Introduction To The Mathematics Of Enhancing

INTRODUCTION TO THE MATHEMATICS OF ENHANCING Systematization intrinsic correlation between systems, multidimensional, and metric swings us towards the creation of a mathematical accretion metric multidimensional nonlinear variable and discontinuous that we have:

A

accretion in which defines the logical operations x + xn etc.

A

f(x)i,j,k,… n =0

A

f(x)i,j,k,…n ≠0

0 point, U all

i,j,k,…n-1 called Call coexion

that En=E i,j,k,…n is the largest dimension

A

n>

En= environment f(x)i,j,k,…n ><0 to En when a relative maximum or

minimum En. Call density when En or

f(x)i,j,k,…n ><0 are a absolute maximum

up at least one in a point. Call generators f(x)i,j,k,…n ><0 to all

f(x)i,j,k,…n ≠0 throghout all U f(x)i,j,k,…n ≠0 such that

It said the accretion metrics any

(f(x)i,j,k,…n)2 ≠0 and φ≠0 argument iD≠0 intrinsic metric. With this we see that the

|1|2=1

with a single divider 0| |

system is an accretion with Euclidean metric 1 operation

of

this

division

with

0

is

then the

impossible,

with

1

respect to the amount by the operator ± x n , x n , etc,

φ=1

iD= 1 + 1…n 1.1=1

1 single identical term

With a single identical, dense with, generators and maximum relative. Then we define our work:

iD= 3n

φn Cosnφ Senn φ n= 0,1,2,3,4..n

n= 0,1,2,3,4,n

metrics

n

n= 1,2,3,4,5…n

3 1

ie is a multidimensional variable multiforme, dense with infinite divisors of zero, with the same element, generators and maximum and minimum absolute and relative to zero as the divisor involved.