Centralizers on semiprime rings

Joso Vukman

Displaying similar documents to “Centralizers on semiprime rings”

On the vanishing of Iwasawa invariants of absolutely abelian p-extensions

Gen Yamamoto (2000)

Acta Arithmetica

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1. Introduction. Let p be a prime number and $ℤ_{p}$ the ring of p-adic integers. Let k be a finite extension of the rational number field ℚ, $k_{\infty}$ a $ℤ_{p}$ -extension of k, $k_{n}$ the nth layer of $k_{\infty} / k$ , and $A_{n}$ the p-Sylow subgroup of the ideal class group of $k_{n}$ . Iwasawa proved the following well-known theorem about the order $A_{n}$ of $A_{n}$ : Theorem A (Iwasawa). Let $k_{\infty} / k$ be a $ℤ_{p}$ -extension and $A_{n}$ the p-Sylow subgroup of the ideal class group of $k_{n}$ , where $k_{n}$ is the $n$ th layer of $k_{\infty} / k$ . Then there exist integers $λ = λ (k_{\infty} / k) \geq 0$ , $μ = μ (k_{\infty} / k) \geq 0$ , $ν = ν (k_{\infty} / k)$ , and n₀ ≥ 0...

Guidance properties of a cylindrical defocusing waveguide

Oldřich John, Charles A. Stuart (1994)

Commentationes Mathematicae Universitatis Carolinae

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We discuss the propagation of electromagnetic waves of a special form through an inhomogeneous isotropic medium which has a cylindrical symmetry and a nonlinear dielectric response. For the case where this response is of self-focusing type the problem is treated in [1]. Here we continue this study by dealing with a defocusing dielectric response. This tends to inhibit the guidance properties of the medium and so guidance can only be expected provided that the cylindrical stratification...

Baireness of $C_{k} (X)$ for ordered $X$

Michael Granado, Gary Gruenhage (2006)

Commentationes Mathematicae Universitatis Carolinae

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We show that if $X$ is a subspace of a linearly ordered space, then $C_{k} (X)$ is a Baire space if and only if $C_{k} (X)$ is Choquet iff $X$ has the Moving Off Property.

A note on evaluations of some exponential sums

Marko J. Moisio (2000)

Acta Arithmetica

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1. Introduction. The recent article [1] gives explicit evaluations for exponential sums of the form $S (a, p^{α} + 1) : = \sum_{x \in_{q}} χ (a x^{p^{α} + 1})$ where χ is a non-trivial additive character of the finite field $_{q}$ , $q = p^{e}$ odd, and $a \in *_{q}$ . In my dissertation [5], in particular in [4], I considered more generally the sums S(a,N) for all factors N of $p^{α} + 1$ . The aim of the present note is to evaluate S(a,N) in a short way, following [4]. We note that our result is also valid for even q, and the technique used in our proof can also be used to evaluate...

An identity related to centralizers in semiprime rings

Joso Vukman (1999)

Commentationes Mathematicae Universitatis Carolinae

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The purpose of this paper is to prove the following result: Let $R$ be a $2$ -torsion free semiprime ring and let $T : R \to R$ be an additive mapping, such that $2 T (x^{2}) = T (x) x + x T (x)$ holds for all $x \in R$ . In this case $T$ is left and right centralizer.

Displaying similar documents to “Centralizers on semiprime rings”

On the vanishing of Iwasawa invariants of absolutely abelian p-extensions

Guidance properties of a cylindrical defocusing waveguide

Baireness of C k ( X ) for ordered X

A note on evaluations of some exponential sums

An identity related to centralizers in semiprime rings

Baireness of $C_{k} (X)$ for ordered $X$