Suppose we are given a cube and we add a pair of crossing edges inside each of its faces. It is clear that this drawing has 6 crossings. My question is whether such a graph has crossing number 6? How to prove or disprove it?
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What is the crossing number of dodecahedron with a copy of $K_5$ inside each face
Yes, the crossing number is $6$.
In general if a graph with $V$ vertices and $E$ edges can be drawn without crossings then $E \leq 3V-6$, by a familiar application of Euler's formula $V-E+F = 2$: there are $F = E-V+2$ faces; but each edge separates $2$ faces while each face has at least $3$ sides; so $$ 2E \geq 3F = 3(E-V+2) = 3E - (3V-6), $$ whence $E \leq 3V-6$ as claimed.
Now if the graph can be drawn with $c$ crossings then we can remove $c$ of the edges to obtain a graph with $V$ vertices, $E-c$ edges, and a crossing-free drawing. Therefore $c \geq E - 3V + 6$.
Your graph has $V=8$ and $E=24$, so $c \geq 24 - 3 \!\cdot\! 8 + 6 = 6$, QED.
