[1] J Durnin, Exact solutions for nondiffracting beams. I. the scalar theory[J]. J. Opt. Soc. Am. A, 1987, 4(4): 651~654
[2] Zhang Qian′an, Wu Fengtie, Zheng Weitao et al.. Self-reconstructing properties of high-order Besssel-Gauss beam[J]. Science China Physics, Mechanics and Astronomy, 2011, 41(10): 1131~1137
[3] J. Durnin, J. J. Miceli, J. H. Eberly. Diffraction-free beams[J]. Phys. Rev. Lett., 1987, 58(15): 1499~1501
[4] J. Turunen, A. Vasara, A. T. Friberg. Holographic generation of diffraction-free beams[J]. Appl. Opt., 1988, 27(19): 3959~3962
[5] A. Vasara, J. Turune, A. T. Friberg. Realization of general nondiffracting beams with computer-generated holograms[J]. J. Opt. Soc. Am. A, 1989, 6(11): 1748~1757
[6] C. J. Gutiérrez-Vega, R. Rodríguez-Masegosa, S. Chávez-Cerda. Bessel-Gauss resonator with spherical output mirror: geometrical-and wave-optics analysis[J]. J. Opt. Soc. Am. A, 2003, 20(11): 2113~2122
[7] D. G. Grier. A revolution in optical manipulation[J]. Nature Photonics, 2003, 424(6950): 810~816
[8] S. A. Tatarkova, W. Sibbett, K. Dholakia. Brownian particle in an optical potential of the washboard type[J]. Phys. Rev. Lett., 2003, 91(3): 038101
[9] J. Chen, J. Ng, Z. F. Lin et al.. Optical pulling force[J]. Nature Photonics, 2011, 5: 531~534
[10] R. Qi, X. L. Yu, Z. B. Li et al.. Non-Abelian Josephson effect between two F=2 spinor Bose-Einstein condensates in double optical traps[J]. Phys. Rev. Lett., 2009, 102(18): 185301
[13] L. Basanoa, P. Ottonello. Demonstration experiments on nondiffracting beams generated by thermal light[J]. AAPT, 2005, 73(9): 826~830
[14] X. Zhu, A. S. Lzgen, H. Wei et al.. White light Bessel-like beams generated by miniature all-fiber device[J]. Opt. Express, 2011, 19(12): 11365~11374
[15] J. Leach, G. M. Gibson, M. J. Padgett et al.. Generation of achromatic Bessel beams using a compensated spatial light modulator[J]. Opt. Express, 2006, 14(12): 5581~5587
[16] G. Scott, N. McArdle. Efficient generation of nearly diffraction-free beams using an axicon[J]. Opt. Engng., 1992, 31(12): 2640~2643
[17] A. T. Friberg. Stationary-phase analysis of generalized axicons[J]. J. Opt. Soc. Am. A, 1996, 13(4): 743~750