What question did this study set out to answer?

The paper aims to explore the combinatorial interpretations of hyper-Leonardo and Leonardo numbers and their mathematical properties.

March 5, 2026Open Access

Hyper-Leonardo numbers: Combinatorial interpretation and some positivities

Key Points

The paper aims to explore the combinatorial interpretations of hyper-Leonardo and Leonardo numbers and their mathematical properties.
Established combinatorial interpretations for hyper-Leonardo and Leonardo numbers.
Investigated log-concavity for n ≥ 3 and hyper-Leonardo numbers for n, r ≥ 1.
Proved log-balancedness of hyper-Leonardo numbers for r = 1, 2.
Demonstrated q-log-concavity of the polynomial involving hyper-Leonardo numbers.
Clarified the combinatorial interpretations of hyper-Leonardo and Leonardo numbers.
Confirmed log-concavity for the specified ranges of n and hyper-Leonardo numbers.
Verified log-balancedness for certain values of r.
Established q-log-concavity in the polynomial representation of hyper-Leonardo numbers.

Abstract

In this paper, we establish the combinatorial interpretations of the hyper-Leonardo numbers Leₙ^ (r) and Leonardo numbers Leₙ. We investigate the log-concavity of the Leonardo numbers for n 3 and the hyper-Leonardo numbers for n, r 1. In addition, we prove the log-balancedness of the hyper-Leonardo numbers for r = 1, 2. Furthermore, we prove the q -log-concavity of the polynomial ₊=₀ⁿ Leₖ^ (r) qᵏ for n, r 1.

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Hyper-Leonardo numbers: Combinatorial interpretation and some positivities

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Abstract

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