On characterizations of the image of the Gelfand transform of commutative Banach algebras

Let R be a commutative algebra over a field k. We prove two related results on the simplicity of Lie algebras acting as derivations of R. If D is both a Lie subalgebra and R-submodule of Der k R such that R is D-simple and either char k = 2 or D is not cyclic as an R-module or D R = R, then we show

For a commutative differential algebra., , if \(p_{1}\) and \(p_{2}\) are prime ideals with \(p_{1} \subset p_{2}, p_{1} \neq p_{2}\), and \(D\left(p_{1}\right)\) not contained in \(p_{2}\), then there exists a prime ideal \(p_{3} \subset p_{2}\), with \(p_{3} \not p_{1}\) and \(p_{1} \not p_{3}\) a

The theory of stochastic processes has been traditionally developed in terms of random variables and their joint distributions. This is not surprising since the definition of a stochastic process is abstracted from numerical statistical data that are empirically observed and to which the notion of a

We determine the commutant algebra of W in the m-fold tensor product of its n natural representation in the case m F n. For m ) n, we show that the commutant algebra is of finite dimension by introducing a new kind of harmonic polynomial.

Contents. 0. Introduction. 1. The bundle algebra A. 2. Representation of the bundle algebra A. 3. The dual action and the trace. 4. The local characteristic square extended unitary group and modular automorphism group. 5. Conclusions.