Danzer's configuration

In mathematics, Danzer's configuration is a self-dual configuration of 35 lines and 35 points, having 4 points on each line and 4 lines through each point. It is named after the German geometer Ludwig Danzer and was popularised by Branko Grünbaum.Template:Sfnp The Levi graph of the configuration is the Kronecker cover of the odd graph O₄,Template:Sfnp and is isomorphic to the middle layer graph of the seven-dimensional hypercube graph Q₇. The middle layer graph of an odd-dimensional hypercube graph Q_2n+1(n,n+1) is a subgraph whose vertex set consists of all binary strings of length 2n + 1 that have exactly n or n + 1 entries equal to 1, with an edge between any two vertices for which the corresponding binary strings differ in exactly one bit. Every middle layer graph is Hamiltonian.Template:Sfnp

Danzer's configuration DCD(4) is the fourth term of an infinite series of ${\displaystyle ({(\genfrac{}{}{0ex}{}{2n-1}{n})}_n)}$ configurations DCD(n), where DCD(1) is the trivial configuration (1₁), DCD(2) is the trilateral (3₂) and DCD(3) is the Desargues configuration (10₃). In Template:Sfnp configurations DCD(n) were further generalized to the unbalanced ${\displaystyle ({(\genfrac{}{}{0ex}{}{n}{d})}_d,{(\genfrac{}{}{0ex}{}{n}{d-1})}_{n-d+1})}$ configuration DCD(n,d) by introducing parameter d with connection DCD(n) = DCD(2n-1,n). DCD stands for Desargues-Cayley-Danzer. Each DCD(2n,d) configuration is a subconfiguration of the ${\displaystyle (2_{2n+1}^{2n})}$ Clifford configuration. While each DCD(n,d) admits a realisation as a geometric point-line configuration, the Clifford configuration can only be realised as a point-circle configuration and depicts the Clifford's circle theorems.

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• Miquel configuration
• Reye configuration

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