The Formulas for Sum of Products of Sequences Associated With the Metallic Means

2020;
: pp. 73 - 78
1
Lviv Polytechnic National University, Ukraine
2
Lviv Polytechnic National University

In this paper, the regularities of convolution of sequences c of Fibonacci numbers {Fn} generated by metallic means and the sum of products of two statistically independent sequences {Fi} and Jn=j∙sin(0.5π(n-j)) are investigated. It is shown that the known closed forms of sums for convolutionn ... and product ...
are similar. Attention to the study of the convolution of two sequences of discrete data is associated with the use of this method for statistical signal processing. This problem involves calculating finite sums as discrete analogs of definite integrals. Such a problem is considered solved if the formula for the sum is expressed in a closed form as a function of its members and their number.

  1. J.Proakis, D.Manolakis. Digital Signal Processing. Principles, by Prentice-Hall, Inc. Simon & Schuster/A Viacom Company Upper Saddle River, New Jersey,1996, Algorithm, and Applications.WEB-resource: https://engineering.purdue.edu/~ee538/DSP_Text_3rdEdition.pdf. 
  2. T.Kim, D.Dolgy, D.Kim, et.al. Convolved Fibonacci numbers and their applications. ARS Combinatoria, 135 (2017 ): 228; arXiv:1607.06380 [math.NT] (or arXiv:1607.06380v1 [math.NT] for this version)
  3. T. Szakács: Convolution of second-order linear recursive sequences I.. Annales Mathematicae et Informaticae 46 (2016) 205–216.
  4. Z. Chen, L. Qi . Some Convolution Formulae Related to the Second-Order Linear Recurrence Sequence Symmetry (2019), 11, 788-798.
  5. P. Moree. Convoluted Convolved Fibonacci Numbers. Journal of Integer Sequences, Vol. 7 (2004.
  6. Vera W. De Spinadel. The Family of Metallic Means. (2014), http://www.mi.sanu.ac.rs/vismath/spinadel/]. 
  7. W. Zhang: Some Identities Involving the Fibonacci Numbers. The Fibonacci Quarterly 35 (3) (1997) 225–229.
  8. T. Komatsu, Z. Masáková, E. Pelantová. Higher-order identities for Fibonacci numbers, Fibonacci Quart.52 (2014), 150-163.
  9. J. W. Pierre. A novel method for calculating the convolution sum of two finite-length sequences. IEEE Transactions on Education, vol. 39, issue 1 (1996) , 77-80.