Each point in a circle is colored in one of 3 colors (blue, White, or red). Prove that one can find points that are vertices of an isosceles triangle, and either 3 points are all colored with the same color or three points are colored with 3 different colors.
I have no clue were to start, I think i have to apply pigeon hold principle to this questions along with Sperners lemma but i have no idea where to begin.
Any help is appreciated.
Assume otherwise and consider a regular pentagon $ABCDE$ of the circle. By pigeonhole we find a monochromatic edge or diagonal. Note that any triangle with vertices $\in\{A,B,C,D,E\}$ is isosceles (there are only two lengths: edge and diagonal). If any of the colours occurs three times, this gives us a monochromatic isosceles triangle. Hence we may assume that each colour occurs at most twice. Then each colour occurs at least once. This gives us a trichromatic isosceles triangle.