On regular extensions of operator systems.

Extensions of Regular ‎Rings‎

Let $R$ be an associative ring with identity. An element $x in R$ is called $mathbb{Z}G$-regular (resp. strongly $mathbb{Z}G$-regular) if there exist $g in G$, $n in mathbb{Z}$ and $r in R$ such that $x^{ng}=x^{ng}rx^{ng}$ (resp. $x^{ng}=x^{(n+1)g}$). A ring $R$ is called $mathbb{Z}G$-regular (resp. strongly $mathbb{Z}G$-regular) if every element of $R$ is $mathbb{Z}G$-regular (resp. strongly $...

extensions of regular ‎rings‎

let $r$ be an associative ring with identity. an element $x in r$ is called $mathbb{z}g$-regular (resp. strongly $mathbb{z}g$-regular) if there exist $g in g$, $n in mathbb{z}$ and $r in r$ such that $x^{ng}=x^{ng}rx^{ng}$ (resp. $x^{ng}=x^{(n+1)g}$). a ring $r$ is called $mathbb{z}g$-regular (resp. strongly $mathbb{z}g$-regular) if every element of $r$ is $mathbb{z}g$-regular (resp. strongly $...

Extensions of Infinite Partition Regular Systems

A finite or infinite matrixA with rational entries (and only finitely many non-zero entries in each row) is called image partition regular if, whenever the natural numbers are finitely coloured, there is a vector x, with entries in the natural numbers, such that Ax is monochromatic. Many of the classical results of Ramsey theory are naturally stated in terms of image partition regularity. Our a...

Operator Extensions on Hilbert Space

On ^-regular Extensions of Local Fields1

1. Let A be a complete field with respect to a discreet valuation,2 and suppose that the residue class field of K is finite and has characteristic p. A group which is finite and whose order is not divisible by p is said to be ^-regular. A normal extension of A whose Galois group is ^-regular will be called a ^-regular extension of K. The object of this paper is to characterize those groups whic...