# User:Masoud sheykhi

Mathematical representation of the world

By: Masoud sheykhi

Sar Cheshmeh copper complex , Kerman , Iran

Technical_inspection@nicico.com

Abstract

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

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