A Family of Commutative Endomorphism Algebras

If \(g_{i}\) is a central sequence of unitaries in a \(\mathrm{I}_{1}\) factor, we show that under certain circumstances \(\lim _{n \rightarrow x_{i}} \operatorname{Ad}\left(\prod_{i=1}^{n} g_{i}\right)\) is an automorphism. Examples come naturally from solutions of the Yang-Baxter equation with a s

Very little is known about the existence of curves, and families of curves, whose Jacobians are acted on by large rings of endomorphisms. In this paper, we show the existence of curves X with an injection K / Ä Hom(Jac(X ), Jac(X )) Z Q, where K is a subfield of even index at most 10 in a primitive

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

In this paper we investigate the relationship between simplicial and crossed resolutions of commutative algebras.