Navigating in the Cayley graphs of SLN(Z) and SLN(Fp)

Abstract

We give a non-deterministic algorithm that expresses elements of SLN(Z), for N > 2, as words in a finite set of generators, with the length of these words at most a constant times the word metric. We show that the non-deterministic time-complexity of the subtractive version of Euclid's algorithm for finding the greatest common divisor of N > 2 integers a1,..., aN is at most a constant times N log n where n := max |a1|,..., |aN|. This leads to an elementary proof that for N > 2 the word metric in SLN(Z) is biLipschitz equivalent to the logarithm of the matrix norm -- an instance of a theorem of Mozes, Lubotzky and Raghunathan. And we show constructively that there exists K>0 such that for all N > 2 and primes p, the diameter of the Cayley graph of SLN(Fp) with respect to the generating set eij i ≠ j is at most K N2 p.

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