The Ultimate Globalization Game

The hands on puzzle-gaming feature is the laying of the directional / mosaic tiles upon the Universal Grid. The significant experience is the transcendence 'beyond words' through the use of form & color in a geometric paradigm where number becomes analogous to order in space. The challenge is to find 'patterns' wherein groupings of tiles yield equivalence between the cardinal and ordinal values. When extrapolated through the use of the underlying principle of recursion the matrix of permutations produces combinatorial outcomes analogous to fractal like cellular automata which can be further projected as binary trees through successive substitutions. Intuitively I sense there are applications in cryptography, information technologies or computer programming algorithms which extend beyond my practical capacity to concretely elaborate. I have however explored innumerable gaming themes employing the two sets of tiles. The 5x5 grid expands to a 9x9 and in turn 'projects' to a 10x10 ( hence includes the 8x8 Chessboard itself a projection from the 5x5). This shift between odd and even grids was the practical method of addressing incommensurability. Note that 4 groups of Ordinals having one member from each of 6 functional sets (the 8 harmonic 'chess knight moves are split into 2 symmetries) add up to 75 (x 4 =300). After the substitution of O & X harmonic values, sets [10 + 50 = 60 ] four sets of Cardinal values in turn add to 60 each in the resulting Magic Squares , hence 60 x 5 = 300. Perfect solutions are possible where the sum of a grouping of Cardinal values equal the sum of their Ordinals. The initial Ordinal Master to my knowledge has no Cardinal equivalent Magic square, at least not one of the classic Nasik symmetries employed in this illustration.

The conversion (by substitution of the harmonic determinants) of an in ideal* (PACHISI) mapping of its alpha(numeric-equivalent) ORDINAL values into its corollary Nasik 5x5 (pan-diagonal) Magic squares - that is the O and X symmetries - results in two unique mappings of numeric CARDINAL values (which also can be expressed in alpha equivalent terms) in turn results in the necessary re-mapping of their corresponding ordinals. NOTE: The CHATURANGA (Chess pre-cursor) functions have the two CARDINAL (O&X) symmetries which can be represented by choosing different ORDINAL set mappings. Consequently a 'random' mapping of the ORDINAL numbers 1-24 (could be seen as nevertheless as numeric CARDINALS which might be a non-Nasik Magic Square), once determining their ORDINAL groupings, similar comparisons can be explored. In this example O rule SYNCHRONICITY occurred for E(5) = 7(g) and G(7) = 19(t). * 4 perfect rectangular groups of 6 tiles with one member from each of the 4 functional sets with the 5th split 'lemma'-like tiles or knight moves divided into L's (leapers) an J's (jumpers). A special format has been designed for 'BINGO for DUMMYS' as an elementary introduction to 'MAGICIS', the advanced extrapolation of 'PEACEMASTER' wherein the recursion cycle acts as the gateway the 'ORIGINSZ' geometric design system opening upon the trilogy: 'OPT', 'ORBITS' & 'CORNERSTONE', each game in a classic board game which can be readily extended through computer development. Of course the colored sets of tiles make this an aesthetically pleasing puzzle game. My concern has never been whether or not the ORIGINSZ system will sell, but rather can it be sold in a manner to effect true change in the psyche of man-un-kind. We are what we play. The ultimate globalization game must become one of peace - as each player can become a master and so affect our collective fate. There has never been a time where this is more urgent: let's fly a new Flag!

M = 1 N = 2 P = 3 Q = 4 < > V = 5 W = 10 Y = 15 Z = 20
HARMONICS as the determinants of NASIK Magic Squares

rule symmetry O <> X rule symmetry

B , A , D , C = A , B , C , D = D , C , B , A

E , H , G , F = E , F , G , H = F , E , H , G

L , I , J , K = I , J , K , L = J , K , L , I

------?------ = R , S , T , U = ------?------

(The answers are available upon request - as are more questions)