On generalized Fibonacci and Lucas polynomials

Let h(x)h(x) be a polynomial with real coefficients. We introduce h(x)h(x)-Fibonacci polynomials that generalize both Catalan’s Fibonacci polynomials and Byrd’s Fibonacci polynomials and also the k  -Fibonacci numbers, and we provide properties for these h(x)h(x)-Fibonacci polynomials. We also introduce h(x)h(x)-Lucas polynomials that generalize the Lucas polynomials and present properties of these polynomials. In the last section we introduce the matrix Qh(x)Qh(x) that generalizes the Q  -matrix 1110 whose powers generate the Fibonacci numbers.