A fractal local smoothing problem for the wave equation
Abstract
For any given set E⊂ [1,2], we discuss a fractal frequency-localized version of the Lp local smoothing estimates for the half-wave propagator with times in E. A conjecture is formulated in terms of a quantity involving the Assouad spectrum of E and the Legendre transform. We validate the conjecture for radial functions. We also prove a similar result for fractal-time L2 Lq and square function bounds, for arbitrary L2 functions and general time sets. We formulate a conjecture for Lp Lq generalizations.
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