Let's discover epiphany together:

"Ramsey theory, named after the British mathematician and philosopher Frank P. Ramsey, is a branch of mathematics that studies the conditions under which order must appear. Problems in Ramsey theory typically ask a question of the form: "how many elements of some structure must there be to guarantee that a particular property will hold?" More specifically, Ron Graham describes Ramsey theory as a "branch of combinatorics"."

"Van der Waerden's theorem is a theorem in the branch of mathematics called Ramsey theory. Van der Waerden's theorem states that for any given positive integers r and k, there is some number N such that if the integers {1, 2, ..., N} are colored, each with one of r different colors, then there are at least k integers in arithmetic progression all of the same color. The least such N is the Van der Waerden number W(r, k). It is named after the Dutch mathematician B. L. van der Waerden."

"In Ramsey theory, Schur's theorem states that for any partition of the positive integers into a finite number of parts, one of the parts contains three integers x, y, z..."

Let me save you a billion brain cells. You will find that for every predictor that you submit to, with your mathematical bet selection process, no matter how good it is in figures, you will discover in long run testing that three primary results will permeate your data that you assemble. It will flow thru states of being very favorable to the player, moderate to flat for the player, and last but not least, it will flow thru states of very bad for the player. So "WHEN" must come to mind as a factor in any final permutation of an original idea in your final math theory. I hope that you find that to bet true as well.