THEOCEPTS

0FILE ch2.THEOCEPTS Updated 9:48 am April 30, 1992 Updated 12:51 pm November 7, 1991 Dated 2:35 pm October 10, 1988

THEOCEPTS topics to cover what is a theocept Why do we need them? What are the rule concerning their use?

The box operator is the delineation of a concept or theory. It is represented by brackets in writing or the box. What the bracket represents is an infinitely dimensional matrix.There are also an infinite amount of compartments in this infinite dimensional matrix. In the middle of the matrix at point 0,0,... is located the matrix compartment that contains the name of the concept / theory or theocept. Each compartment in this epistemological matrix is call a compartrix. Each compartrix has a location defined in the same way as a point in N dimensional space. The information that is contained in each compartrix can be of any type. For example, it can be a name, number, theocept, written information, pictures, shapes, equations, algorithms, computer programs, etc. Many types of knowledge do not readily combine to form other knowledge. There exists many types of theocepts. There are the simplest types that only hold a name. They are called nominal theocepts. Then there are theocepts that contain a finite amount of knowledge or compartrixes filled. They are called limited or finite theocepts. Theocepts that contain in compartrixes other theocepts, are called recursive theocepts. If a theocept contains in one or more of its compartrixes itself, it is called a self recursive theocept. A self recursive theocept is an infinitely recursive theocept. Any theocept that contains a self recursive theocept is an infinitely recursive theocept. A theocept that contains only numbers is called a numerical theocept or numeocept. A totally relational theocept is called a reocept-- a relational theoretical concept. Theocepts that contain compartrixes that have integer indices are called natural indexed theocepts or natheocepts. If a theocept contain compartrixes with fractional indices is called a fractional indexed theocept or fratheocepts. A theocept with real indices it is called a real indiced theocept or reatheocept. A theocept that has a system for the indices and is processed is called a system indiced theocept or sytheocept. A pictorial pattern for the indiced is called a patterned indiced theocept or patheocept. A theocept that is indiced by a concept other than the ones mentioned is called a contheocept. A simple theocept is one that has in all pertaining compartrixes the same entity. A trivial theocept is also a simple theocept because only one compartrix has any entity the rest are blank and have no effect on any calculation. all single numbers are simple theocepts

The entity in a compartrix is an intrix

A theocept by itself makes a complete statement. Although maybe only a trivial one. Two theocepts tied together with an equivalent reocept forms an epistemological equation. A reocept is important in defining how each compartrix is modified. The reocept [+] has the make up such that each compartrix has a + relation in it. When it relates two numbers it acts like addition. When it relates two theocepts it breaks them down into compartrixes again.

This is an epistemological equation: [w] [=] [q] It is the simple reduction equation. It means that each intrix in the same position in [w] is equal to each intrix in that position in [q].

Theocepts can also contain information about maps of theocepts. This is like knowledge of knowledge. For example, an intrix can be an indices for a particular compartrix It can also contain the entire mapping of a theocept. What is a theocept mapping? It is the complete mapping of a theocept's contents and their placement. It can be contained within one or more compartrixes. A theocept with a mapping of itself is called a well defined theocept. the mapping can be either finite or infinite in structure and content.An infinite mapping can sometimes be reducible to a finite mapping. They are called reducibly infinite mapping.

The structure of a theocept is such that around any compartrix there lies a theoceptic structure. This is achieved by allowing real numbers to define places and dimensions. Take the place 0,0,.. there exists an infinite structure of points that lie around 0,0,... but less than 1,1,..., and 1,0,..., and 0,1,0,... etc. these points in one dimension are for example, 1/2,0,...., 1/3,0,..., 1/4,0,... etc. Of course this process can be carried out in every dimension. The dimensions don’t need to be whole numbers. so instead of dimension 1 or the X axis as in the previous example we can have dimension 1.2 or 1.234 or any real number.

GLOSSARY CH2.THEOCEPTS

Theocept, a theoretical concept, theo - cept.

Compartrix, A concatenation of the words compartment and matrix A matrix of compartments.

Intrix, the contents of a compartrix.

Theoceptic, pertaining to theocepts.

Reocept, A relation theocept.

Demecept, a dimensional theocept.

Relacept, a relational theocept.

Theopoint, a point in a theocept.

Theopath, a path through a theocept that can include any or all. parts

Theofield, a field within a theocept.

Theovenue, a part of a theocept that is defined by some concept.

Theoceptology the scientific study of theocepts

Mathematical theoceptology the mathematical study of theocepts.