Itovenue mathematics 1

File itovenue mathematics

01:24 am Monday, March 26 2001

the mathematics of itovenues

itovenues is the name for all types of groupings of itopaths

WE can group itovenues into any grouping of itopaths. Itovenues can be empty sets.

We can take a sieve concepts for a region of itospace. This means a separating algorithm for a grouping of itopaths where some will be included and some will be excluded.

Why might we want to have grouping of itopaths? Around any itopath will be paths of functioning and consciousness that we might want to include in a grouping because it defines a specific potential person or aspects of a person.

So we have a sumation of a a groping from one or more concepts in a space

so in mathematics we will define the equation as such

IV fi3IP(~1n, Ct1n)

The itovenue is defined as a summation of itopaths from one or more itofields defined with one or more grouping concepts concept.

The symbol defines ~

The fields can be defined with many different characteristics. If it is a well defined solid field we can use this symbol Ä.

Each field can have boundaries and other defining characteristics

IV fi3IP(Ä, Ct) this means that the Itovenue is defined over the entire itofield by one concept

When we do not include any information about the field we assume that we are dealing with the itofield that include all itopaths. The problem with this is that like with numbers there are different kinds of fields for instance a field of real numbers complex, imaginary, natural rational. Then we can have fields that correspond to different levels of infinity. Usually we consider an n-dimensional field of real numbers but we could consider an n-dimensional natural number infinite field. In both the fields there are a finite natural number of dimensions. We could have an infinite amount of dimensions or real numbers of dimensions. We could also have a complex space with both real and imaginary numbers rather than just a real space.

There are an infinite amount of infinities each infinity larger than the one that comes before it. Each infinity will create a different type of number field. How do you linearly order the numbers of the next infinity after the real number infinity? One way is to order as single doubles triples etc So the first would be all the reals then comes all the combinations of the real in to two numbers pairs then three number pairs etc. So you have put the all infinite dimensional combinations into a line.

If we can break a line into a real infinite number we can also break exponents into real infinite numbers. So we can not only have 2 to the 3rd power we can have 2 to the pi power. We can apply this to dimensions we can have three dimensions and we can have pi dimensions. If a two dimension is a paring of two numbers then what is a 2.1 dimension. Does it combine 2.1 numbers or is it

We can define itovenues and itofields with actual and potential itopaths

scrap heap and parts for equations

s Çä˙ÉÑÄ crap

for

Equation 1.3.P(D12)

Ori(O,U,E,D1,T,S, C) =P= Cid(O,U,E,D2,T,S, C) If we change just the placement of the original and its name it should not effect it’s being physically identical.