The braid group B3 in the framework of continued fractions
Abstract
We use the classical interpretation of the braid group B3 as a central extension of the modular group PSL2(Z) to establish new and fundamental properties of B3 using the theory of continued fractions. In particular, we give simple and natural linear time algorithms to solve the word and conjugacy problems in B3. The algorithms introduced in this paper are easy to implement and are the most efficient algorithms in the literature to solve these problems in the braid group B3.
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