The Non-commutative Flow of Weights on a Von Neumann Algebra

## Abstract We classify the compatible left‐symmetric algebraic structures on the Witt algebra satisfying certain non‐graded conditions. It is unexpected that they are Novikov algebras. Furthermore, as applications, we study the induced non‐graded modules of the Witt algebra and the induced Lie alg

## Abstract In a recent paper, the weighted essentially non‐oscillatory (WENO) numerical scheme was applied to solve a multi‐class Lighthill–Whitham–Richards (MCLWR) traffic flow model (__J. Comput. Phys.__ 2003; **191**:639–659). We discuss and present an enhanced WENO scheme with Lax–Friedrichs f

We prove that the total space E of an algebraic affine C -bundle π : E → X on the punctured complex affine plane X := C 2 -{(0, 0)} is Stein if and only if it is not isomorphic to the trivial holomorphic line bundle X × C . ## 0. Introduction Let π : E → X be a holomorphic affine C -bundle on the