Some inclusion results for the new Tribonacci-Lucas matrix
Abstract
The main purpose of this paper is first to establish a new regular matrix by using one of the important
sequences of integer number called Tribonacci-Lucas. Also, we class this new Tribonacci-Lucas matrix
with some well-known summability methods such as Riesz means, Nörlund means and Cesaro means. To
do this, we show that the Tribonacci-Lucas matrix is a regular summability method and in addition to this,
we give some inclusion results and finally prove that Cesaro matrix is stronger than the Tribonacci-Lucas
matrix.
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