GENERATING FUNCTIONS OF BINARY PRODUCTS OF (p,q)-FIBONACCI-LIKE NUMBERS WITH ODD AND EVEN CERTAIN NUMBERS AND POLYNOMIALS
Abstract
In this paper, we study the symmetric and the generating functions for odd and even terms of the second-order linear recurrence sequences. We introduce a operator in order to derive a new family of generating functions of odd and even terms of Mersenne numbers, Mersenne Lucas numbers, (p,q)-Fibonacci-like numbers, k-Pell polynomials and k-Pell Lucas polynomials. By making use of the operator defined in this paper, we give some new generating functions of the products of (p,q)-Fibonacci-like numbers with odd and even terms of certain numbers and polynomials.
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