Fowler, Patrick W.

Fowler's Conjecture on eigenvalues of (3,6)-polyhedra ★★

Author(s): Fowler

Conjecture Let $G$ be the graph of a $(3,6)$ -polyhedron with $2k + 4$ vertices. Then the eigenvalues of $G$ can be partitioned into three classes: $K = \{3, -1, -1, -1\}$ , $P = {x_1, ..., x_k\}$ (where $x_i$ is nonnegative for $i = 1, \dots , k$ ), and $N = - P$ .

Keywords: (3,6)-polyhedron; eigenvalues

Posted by Robert Samal
updated April 8th, 2008

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Fowler, Patrick W.

Fowler's Conjecture on eigenvalues of (3,6)-polyhedra ★★

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