Configuration spaces of disks in an infinite strip

Abstract

We study the topology of the configuration spaces C(n,w) of n hard disks of unit diameter in an infinite strip of width w. We describe ranges of parameter or "regimes", where homology Hj [C(n,w)] behaves in qualitatively different ways. We show that if w j+2, then the homology Hj[C(n, w)] is isomorphic to the homology of the configuration space of points in the plane, Hj[C(n, R2)]. The Betti numbers of C(n, R2) were computed by Arnold, and so as a corollary of the isomorphism, βj[C(n,w)] is a polynomial in n of degree 2j. On the other hand, we show that if 2 w j+1, then βj [ C(n,w) ] grows exponentially with n. Most of our work is in carefully estimating βj [ C(n,w) ] in this regime. We also illustrate, for every n, the homological "phase portrait" in the (w,j)-plane--- the parameter values where homology Hj [C(n,w)] is trivial, nontrivial, and isomorphic with Hj [C(n, R2)]. Motivated by the notion of phase transitions for hard-spheres systems, we discuss these as the "homological solid, liquid, and gas" regimes.