• Title of article

    Some new families of generalized $k$-Leonardo and Gaussian Leonardo Numbers

  • Author/Authors

    Prasad ، Kalika Department of Mathematics - Central University of Jharkhand , Mohanty ، Ritanjali Department of Mathematics - Central University of Jharkhand , Kumari ، Munesh Department of Mathematics - Central University of Jharkhand , Mahato ، Hrishikesh Department of Mathematics - Central University of Jharkhand

  • From page
    539
  • To page
    553
  • Abstract
    In this paper, we introduce a new family of the generalized $k$-Leonardo numbers and study their properties. We investigate the Gaussian Leonardo numbers and associated new families of these Gaussian forms. We obtain combinatorial identities like Binet formula, Cassini’s identity, partial sum, etc. in the closed form. Moreover, we give various generating and exponential generating functions.
  • Keywords
    k , Leonardo numbers , k , Gaussian Leonardo numbers , Binet formula , Generating functions , Partial sum
  • Journal title
    Communications in Combinatorics and Optimization
  • Journal title
    Communications in Combinatorics and Optimization
  • Record number

    2762234