Frederic Durville Art Collections
Shop for artwork from Frederic Durville based on themed collections. Each image may be purchased as a canvas print, framed print, metal print, and more! Every purchase comes with a 30-day money-back guarantee.
Artwork by Frederic Durville
Each image may be purchased as a canvas print, framed print, metal print, and more! Every purchase comes with a 30-day money-back guarantee.
Amoeba by Frederic Durville
Odd Egg by Frederic Durville
Docked Boats by Frederic Durville
Lost by Frederic Durville
Oodle World by Frederic Durville
Alien Brain by Frederic Durville
Burst by Frederic Durville
Claws by Frederic Durville
Diva by Frederic Durville
Spiky Bugs by Frederic Durville
Dream Catcher by Frederic Durville
Twirls by Frederic Durville
Still Wet Life by Frederic Durville
flower gate by Frederic Durville
Fractal Monster by Frederic Durville
Wrapped Square by Frederic Durville
Fragmentation by Frederic Durville
Magma by Frederic Durville
Sea Monster by Frederic Durville
Construction Rings by Frederic Durville
Golumphr Castle by Frederic Durville
Allien Gears by Frederic Durville
Art Deco by Frederic Durville
Wide Eye by Frederic Durville
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About Frederic Durville
I am constantly amazed by the magnificence of nature from both an aesthetic and functional point of view. Early on, I used a camera to look at objects and scenes of nature from different points of views in order to reveal their beauty that is often hidden from the normal view. I was first exposed to Fractals in the course of my scientific works in the mid-80s, but it is only more recently around 2003 that I became fascinated by the endless possibilities that Fractal Art can offer. The creation of a Fractal image starts with the graphical representation of a mathematical function, but ends up as a unique and beautiful artistic creation. The choices and possibilities are totally endless, starting with an almost infinite choice of mathematical functions, a boundless choice of scaling or zooming representation, and equally infinite possibilities of coloring algorithms. I am always amazed how I can start with a relatively simple mathematical graph and end up with a totally new, original and beautiful picture!