In this note, we consider a maximal operator $\sup_{t \in
\mathbb{R}}|u(x,t)| = \sup_{t \in \mathbb{R}}|e^{it\Omega(D)}f(x)|$,
where $u$ is the solution to the initial value problem $u_t =
i\Omega(D)u$, $u(0) = f$ for a $C^2$ function $\Omega$ with some
growth rate at infinity. We prove that the operator $\sup_{t \in
\mathbb{R}}|u(x,t)|$ has a mapping property from a fractional
Sobolev space $H^\frac14$ with additional angular regularity to
$L_{loc}^2$

Cho, Yonggeun

Lee, Sanghyuk

Shim, Yongsun

In this note, we consider a maximal operator supt2R ju(x; t)j = supt2R jeit­(D)f(x)j, where u is the solution to the initial value problem ut = i­(D)u, u(0) = f for a C2 function ­ with some growth rate at in¯nity. We prove that the operator supt2R ju(x; t)j has a mapping property from a fractional Sobolev space H 1 4 with additional angular regularity to L2 loc

Hokkaido University Collection of Scholarly and Academic Papers

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A maximal inequality associated to Schr\{o}dinger type equation.

EPrint Series of Department of Mathematics, Hokkaido University

https://eprints.lib.hokudai.ac.jp/dspace/bitstream/2115/69490/1/pre685.pdf

A maximal inequality associated to Schr\{o}dinger type equation.

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Hokkaido University Collection of Scholarly and Academic Papers

EPrint Series of Department of Mathematics, Hokkaido University