# An improved maximal inequality for 2D fractional order Schrödinger operators

Changxing Miao; Jianwei Yang; Jiqiang Zheng

Studia Mathematica (2015)

- Volume: 230, Issue: 2, page 121-165
- ISSN: 0039-3223

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topChangxing Miao, Jianwei Yang, and Jiqiang Zheng. "An improved maximal inequality for 2D fractional order Schrödinger operators." Studia Mathematica 230.2 (2015): 121-165. <http://eudml.org/doc/285425>.

@article{ChangxingMiao2015,

abstract = {The local maximal operator for the Schrödinger operators of order α > 1 is shown to be bounded from $H^\{s\}(ℝ²)$ to L² for any s > 3/8. This improves the previous result of Sjölin on the regularity of solutions to fractional order Schrödinger equations. Our method is inspired by Bourgain’s argument in the case of α = 2. The extension from α = 2 to general α > 1 faces three essential obstacles: the lack of Lee’s reduction lemma, the absence of the algebraic structure of the symbol and the inapplicable Galilean transformation in the deduction of the main theorem. We get around these difficulties by establishing a new reduction lemma and analyzing all the possibilities in using the separation of the segments to obtain the analogous bilinear L²-estimates. To compensate for the absence of Galilean invariance, we resort to Taylor’s expansion for the phase function. The Bourgain-Guth inequality (2011) is also generalized to dominate the solution of fractional order Schrödinger equations.},

author = {Changxing Miao, Jianwei Yang, Jiqiang Zheng},

journal = {Studia Mathematica},

keywords = {local maximal inequality; fractional order Schrödinger operators; multilinear restriction estimate; Fourier transform; induction on scales; localization argument; oscillatory integral operator},

language = {eng},

number = {2},

pages = {121-165},

title = {An improved maximal inequality for 2D fractional order Schrödinger operators},

url = {http://eudml.org/doc/285425},

volume = {230},

year = {2015},

}

TY - JOUR

AU - Changxing Miao

AU - Jianwei Yang

AU - Jiqiang Zheng

TI - An improved maximal inequality for 2D fractional order Schrödinger operators

JO - Studia Mathematica

PY - 2015

VL - 230

IS - 2

SP - 121

EP - 165

AB - The local maximal operator for the Schrödinger operators of order α > 1 is shown to be bounded from $H^{s}(ℝ²)$ to L² for any s > 3/8. This improves the previous result of Sjölin on the regularity of solutions to fractional order Schrödinger equations. Our method is inspired by Bourgain’s argument in the case of α = 2. The extension from α = 2 to general α > 1 faces three essential obstacles: the lack of Lee’s reduction lemma, the absence of the algebraic structure of the symbol and the inapplicable Galilean transformation in the deduction of the main theorem. We get around these difficulties by establishing a new reduction lemma and analyzing all the possibilities in using the separation of the segments to obtain the analogous bilinear L²-estimates. To compensate for the absence of Galilean invariance, we resort to Taylor’s expansion for the phase function. The Bourgain-Guth inequality (2011) is also generalized to dominate the solution of fractional order Schrödinger equations.

LA - eng

KW - local maximal inequality; fractional order Schrödinger operators; multilinear restriction estimate; Fourier transform; induction on scales; localization argument; oscillatory integral operator

UR - http://eudml.org/doc/285425

ER -

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