q-rationals are realized as circles in the plane with Springborn operations defined geometrically as homothety centers, producing a q-deformed midpoint formula and a new q-version of Markov numbers.
VeselovMarkov fractions and the slopes of the exceptional bundles onP 2
2 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 2representative citing papers
Markov fractions coincide with the indices of Cohn matrices, giving a concatenation rule for continued fractions on the Conway topograph.
citing papers explorer
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Plane geometry of $q$-rationals and Springborn Operations
q-rationals are realized as circles in the plane with Springborn operations defined geometrically as homothety centers, producing a q-deformed midpoint formula and a new q-version of Markov numbers.
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Markov fractions and Cohn matrices
Markov fractions coincide with the indices of Cohn matrices, giving a concatenation rule for continued fractions on the Conway topograph.