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-DEFORMED RATIONALS AND -CONTINUED FRACTIONS

SOPHIE MORIER-GENOUD, VALENTIN OVSIENKO

2020Forum of Mathematics Sigma40 citationsDOIOpen Access PDF

Abstract

We introduce a notion of $q$ -deformed rational numbers and $q$ -deformed continued fractions. A $q$ -deformed rational is encoded by a triangulation of a polygon and can be computed recursively. The recursive formula is analogous to the $q$ -deformed Pascal identity for the Gaussian binomial coefficients, but the Pascal triangle is replaced by the Farey graph. The coefficients of the polynomials defining the $q$ -rational count quiver subrepresentations of the maximal indecomposable representation of the graph dual to the triangulation. Several other properties, such as total positivity properties, $q$ -deformation of the Farey graph, matrix presentations and $q$ -continuants are given, as well as a relation to the Jones polynomial of rational knots.

Topics & Concepts

MathematicsIndecomposable moduleFarey sequenceRational numberCombinatoricsQuiverBinomial coefficientLucas numberDiscrete mathematicsNewton polygonPartition (number theory)GraphDisjoint setsBipartite graphGaussian binomial coefficientPascal (unit)Rational functionIdentity (music)AnagrelidePure mathematicsGreatest common divisorReal numberModuloMathematical and Theoretical AnalysisMathematical Dynamics and Fractalssemigroups and automata theory
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