AbstractIn this paper, we establish an improved variable coefficient version of the square function inequality, by which the local smoothing estimate {L^{p}_{\alpha}\to L^{p}} for the Fourier integral operators satisfying cinematic curvature condition is further improved.
In particular, we establish almost sharp results for {2<p\leqslant 3} and push forward the estimate for the critical point {p=4}.
As a consequence, the local smoothing estimate for the wave equation on the manifold is refined.
We generalize the results in [S. Lee and A. Vargas, On the cone multiplier in \mathbb{R}^{3}, J. Funct. Anal. 263 2012, 4, 925–940;
J. Lee, A trilinear approach to square function and local smoothing estimates for the wave operator, preprint 2018, https://arxiv.org/abs/1607.08426v5]
to its variable coefficient counterpart.
The main ingredients in the argument includes multilinear oscillatory integral estimate
[J. Bennett, A. Carbery and T. Tao,
On the multilinear restriction and Kakeya conjectures,
Acta Math. 196 2006, 2, 261–302]
and decoupling inequality
[D. Beltran, J. Hickman and C. D. Sogge,
Variable coefficient Wolff-type inequalities and sharp local smoothing estimates for wave equations on manifolds,
Anal. PDE 13 2020, 2, 403–433].
Variable coefficient Wolff-type inequalities and sharp local smoothing estimates for wave equations on manifolds
