Add to ORKGThe Fibonomial numbers are defined by \[ \begin{bmatrix}n \\ k \end{bmatrix} = \frac{\prod_{i=n-k+1} ^{n} F_i}{\prod_{j=1}^{k} F_j} \] where $F_i$ is the $i$th Fibonacci number, defined by the recurrence $F_n=F_{n-1}+F_{n-2}$ with initial conditions $F_0=0,F_1=1$. In the past year, Sagan and Savage have derived a combinatorial interpretation for these Fibonomial numbers, an interpretation that relies upon tilings of a partition and its complement in a given grid.In this thesis, I investigate previously proven theorems for the Fibonomial numbers and attempt to reinterpret and reprove them in light of this new combinatorial description. I also present combinatorial proofs for some identities I did not find elsewhere in my research and begi...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Fibonomial numbers are defined by \[ \begin{bmatrix}n \\ k \end{bmatrix} = \frac{\prod_{i=n-k+...
We can define Fibonomial coefficients as an analogue to binomial coefficients as F(n,k) = FnFn-1 … F...
We provide a list of simple looking identities that are still in need of combinatorial proof
We provide elementary combinatorial proofs of several Fibonacci and Lucas number identities left ope...
In this paper we explore generalized “$r$-Fibonacci Numbers” using a combinatorial “tiling” interpre...
The Fibonomial coefficients are a generalization of the binomial coefficients with a rather nice com...
The Fibonomial coefficients are a generalization of the binomial coefficients with a rather nice com...
Fibonacci numbers arise in the solution of many combinatorial problems. They count the number of bin...
The Fibonacci Numbers are one of the most intriguing sequences in mathematics. I present generalizat...
The Fibonacci Numbers are one of the most intriguing sequences in mathematics. I present generalizat...
The Fibonacci numbers are sequences of numbers of the form: 0,1,1,2,3,5,8,13,... Among n...
The Fibonacci numbers are sequences of numbers of the form: 0,1,1,2,3,5,8,13,... Among n...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Fibonomial numbers are defined by \[ \begin{bmatrix}n \\ k \end{bmatrix} = \frac{\prod_{i=n-k+...
We can define Fibonomial coefficients as an analogue to binomial coefficients as F(n,k) = FnFn-1 … F...
We provide a list of simple looking identities that are still in need of combinatorial proof
We provide elementary combinatorial proofs of several Fibonacci and Lucas number identities left ope...
In this paper we explore generalized “$r$-Fibonacci Numbers” using a combinatorial “tiling” interpre...
The Fibonomial coefficients are a generalization of the binomial coefficients with a rather nice com...
The Fibonomial coefficients are a generalization of the binomial coefficients with a rather nice com...
Fibonacci numbers arise in the solution of many combinatorial problems. They count the number of bin...
The Fibonacci Numbers are one of the most intriguing sequences in mathematics. I present generalizat...
The Fibonacci Numbers are one of the most intriguing sequences in mathematics. I present generalizat...
The Fibonacci numbers are sequences of numbers of the form: 0,1,1,2,3,5,8,13,... Among n...
The Fibonacci numbers are sequences of numbers of the form: 0,1,1,2,3,5,8,13,... Among n...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...
The Chebyshev polynomials arise in several mathematical contexts such as approximation theory, numer...