## On convergent-in-area polynomials in the interval [0,1]

August 13th, 2014
No comments

Take any finite or infinite polynomial which converges in area in the interval between [0,1]. We can define equivalence classes on such space by mapping them back to distinct probability distributions, such that each equivalence class with all its elements is a semigroup under a particular operation. We can extend each semigroup into a group if we incorporate an identity element and inverses. Now we've created fun to last for a lifetime! I've included these ideas in version 20 of Compendium.

There is more to come, as we spawn mathematical objects of weirdness that can be related back or extend probability theory.

Categories: Combinatorics and Probability, Group Theory, Mathematics, Quantum Mechanics