Digital Mathematical Images by Conan Chadbourne
Born in 1978, Conan Chadbourne received his BA in Mathematics and Physics from New York University in 2011. He has worked in the fields of experimental physics research, digital imaging and printing, graphic design, and documentary film production.. Chadbourne lives in San Antonio where he works as a freelance graphic designer and documentary film producer.
Chadbourne draws inspiration for his work from his experience in mathematics and the sciences. He is motivated by his fascination with the occurrence of mathematical and scientific imagery in traditional art forms, and the mystical, spiritual, or cosmological significance that is often attached to such imagery.
Mathematical themes both overt and subtle appear in a broad range of traditional art: Medieval illuminated manuscripts, Buddhist mandalas, intricate tilings in Islamic architecture, restrained temple geometry paintings in Japan, complex patterns in African textiles, and geometric ornament in archaic Greek ceramics. Often this imagery is deeply connected with the models and abstractions these cultures use to interpret and relate to the cosmos, in much the same way that modern scientific diagrams express a scientific worldview.
Conan Chadbourn’s works have been exhibited at the Grace Museum in Abilene, Texas; The Art Center of Corpus Christi,;the Museum of Geometric and MADI Art in Dallas, Texas; and the Bridges Conference for Mathematics in the Arts.
“There are 212,987 distinct ways to partition a 4×4 grid of square tiles into component shapes composed of contiguous tiles, assuming any two such partitions are considered equivalent if they differ only by a symmetry transformation such as a rotation or reflection. There are exactly thirteen of these configurations which partition this grid of sixteen tiles into two component shapes of equal area, each composed of eight tiles. This image presents this set of thirteen equal divisions of this group of tiles.”
—Conan Chadbourne, Discussing his image “Concise Lesson in Uniform Partitions”