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Ars Combinatoria

  • Research article

On Two Types of \((2, K)\)-Distance Lucas Numbers

Urszula Bednarz1, Dorota Brod2, Malgorzata Wolowiec-Musial1
1Rzeszow University of Technology Faculty of Mathematics and Applied Physics al. Powstaricéw Warszawy 12, 25-3859 Rzeszéw, Poland
2 Rzeszow University of Technology Faculty of Mathematics and Applied Physics al. Powstaricéw Warszawy 12, 25-3859 Rzeszéw, Poland
  • Published: 31/07/2014

Abstract

In this paper we define new types of generalizations in the distance sense of Lucas numbers. These generalizations are based on introduced recently the concept of \((2, k)\)-distance Fibonacci numbers.We study some properties of these numbers and present identities
which generalize known identities for Lucas numbers. Moreover, we show representations and interpretations of these numbers.

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Citation
Urszula Bednarz, Dorota Brod, Malgorzata Wolowiec-Musial. On Two Types of \((2, K)\)-Distance Lucas Numbers[J], Ars Combinatoria, Volume 115. 467-479. .