q-variational H\"ormander functional calculus and Schr\"odinger and wave maximal estimates

Abstract

This article is the continuation of the work [DK] where we had proved maximal estimates \|t > 0 |m(tA)f| \|Lp(,Y) ≤ C \|f\|Lp(,Y) for sectorial operators A acting on Lp(,Y) (Y being a UMD lattice) and admitting a H\"ormander functional calculus(a strengthening of the holomorphic H∞ calculus to symbols m differentiable on (0,∞) in a quantified manner), and m : (0, ∞) C being a H\"ormander class symbol with certain decay at ∞.In the present article, we show that under the same conditions as above, the scalar function t m(tA)f(x,ω) is of finite q-variation with q > 2, a.e. (x,ω).This extends recent works by [BMSW,HHL,HoMa1,HoMa,JSW,LMX] who have considered among others m(tA) = e-tA the semigroup generated by -A.As a consequence, we extend estimates for spherical means in euclidean space from [JSW] to the case of UMD lattice-valued spaces.A second main result yields a maximal estimate \|t > 0 |m(tA) ft| \|Lp(,Y) ≤ C \|ft\|Lp(,Y(β)) for the same A and similar conditions on m as above but with ft depending itself on t such that t ft(x,ω) belongs to a Sobolev space β over (R+, dtt).We apply this to show a maximal estimate of the Schr\"odinger (case A = -) or wave (case A = -) solution propagator t (itA)f.Then we deduce from it variants of Carleson's problem of pointwise convergence [Car]\[ (itA)f(x,ω) f(x,ω) a. e. (x,ω) (t 0+)\]for A a Fourier multiplier operator or a differential operator on an open domain ⊂eq Rd with boundary conditions.

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