Artist Jylian Gustlin

Jylian Gustlin "Fibonacci 104"
6,900.00

Mixed Media on Panel

48 x 48 inches

Add To Cart

Collected Artworks

gustlin_bivium+32.jpg
icarus+11+small.jpg
quantum+7+13x13+mixed+on+panel.jpg
 
 

About Jylian Gustlin

Jylian Gustlin is a native Californian and grew up in the San Francisco bay area. She has been shaped by the technology explosion of Silicon Valley and her art reflects her in-depth knowledge of that technology.

“I knew that if I finished, I would never make art” is how Jylian Gustlin explains leaving college one semester short of a degree in computer science and mathematics to attend the Academy of Art College, San Francisco.  After completing her BFA, Jylian fused her understanding of computers and her passion for art to become a graphics programmer for Apple Computer, Inc.   Now, Jylian uniquely combines the effects of modern technology with traditional techniques.  While painting in acrylic and oil paints, her artwork often conveys the same complex layered effects possible in computer programs such as Adobe Photoshop and Illustrator.  Just as she challenged the creative limitations of the latest computer software, Gustlin experiments with a variety of materials to discover their effects. Working with two-part epoxy resin, oil and acrylic paints, charcoal, wax, gold leaf, pastel and graphite on board, Gustlin draws, paints, scratches on her surfaces.

Figures have always been an important part of Gustlin’s repertoire. Her characters are frequently set in an alien-like landscape, moody and brooding, yet at the same time, depicting a sense of future. Jylian has been influenced by a lifelong love of the Bay Area Figurative artists.

For the last several years, Jylian has been working on a series of paintings, both abstract and representational, that are based on the Fibonacci mathematical theories. The Fibonacci mathematical theory is based on the numbers 1, 2, 3, 5, 8, 13, 21, and so on.  Fibonacci mathematical calculations create rectangles and shell spirals based on the incrementally increasing numbers. She is also exploring the relationship of Fibonacci numbers to the petals on flowers and how to use these ideas in paintings as well as the relationship of Fibonacci to musical scales and how the 5-tone scale, 8-tone scale, and 13-tone scale. She continues to explore science and mathematics and how it intersects with the arts.