix as well as its error term when one only assumes L2 bounds on the curvature tensor R of g is a major step of the proof of the bounded L2 curvature conjecture proposed in Kl:2000, and solved jointly with S. Klainerman and I. Rodnianski in boundedl2. On a more general level, this sequence of papers deals with the control of the eikonal equation on a rough background, and with the derivation of L2 bounds for Fourier integral operators on manifolds with rough phases and symbols, and as such is also of independent interest.