A funny topological problem
Here is a funny (I hope) home-made problem just for you guys :
Is there an ice cube such that, when it melts, the number of its connex components at a given instant t is 2 if t is rationnal, 1 otherwise ?
Precisions :
We suppose that this ice cube is a closed subset of R³.
We also suppose that the melting begins at t=0, and that after a delay t, all that remain of the ice cube A is every points x of A such that distance(x, surface A)>=t
Can you also find an ice cube in 2D having this property ?
AI couldn't solve it ! But your creativity can !
u/joe_la_bernique — 1 day ago