@article { author = {Sadaoui, Boualem and Krelifa, Ali}, title = {$d-$Fibonacci and $d-$Lucas polynomials}, journal = {Journal of Mathematical Modeling}, volume = {9}, number = {3}, pages = {425-436}, year = {2021}, publisher = {University of Guilan}, issn = {2345-394X}, eissn = {2382-9869}, doi = {10.22124/jmm.2021.17837.1538}, abstract = {Riordan arrays give us an intuitive method of solving combinatorial problems. They also help to apprehend number patterns and to prove many theorems. In this paper, we consider the Pascal matrix, define a new generalization of Fibonacci and Lucas polynomials called $d-$Fibonacci and $d-$Lucas polynomials (respectively) and  provide their properties. Combinatorial identities are obtained for the defined polynomials and by using Riordan method we get factorizations of Pascal matrix involving $d-$Fibonacci polynomials.}, keywords = {$d-$Fibonacci polynomials,$d-$Lucas polynomials,Riordan arrays,Pascal matrix,$Q_{d}-$Fibonacci matrix}, url = {https://jmm.guilan.ac.ir/article_4581.html}, eprint = {https://jmm.guilan.ac.ir/article_4581_d5a4d10c1688c9b12ffff9830972967e.pdf} }