References
- [Borwein et al. 12] J. M. Borwein, A. Straub, J. Wan, W. Zudilin, and D. Zagier. “Densities of Short Uniform Random Walks.” Can. J. Math. 64:05 (2012), 961–990. With an appendix by Don Zagier.
- [Carneiro et al. 17] E. Carneiro, D. Foschi, D. Oliveira e Silva, and C. Thiele. “A Sharp Trilinear Inequality Related to Fourier Restriction on the Circle.” Rev. Mat. Iberoam. 33:4 (2017), 1463–1486.
- [Foschi 15] D. Foschi. “Global Maximizers for the Sphere Adjoint Fourier Restriction Inequality.” J. Funct. Anal. 9:3 (2015), 690–702.
- [Gonçalves 17] F. Gonçalves. “Orthogonal Polynomials and Sharp Estimates for the Schrödinger Equation.” Preprint, arXiv:1702.08510, 2017. To Appear in Int. Math. Res. Not.
- [Oliveira e Silva and Thiele 17] D. Oliveira e Silva, and C. Thiele. “Estimates for Certain Integrals of Products of Six Bessel Functions.” Rev. Mat. Iberoam. 33:4 (2017), 1423–1462.
- [Shao 16] S. Shao. “On Existence of Extremizers for the Tomas–Stein Inequality for S1.” J. Funct. Anal. 270 (2016), 3996–4038.
- [Shao 16] S. Shao. “On Smoothness of Extremizers of the Tomas–Stein Inequality for S1.” Preprint, arXiv:1601.07119, 2016.
- [Tomas 75] P. Tomas. “A Restriction Theorem for the Fourier Transform.” Bull. Amer. Math. Soc. 81:2 (1975), 477–478.
- [Wolfram Research 17] Wolfram Research, Inc. Mathematica. Version 11.1.1.0. Champaign, IL (2017).