Bessel beams have been extensively studied, but to date have been created over a finite region inside the laboratory. Recently Bessel-like beams with longitudinally dependent cone angles have been introduced allowing for a potentially infinite quasi non-diffracting propagation region. Here we show that such beams can self-heal. Moreover, in contrast to Bessel beams where the self-healing distance is constant, here the self-healing distance is dependent on where the obstruction is placed in the field, with the distance increasing as the Bessel-like beam propagates farther. We outline the theoretical concept for this self-healing and confirm it experimentally.
Reference:
Litvin, I, Burger, L and Forbes, A. 2015. Self-healing of Bessel-like beams with longitudinally dependent cone angles. Journal of Optics, vol. 17(10), 6pp.
Litvin, I., Burger, L., & Forbes, A. (2015). Self-healing of Bessel-like beams with longitudinally dependent cone angles. http://hdl.handle.net/10204/8233
Litvin, I, L Burger, and A Forbes "Self-healing of Bessel-like beams with longitudinally dependent cone angles." (2015) http://hdl.handle.net/10204/8233
Litvin I, Burger L, Forbes A. Self-healing of Bessel-like beams with longitudinally dependent cone angles. 2015; http://hdl.handle.net/10204/8233.
