Lp-estimates for the 2D wave equation in the scaling-critical magnetic field

Abstract

In this paper, we study the Lp-estimates for the solution to the 2D-wave equation with a scaling-critical magnetic potential. Inspired by the work of FZZ, we show that the operators (I+LA)-γeitLA is bounded in Lp(R2) for 1<p<+∞ when γ>|1/p-1/2| and t>0, where LA is a magnetic Schr\"odinger operator. In particular, we derive the Lp-bounds for the sine wave propagator (tLA)L-12A. The key ingredients are the construction of the kernel function and the proof of the pointwise estimate for an analytic operator family fw,t(LA).

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