1
TOBB University of Economics and Technology Mathematics Department
2
Kocaeli University Mathematics Department
Abstract
In this paper, we consider an arbitrary binary polynomial sequence {A_n} and then give a lower triangular matrix representation of this sequence. As main result, we obtain a factorization of the innite generalized Pascal matrix in terms of this new matrix, using a Riordan group approach. Further some interesting results and applications are derived.
Kilic, E., Omur, N., & Tatar, G. (2012). Riordan group approaches in matrix factorizations. Bulletin of the Iranian Mathematical Society, 38(2), 491-506.
MLA
Emrah Kilic; Nese Omur; Gulfer Tatar. "Riordan group approaches in matrix factorizations". Bulletin of the Iranian Mathematical Society, 38, 2, 2012, 491-506.
HARVARD
Kilic, E., Omur, N., Tatar, G. (2012). 'Riordan group approaches in matrix factorizations', Bulletin of the Iranian Mathematical Society, 38(2), pp. 491-506.
VANCOUVER
Kilic, E., Omur, N., Tatar, G. Riordan group approaches in matrix factorizations. Bulletin of the Iranian Mathematical Society, 2012; 38(2): 491-506.