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Main Authors: Kanai, Takumi, Muramatsu, Ryo, Sugiyama, Yuusuke
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2602.17406
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author Kanai, Takumi
Muramatsu, Ryo
Sugiyama, Yuusuke
author_facet Kanai, Takumi
Muramatsu, Ryo
Sugiyama, Yuusuke
contents In this paper, we characterize the wave front sets of solutions to fractional Schrödinger equations \(i\partial_{t}u =(-Δ)^{θ/2}u + V(x)u\) with $0<θ<2$ via the wave packet transform (short-time Fourier transform). We clarify the relationship between the order \(θ\) of the fractional Laplacian and the growth rate of the potential in the problem of propagation of singularities. In particular, we present a theorem that bridges the propagation mechanisms of singularities for the Schrödinger and wave equations.
format Preprint
id arxiv_https___arxiv_org_abs_2602_17406
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Wave front set of solutions to the fractional Schrödinger equation
Kanai, Takumi
Muramatsu, Ryo
Sugiyama, Yuusuke
Analysis of PDEs
Mathematical Physics
In this paper, we characterize the wave front sets of solutions to fractional Schrödinger equations \(i\partial_{t}u =(-Δ)^{θ/2}u + V(x)u\) with $0<θ<2$ via the wave packet transform (short-time Fourier transform). We clarify the relationship between the order \(θ\) of the fractional Laplacian and the growth rate of the potential in the problem of propagation of singularities. In particular, we present a theorem that bridges the propagation mechanisms of singularities for the Schrödinger and wave equations.
title Wave front set of solutions to the fractional Schrödinger equation
topic Analysis of PDEs
Mathematical Physics
url https://arxiv.org/abs/2602.17406