Continuants with equal values, a combinatorial approach.

A regular continuant is the denominator $K$ of a terminating regular continued fraction, interpreted as a function of the partial quotients. We regard $K$ as a function defined on the set of all finite words on the alphabet $1<2<3<\dots$ with values in the positive integers. Given a word $w=w_1\cdots w_n$ with $w_i\in\mathbb{N}$ we define its multiplicity $\mu(w)$ as the number of times the value $K(w)$ is assumed in the Abelian class $\mathcal{X}(w)$ of all permutations of the word $w.$ We prove that there is an infinity of different lacunary alphabets of the form $\{b_1<\dots

Keywords:

• Mathematics
• Multiplicity (mathematics)
• Function (mathematics)
• Combinatorics
• Abelian group
• Word (group theory)
• Infinity
• Quotient
• continuant
• Lacunary function

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