Sparse domination of Fourier integral operators (Theory of function spaces and related topics)

[1] R.M. Beals, LP boundedness of Fourier integral operators, Mem. Amer. Math. Soc. 38 (1982), no.

264, viii+57 pp.

[2] F. Bernicot, D. Frey and S. Petermichl, Sharp weighted norm estimates beyond Calder6n-Zygmund

theory, Anal. PDE 9 (2016), no. 5, 1079-1113

[3] D. Beltran and L. Cladek, Sparse bounds for pseudodifferential operators, arXiv:1711.02339v2.

[4] J.M. Conde-Alonso, A. Culiuc, F.Di. Plinio and Y. Ou, A sparse domination principle for rough

singular integrals, Anal. PDE 10 (2017), no. 5, 1255-1284.

[5] 0. Elong and A. Senoussaoui, On the LP-boundedness of a class of semiclassical Fourier integral

operators, Mat. Vesnik 70 (2018), no. 3, 189-203.

[6] L. Hormander Fourier integral operators. I. Acta Math. 127 (1971), no. 1-2, 79-183.

[7] T.P. Hytiinen, M.T. Lacey and C. Perez Sharp weighted bounds for the q-variation of singular integrals. Bull. Lond. Math. Soc. 45 (2013), no. 3, 529-540.

[8] K. Asada, On the L 2 Boundedness of Fourier Integral Operators in Rn, Kodai Math. J. 7 (1984),

no. 2, 248-272.

[9] M.T. Lacey and A.D. Mena, The sparse Tl theorem, Houston J. Math. 43 (2017), no. 1, 111-127.

[10] M.T. Lacey, A.D. Mena and M.C. Reguera Sparse bounds for Bochner-Riesz multipliers, J. Fourier

Anal. Appl. 25 (2019), no. 2, 523-537.

[11] J.C. Peral, LP estimates for the wave equation, J. Funct. Anal. 36 (1980), no. 1, 114-145.

[12] C. Perez, Two weighted inequalities for potential and fractional type maximal operators. Indiana

Univ. Math. J. 43 (1994), no. 2, 663-683.

[13] E.M. Stein, Harmonic analysis: real-variable methods, orthogonality, and oscillatory integrals, With

the assistance of Timothy S. Murphy. Princeton Mathematical Series, 43. Monographs in Harmonic

Analysis, III.

[14] A. Seeger, C.D. Sogge and E.M. Stein, Regularity properties of Fourier integral operators, Ann. of

Math. (2) 134 (1991), no. 2, 231-251.

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