In geometry, the Egan conjecture gives a sufficient and necessary condition for the radii of two spheres and the distance of their centers, so that a simplex exists, which is completely contained inside the larger sphere and completely encloses the smaller sphere. The conjecture generalizes an equality discovered by William Chapple (and later independently by Leonhard Euler), which is a special case of Poncelet's closure theorem, as well as the Grace–Danielsson inequality in one dimension higher.
The conjecture was proposed in 2014 by the Australian mathematician and science-fiction author Greg Egan. The "sufficient" part was proved in 2018, and the "necessary" part was proved in 2023.
For an arbitrary triangle (
2
r
R
d
d2=R(R-2r)
which was published by William Chapple in 1746 and by Leonhard Euler in 1765.
For two spheres (
2
r
R
r<R
3
d
d2\leq(R+r)(R-3r)
This result was independently proven by John Hilton Grace in 1917 and G. Danielsson in 1949. A connection of the inequality with quantum information theory was described by Anthony Milne.[1]
Consider
n
Rn
n\geq2
n-1
r
R
r<R
n
d
d2\leq(R+(n-2)r)(R-nr)
The conjecture was proposed by Greg Egan in 2014.[2]
For the case
n=1
d\leqR-r
0
1
1
0
|d-r|
d+r
Greg Egan showed that the condition is sufficient under a blog post by John Baez in 2014. They were lost due to a rearrangement of the website, but the central parts were copied into the original blog post. Further comments by Greg Egan on 16 April 2018 concern the search for a generalized conjecture involving ellipsoids. Sergei Drozdov published a paper on ArXiv showing that the condition is also necessary in October 2023.[3]