Colored HOMFLY and Generalized Mandelbrot set

Abstract

Mandelbrot set is a closure of the set of zeroes of resultantx(Fn,Fm) for iterated maps Fn(x)=f n(x)-x in the moduli space of maps f(x). The wonderful fact is that for a given n all zeroes are not chaotically scattered around the moduli space, but lie on smooth curves, with just a few cusps, located at zeroes of discriminantx(Fn). We call this phenomenon the Mandelbrot property. If approached by the cabling method, symmetrically-colored HOMFLY polynomials H Kn(A|q) can be considered as linear forms on the n-th "power" of the knot K, and one can wonder if zeroes of resultantq2(Hn,Hm) can also possess the Mandelbrot property. We present and discuss such resultant-zeroes patterns in the complex-A plane. Though A is hardly an adequate parameter to describe the moduli space of knots, the Mandelbrot-like structure is clearly seen -- in full accord with the vision of arXiv:hep-th/0501235, that concrete slicing of the Universal Mandelbrot set is not essential for revealing its structure.