Finite capture and the closure of roots of restricted polynomials
Abstract
We study how a countable algebraic root set passes to a fractal connectedness locus. Let Dn=\-n+1,-n+2,…,n-1\, and let Rn be the set of roots of monic polynomials whose non-leading coefficients lie in Dn. We study RnD. Outside the closed unit disk this set equals a connectedness locus Mn for a collinear affine iterated function system, or equivalently the zero set of reciprocal power series 1+Σk1 dk c-k with dk∈ Dn. For non-real parameters in the lens Xn=\\,c∈CD:\ |c1|<2n\,\ we construct a canonical trap and enclosure for the associated difference attractor and use them to define finite-capture sets k(n) for the marked point 2c. Our main result is the uniform inclusion k(n)(Xn)⊂k+2(n) for every k0. Consequently, (Mn Xn) is exactly the closure of the finite-capture locus. The paper combines explicit trap geometry with certified inverse search. Moreover, Mn⊂ Xn for every n20, and this is sharp for 2 n19. Thus, for n20, the non-real part of RnD is exactly the closure of the finite-capture locus.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.