Problem #PRU-30449

Problems Discrete Mathematics Algorithm Theory Game theory Symmetric strategies

Problem

There are twenty dots distributed along the circumference of circle. Consider the game with two players where: in one move a player is allowed to connect any two of the dots with a chord (aline going through the inside of the circle), as long as the chord does not intersect those previously drawn. The loser is the one who cannot make a move. Which player wins?