Mathematical representation of the world
By: Masoud sheykhi
Sar Cheshmeh copper complex , Kerman , Iran
Let; be an index set as a subset of natural numbers ;. We introduce a basis that generating the the world say; , and each element of the set 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 ; in the world at time by the following formula; where, in the formula ,each index ; j belongs to an index set say; as a subset of .Each is the quantity value or the capacity of the object at time ; , in relation to , and can be calculated as a function of time; . Hence; the origin of the world defined by: where, in the formula , is the origin time which the world generated , and each index ; belongs to an index set say; as a subset of .
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