Year 2018,
Volume: 1 Issue: 2, 131 - 137, 30.09.2018
Alexander Yampolsky
,
Oleksandr Fursenko
References
- [1] J. W. Bruce, P. J. Giblin, C. G. Gibson. On caustics by reflexion, Topology 21(2) (1982), 179–199.
- [2] Chr. Georgiou, Th. Hasanis, D. Koutroufiotis. On the caustic of a convex mirror. Geometriae Dedicata 28 (1988), 153–169.
- [3] S. Izumiya, Perestroikas of optical wave fronts and graphlike Legendrian unfoldings. J. Differential Geom. 38 (1993) 485–00.
- [4] S. Izumiya, M. Takahashi. On caustics of submanifolds and canal hypersurfaces in Euclidean space. Topology and its Applications, 159 (2012) 501 –
508.
- [5] S. Izumiya, M. Takahashi, Caustics and wave front propagations: Applications to differential geometry, in: Geometry and Topology of Caustics. Banach
Center Publ. 82 (2008), 125–142.
- [6] J. Chen, H. Liu, J. Miao. Caustics of translation surfaces in Euclidean 3-space. Nonlinear Sci. Appl., 10 (2017), 5300 – 5310. doi:10.22436/jnsa.010.10.16
- [7] G. Glaeser. Refections on spheres and cylinders of revolution. Journal for Geometry and Graphics. 3(2) (1999), 121 – 139.
- [8] D. R. J. Chillingworth, G. R. Danesh-Narouie, B. S. Westcott. On Ray-Tracing Via Caustic Geometry. IEEE transactions on antennas and propagation.
38(5) May 1990, 625 - 632
- [9] M. Kokubu, W. Rossman, M. Umehara and K. Yamada. Flat fronts in hyperbolic 3-space and their caustics, J. Math. Soc. Japan 59(1) (2007), 265 – 299
- [10] Rovenski V.: Geometry of Curves and Surfaces with MAPLE. Birkh¨auser Boston, 2000.
Caustics of wave fronts reflected by a surface
Year 2018,
Volume: 1 Issue: 2, 131 - 137, 30.09.2018
Alexander Yampolsky
,
Oleksandr Fursenko
Abstract
One can often see caustic by reflection in nature but it is rather hard to understand the way of how caustic arise and which geometric properties of a mirror surface define geometry of the caustic. The caustic by reflection has complicated topology and much more complicated geometry. From engineering point of view the geometry of caustic by reflection is important for antenna's theory because it can be considered as a surface of concentration of the reflected wave front. In this paper we give purely geometric description of the caustics of wave front (flat or spherical) after reflection from mirror surface. The description clarifies the dependence of caustic on geometrical characteristics of a surface and allows rather simple and fast computer visualization of the caustics in dependence of location of the rays source or direction of the pencil of parallel rays.
References
- [1] J. W. Bruce, P. J. Giblin, C. G. Gibson. On caustics by reflexion, Topology 21(2) (1982), 179–199.
- [2] Chr. Georgiou, Th. Hasanis, D. Koutroufiotis. On the caustic of a convex mirror. Geometriae Dedicata 28 (1988), 153–169.
- [3] S. Izumiya, Perestroikas of optical wave fronts and graphlike Legendrian unfoldings. J. Differential Geom. 38 (1993) 485–00.
- [4] S. Izumiya, M. Takahashi. On caustics of submanifolds and canal hypersurfaces in Euclidean space. Topology and its Applications, 159 (2012) 501 –
508.
- [5] S. Izumiya, M. Takahashi, Caustics and wave front propagations: Applications to differential geometry, in: Geometry and Topology of Caustics. Banach
Center Publ. 82 (2008), 125–142.
- [6] J. Chen, H. Liu, J. Miao. Caustics of translation surfaces in Euclidean 3-space. Nonlinear Sci. Appl., 10 (2017), 5300 – 5310. doi:10.22436/jnsa.010.10.16
- [7] G. Glaeser. Refections on spheres and cylinders of revolution. Journal for Geometry and Graphics. 3(2) (1999), 121 – 139.
- [8] D. R. J. Chillingworth, G. R. Danesh-Narouie, B. S. Westcott. On Ray-Tracing Via Caustic Geometry. IEEE transactions on antennas and propagation.
38(5) May 1990, 625 - 632
- [9] M. Kokubu, W. Rossman, M. Umehara and K. Yamada. Flat fronts in hyperbolic 3-space and their caustics, J. Math. Soc. Japan 59(1) (2007), 265 – 299
- [10] Rovenski V.: Geometry of Curves and Surfaces with MAPLE. Birkh¨auser Boston, 2000.