| Popis: |
The description of light diffraction using catastrophe optics is one of the most intriguing theoretical invention in the field of classical optics of the last four decades. Its practical implementation has faced some resistance over the years, mainly due to the difficulty of mathematically decorating the different, topologically speaking, types of optical singularities (caustics) that concur to build up the skeleton on which diffraction patterns stem. Such a fundamental {\em dressing problem} has been solved in the past only for the so-called {\em fold}, which lies at the bottom of the hierarchy of structurally stable caustics. Climbing this hierarchy implies considerably more challenging mathematical problems to be solved. An ancient mathematical theorem is here employed to find the complete solution of the dressing problem for the {\em cusp}, which is placed, in the stable caustic hierarchy, immediately after the fold. The other ingredient used for achieving such an important theoretical result is the paraxial version of the boundary diffraction wave theory, whose tight connection with catastrophe optics has recently been emphasized in [R. Borghi, Opt. Lett. {\bf 41,} 3114 - 3117 (2016)]. A significant example of the developed algorithm aimed at demonstrating its effectiveness and ease of implementation, is also presented. |
