This is a mathematically rigorous introduction to fractals which emphasizes examples and fundamental ideas. Building up from basic techniques of geometric measure theory and probability, central ...

Born in Warsaw, Poland, in 1924, the improbably named Benoît B Mandelbröt – the ”B” stands for a non-existent middle name – would be so important to the story of fractal geometry that he pretty ...

If however the point does not wander off to infinity, then that point IS in the Julia set. Julia sets can be simple (like a circle) or extremely complicated like a fractal. See the W00 course notes on ...

The image of the Mandelbrot set is one of the most recognizable representations of a fractal. But what's behind the entrancing picture? In this interactive, learn a bit about how we generated our ...

a square fractal. He was a key figure of the Warsaw School of Mathematics, which thrived in the interwar period. He is also recognised for his contribution to the development of set theory, not only ...

Whatever the case, the VP4 certainly sets an interesting precedent, and we wouldn’t be surprised if Fractal has plans for a ...