A family of accumulation points of non-free rational numbers
Abstract
For any q∈R, let A:=(smallmatrix1 & 1\\0 & 1smallmatrix), Bq:=(smallmatrix1 & 0\ & 1smallmatrix) and let Gq:= A,Bq≤slantSL(2,R). Kim and Koberda conjecture that for every q∈Q(-4,4), the group Gq is not freely generated by these two matrices. We generalize work of Smilga and construct families of q satisfying the conjecture that accumulate at infinitely many different points in (-4,4). We give different constructions of such families, the first coming from applying tools in Diophantine geometry to certain polynomials arising in Smilga's work, the second from sums of geometric series and the last from ratios of Pell and Half-Companion Pell Numbers accumulating at 1+2.
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