Evolved Ricochet Compositions

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Greenfield, Gary: Evolved Ricochet Compositions. In: EvoMUSART 2009, S. 518-527.




We consider evolutionary art based on the ricochet art-making technique. With this technique, a sequence of line segments defined by particles moving within the interior of a polygon is developed into a geometric composition by virtue of the fact that reflection (the ricochet) is used to ensure that whenever a particle meets an existing line segment it does not cross it. There is also a rule for filling some of the interior polygons that are formed by particle trajectories based on line color attributes. We establish a genetic infrastructure for this technique and then consider objective measures based on ratio statistics for aesthetically evaluating the results. For the special case of four particles in motion within a square we also examine fitness landscape questions.

Extended Abstract


booktitle={Applications of Evolutionary Computing},
series={Lecture Notes in Computer Science},
editor={Giacobini, Mario and Brabazon, Anthony and Cagnoni, Stefano and Di Caro, GianniA. and Ekárt, Anikó and Esparcia-Alcázar, AnnaIsabel and Farooq, Muddassar and Fink, Andreas and Machado, Penousal},
title={Evolved Ricochet Compositions},
url={http://dx.doi.org/10.1007/978-3-642-01129-0_58 },
url={http://de.evo-art.org/index.php?title=Evolved_Ricochet_Compositions },
publisher={Springer Berlin Heidelberg},
author={Greenfield, Gary},

Used References

Angel, E.: Interactive Computer Graphics A Top-Down Approach with OpenGL, 4th edn. Pearson Addison-Wesley, Upper Saddle River (2006)

Annunziato, M., Pierucci, P.: Relazioni emergenti: experiments with the art of emergence. Leonardo 35(2), 147–152 (2002)

Baxter, A., Umble, R.: Periodic orbits for billiards on an equilateral triangle. Amer. Math. Monthly 115(6), 479–491 (2008)

de Kok, I., Lucassen, T., Ruttkay, Z.: Ricochet compositions. In: Sarhangi, R., Barrallo, J. (eds.) BRIDGES 2007 Conference Proceedings, pp. 177–180 (2007)

Krawczyk, R.: Dimension of time in strange attractors. In: Barrallo, J., et al. (eds.) BRIDGES/ISAMA 2003 Conference Proceedings, pp. 119–126 (2003), http://www.iit.edu/~krawczyk/rjkbrdg03.pdf

Krawczyk, R.: The ghostly imagery of strange attractors. In: Sarhangi, R., Sequin, C. (eds.) BRIDGES 2004 Conference Proceedings, pp. 333–336 (2004), http://www.iit.edu/~krawczyk/rjkbrdg04a.pdf

Levi, M., Tabachnikov, S.: The Poncelet grid and billiards in ellipses. Amer. Math. Monthly 114(10), 895–908 (2007)

Tsang, J.: Evolving trajectories of the n-body problem. In: 2008 IEEE World Congress on Computational Intelligence (CEC 2008), pp. 3726–3734 (2008) DOI: 10.1109/CEC.2008.4631302


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