中文

On quantitative aspects of trace polynomials

群论 2026-05-29 v3 几何拓扑

摘要

By the classic results of Fricke and Klein, for every word ww in the free group F(a,b)F(a,b) there exists a unique integer \it{trace polynomial} fw(x,y,z)Z[x,y,z]f_w(x,y,z)\in Z[x,y,z] such that Tr(w(A,B))=fw(TrA,TrB,TrAB)Tr(w(A,B))=f_w(Tr A,Tr B,Tr AB). for all A,BSL(2,C)A,B\in SL(2,C). We study quantitative aspects of trace polynomials. We prove an exact formula for the leading homogeneous part of fwf_w for every nontrivial cyclically reduced word wF(a,b)w\in F(a,b). In particular, if w=u1unw=u_1\cdots u_n is cyclically reduced over {a,a1,b,b1}\{a,a^{-1},b,b^{-1}\}, and if Nrs(w)N_{rs}(w) is the number of cyclic occurrences of rsrs, then degfw=nNab(w)Nb1a1(w)=n12(Nab(w)+Nba(w)+Na1b1(w)+Nb1a1(w)).deg f_w=n-N_{ab}(w)-N_{b^{-1}a^{-1}}(w)=n-\frac{1}{2}(N_{ab}(w)+N_{ba}(w)+N_{a^{-1}b^{-1}}(w)+N_{b^{-1}a^{-1}}(w)). We obtain sharp general bounds n/2degfwn\lceil n/2\rceil\le deg f_w\le n for wF(a,b)w\in F(a,b) with cyclically reduced length nn. We also study degfwdeg f_w for random positive words and for random freely reduced and random cyclically reduced words. We obtain explicit exponential upper bounds for the growth of the 1\ell_1 and \ell_\infty norms of fwf_w and exhibit examples with exponential coefficient growth at rate φn\varphi^n, where φ\varphi is the golden ratio. We show that for random freely reduced, random cyclically reduced and random positive words wnw_n of length nn in F(a,b)F(a,b), the size of supp(fwn)supp(f_{w_n}) grows at least quadratically in nn and the total bit-size of fwnf_{w_n} grows at least as cn3cn^3. Hence, any algorithm computing fwf_w in totally expanded form has worst-case time complexity as well as generic-case time complexity for the above models bounded below by Ω(n3)\Omega(n^3). We also give a deterministic algorithm which computes the fully expanded polynomial fwf_w in time O(n5)O(n^5) and space O(n4)O(n^4), in terms of the input word length nn.

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引用

@article{arxiv.2605.25265,
  title  = {On quantitative aspects of trace polynomials},
  author = {Ilya Kapovich},
  journal= {arXiv preprint arXiv:2605.25265},
  year   = {2026}
}

备注

Updated version with improvements of the main results to include a quadratic support size growth and cubic total bitsize growth for f_w of random words, with consequences for lower bounds on generic-case complexity of computing f_w