A new set of commutative rings

[gertvoerman]

Let S={R,+,*} be the ring on which the constructed rings are being constructed. R stands for the numbers in the ring S. I have constructed a commutative ring T[P] ={R[P],+[P],*[P]) for each parameters P. The main operation is substitution. It turns out that T[P] is a ring-homorphism. Thus for every X,Y a element of the set of numbers R the result is:

. . .X[P](+[P])Y[P]=(X+Y)[P]

. . .X[P](*[P])Y[P]=(X*Y)[P]

I want to make my solution public and write it in a mathematical way down. Please contact me and give me your email. I will then send you a WORD- and MATHEMATICA-file with the results.

Thanks and by,
Gert Voerman

 

[stapel]

If you are wanting to publish your result, then you need to contact a mathematical journal (probably one specific to your subject area), not a math tutoring forum.

Good luck.

Eliz.