Zero-one laws in finite W∗-algebras

We characterise the closure in C (R, R) of the algebra generated by an arbitrary finite point-separating set of C functions. The description is local, involving Taylor series. More precisely, a function f # C belongs to the closure of the algebra generated by 1 , ..., r as soon as it has the ``right

It is proved that any power-bounded operator of class C 1, } in a finite von Neumann algebra is conjugate to a unitary. This solves a conjecture stated by I. Kovacs in 1970. An important ingredient of the proof is the study of completely positive projections on some operator space.

In this article the interpretation of current non-linear ®nite element calculations applied to constitutive equations of evolutionary type as a system of dierential±algebraic equations is continued [P. Ellsiepen, S. Hartmann, Int. J. Numer. Methods Engrg. 51 (2001) 679]. This procedure is applied to

In the present paper, given a di usion coe cient and a curve in an exponential family, we deÿne a drift such that the density of the resulting di usion process evolves in the prescribed exponential family according to the given curve. As an application to mathematical ÿnance, we construct a family o