Tridiagonal real symmetric matrices with a connection to Pascal's triangle and the Fibonacci sequence

Abstract

We explore a certain family \An\n=1∞ of n × n tridiagonal real symmetric matrices. After deriving a three-term recurrence relation for the characteristic polynomials of this family, we find a closed form solution. The coefficients of these characteristic polynomials turn out to involve the diagonal entries of Pascal's triangle in a tantalizingly predictive manner. Lastly, we explore a relation between the eigenvalues of various members of the family. More specifically, we give a sufficient condition on the values m,n ∈ N for when spec(Am) is contained in spec(An). We end the paper with a number of open questions, one of which intertwines our characteristic polynomials with the Fibonacci sequence in an intriguing manner involving ellipses.