On 4-order Schrödinger operator and Beam operator

Dan LI; Junfeng LI

doi:10.1007/s11464-019-0804-6

Front. Math. China ›› 2019, Vol. 14 ›› Issue (6) : 1197 -1211. DOI: 10.1007/s11464-019-0804-6

RESEARCH ARTICLE

On 4-order Schrödinger operator and Beam operator

Dan LI ¹^,^†
, Junfeng LI ²

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Abstract

We show that there is no localization for the 4-order Schrödinger operator $S t, 4 f$ and Beam operator $B t f$ , more precisely, on the one hand, we show that the 4-order Schrödinger operator $S t, 4 f$ does not converge pointwise to zero as $t → 0$ provided $f ∈ H s (ℝ)$ with compact support and 0<s<1/4 by constructing a counterexample in $ℝ$ . On the other hand, we show that the Beam operator Btf also has the same property with the 4-order Schrödinger operator $S t, 4 f$ . Hence, we find that the Hausdorff dimension of the divergence set for $S t, 4 f$ and $B t f$ is $α 1, S 4 (s) = α 1, B (s) = 1$ as 0<s<1/4.

Keywords

4-Order Schrödinger operator / Beam operator / localization / Sobolev space

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Dan LI, Junfeng LI. On 4-order Schrödinger operator and Beam operator. Front. Math. China, 2019, 14(6): 1197-1211 DOI:10.1007/s11464-019-0804-6

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References

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[1]	Bourgain J. Some new estimates on oscillatory integrals. In: Fefferman C, Fefferman R, Wainger S, eds. Essays on Fourier Analysis in Honor of Elias M. Stein. Princeton Math Ser, Vol 42. Princeton: Princeton Univ Press, 1995, 83–112

[2]	Bourgain J. On the Schrödinger maximal function in higher dimension. Proc Steklov Inst Math, 2013, 280(1): 46–60

[3]	Bourgain J. A note on the Schrödinger maximal function. J Anal Math, 2016, 130: 393–396

[4]	Carleson L. Some analytic problems related to statistical mechanics. In: Benedetto J J, ed. Euclidean Harmonic Analysis. Lecture Notes in Math, Vol 779. Berlin: Springer, 1980, 5–45

[5]	Dahlberg B E J, Kenig C E. A note on the almost everywhere behavior of solutions to the Schrödinger equation. In: Ricci F, Weiss G, eds. Harmonic Analysis. Lecture Notes in Math, Vol 908. Berlin: Springer, 1982, 205–209

[6]	Demeter C, Guo S. Schrödinger maximal function estimates via the pseudoconformal transformation. arXiv: 1608.07640

[7]	Du X, Guth L, Li X. A sharp Schrödinger maximal estimate in ℝ2 Ann of Math (2), 2017, 186(2): 607–640

[8]	Du X, Guth L, Li X, Zhang R. Pointwise convergence of Schrödinger solutions and multilinear refined Strichartz estimates. Forum Math Sigma, 2018, 6: e14 (18 pp)

[9]	Du X, Zhang R. Sharp L2 estimate of Schrödinger maximal function in higher dimensions. arXiv: 1805.02775

[10]	Lee S. On pointwise convergence of the solutions to Schrödinger equations in R2: Int Math Res Not IMRN, 2006, Art ID 32597 (21 pp)

[11]	Luca R, Rogers K. An improved necessary condition for the Schrödinger maximal estimate. arXiv: 1506.05325

[12]	Miao C, Yang J, Zheng J. An improved maximal inequality for 2D fractional order Schrödinger operators. Studia Math, 2015, 230(2): 121–165

[13]	Moyua A, Vargas A, Vega L. Schrödinger maximal function and restriction properties of the Fourier transform. Int Math Res Not IMRN, 1996, (16): 793–815

[14]	Niu Y. The Application of Harmonic Analysis in Estimate for Solutions to Generalized Dispersive Equation. Ph D Thesis. Beijing: Beijing Normal University, 2015

[15]	Sjolin P. Regularity of solutions to the Schrödinger equation. Duke Math J, 1987, 55(3): 699–715

[16]	Sjölin P. Nonlocalization of operators of Schrödinger type. Ann Acad Sci Fenn Math, 2013, 38(1): 141–147

[17]	Sjölin P. On localization of Schrödinger means. arXiv: 1704.00927

[18]	Tao T, Vargas A. A bilinear approach to cone multipliers. II. Applications. Geom Funct Anal, 2000, 10(1): 216–258

[19]	Vega L. E1 Multiplicador de Schrödinger, la Function Maximal y los Operadores de Restriccion. Ph D Thesis. Madrid: Departamento de Matematicas, Univ Autonoma de Madrid, 1988