Eigenfunctions on the Finite Poincaré Plane

Details Eigenfunctions on the Finite Poincaré Plane Eigenfunctions on the Finite Poincaré Plane

1994-11-29

arxiv.org/abs/math/9411217v1

Mathematics

Combinatorics

Scientific paper

Let $F$ be a finite field of odd number of elements. Let $F(\sqrt{\delta})$ be its quadratic extension. $F(\sqrt{\delta})-F$ is the so-called finite Poincare plane. This paper relates the bases of eigenfunctions constructed by Evans and by Kuang. The finite Poincare plane can be viewed as a Ramanujan graph. This paper also provides evidence for Terras' conjecture regarding the asymptotic distribution of the eigenvalus of the adjacency matrices.

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