User:Masoud sheykhi

Mathematical representation of the world

By: Masoud sheykhi

Sar Cheshmeh copper complex, Kerman , Iran

Technical_inspection@nicico.com

Abstract

Let; $$ S $$ be an index set as a subset of natural numbers ;$$ N $$. We introduce a basis that generating the the world  say; $$  B =\big\{e_{j}\big\}_j\varepsilon S $$, and each element  of the set $$ B $$ is a vector that  representing one of the  cardinal characters  need  for the existence of the arbitrary object in the world. Hence ; we define each object say ; $$ O(t)$$ in the world at time $$ t $$ by the following formula; $$ O(t) = \sum_{j\varepsilon S(O(t))}c_{j(t)}*e_{j}\quad (1) $$ where, in the formula $$(1)$$ ,each index ; j belongs to an index set say;$$ S(O(t))$$ as a subset of $$ S $$.Each $$ c_{j(t)} $$ is the quantity value or the capacity of the object at time ; $$ t $$, in relation  to $$ e_{j} $$, and can  be calculated as a function of time;$$ t$$. Hence; the origin of the world defined by:$$ O(to) = \sum_{j\varepsilon S(O(to)} c_{j(to)}*e_{j} \quad (2) $$ where, in the formula $$(2)$$, $$ t_{o}$$ is the origin time which the world generated , and  each index ; $$j $$ belongs to an index set say; $$ S(O(to))$$ as a subset of $$ S $$.

For related subjects see:

http://www.fixed-point.org http://en.wikipedia.org/wiki/On_the_Plurality_of_Worlds http://www.linz.govt.nz/docs/surveysystem/survey-publication/witwaw.pdf http://www.authorhouse.com/BookStore/ItemDetail~bookid~2105.aspx http://www.edge.org/q2008/q08_4.html http://www.rbjones.com/rbjpub/philos/maths/faq007.htm