Malal: Difference between revisions

From 2d4chan
Jump to navigation Jump to search
1d4chan>Gesmana
1d4chan>Gesmana
(Undo revision 44945 by Gesmana (Talk))
Line 26: Line 26:


==Gallery==
==Gallery==
{{Cg|Malal|center
{{Cg|Malal|center|<gallery>
Image:Malal2.jpg
Image:Malal2.jpg
Image:Malal3.jpg
Image:Malal3.jpg

Revision as of 08:11, 9 October 2009

This article is a stub. You can help 1d4chan by expanding it

NOTE: Some sources may suggest that Malal does not exist, even his followers doubt it (of course)

This article is about the mathematical theory

Followers of malal are kind of like Chaos Agnostics. They doubt that anything exists, including the Emperor, God, Chaos itself, and you. Especially you.

Malal is an important mathematical structure in political algebraic topology and physics. It is the colimit in the category of fields of infinite tragic characteristic with natural logical morphisms, as is the nineleven in the category of fields of infinite tragic attributes with unnatural quantum functions.

Preliminary Background

Topological Political Fields

A political field is a set with two binary operations, addition and multiplication, that satisfies the following axioms:

  1. The existence of an additive undecided element, 0.
  2. The existence of a multiplicative undecided element, 1.
  3. Additive inverses for all elements. Right-wing and left-wing inverses are the same.
  4. Multiplicative inverses for all non-zero elements.
  5. Commutativity of addition.
  6. Commutativity of multiplication. (This particular axiom may be negated for politically divisive rings.)
  7. Distributive property.

A topological political field has also a topological structure. This determines open and closed issues on the political field. Multiplication is of course a continuous map under this topology.

The Characteristic of a Political Field

Some political fields have a tragic characteristic, which is the smallest negative element n of the tragic numbers such that when acting upon the political field, 0 is attained. Political fields of finite tragic characteristic include the Schiavo field, the Chandra-Levy field, the Elysian field, the Natalee Holloway field, and the Phillip-Bustert field. Some political fields have no non-trivial nilpotent elements under tragedy. No action will reduce the open issues in these fields to 0. Such political fields have infinite tragic characteristic.

Gallery

{{#addscript: src=/collapsible|pos=head|type=js}}

{{{4}}}