## An Analytical Approach to Polyominoes and a Solution to the Goldbach Conjecture

**Authors:** Aziz Sahraei

Always, when viewing papers whose writers show polyominoes graphically, this question crossed my mind, are there
any equations which may be given to avoid the need for drawings? Polyominoes are sometimes called by the number
of faces (like triomeno or tetraomino). In this paper, I try to formulate polyomino shapes and establish a
correspondence between them and polynominals. About the final part where I refer to the Goldbach conjecture,
I must to say that my aim is to give a geometric representation of the proof of this conjecture so that if a
special chain of subsets such as, (see paper) exists in a set Ω, where both ends of the chain include trivial
subsets, and if the conjecture be true for at least one arbitrary member of this chain, then it will be true
for all the other members of the chain.

**Comments:**
7 pages.

**Download:** **PDF**

### Submission history

[v1] 15 Feb 2011

**Unique-IP document downloads:** 179 times

**Add your own feedback and questions here:**

*You are equally welcome to be positive or negative about any paper but please be polite. If you are being critical you must mention at least one specific error, otherwise your comment will be deleted as unhelpful.*

*
*