On the Algebraic Properties of Errors

In this paper the different algebraic varieties that can be generated from multiple view geometry with uncalibrated cameras have been investigated. The natural descriptor, V , to work with is the image of / in /;/;2;/ under a corresponding product of projections, (A ;A ;2;A K ). Another descriptor,

Let N/M be an inclusion of von Neumann algebras with a conditional expectation E: M Ä N satisfying the finite index condition of [PiPo], i.e., there exists c>0 such that E(x) cx, \x # M + . In [Po4] we proved that such inclusions N/M satisfy the relative version of Dixmier's property, namely for any

We prove a fundamental case of a conjecture of the first author which expresses the homology of the extension of the Heisenberg Lie algebra by C½t=ðt kþ1 Þ in terms of the homology of the Heisenberg Lie algebra itself. More specifically, we show that both the 0th and ðk þ 1Þth x-graded components of

## Abstract When any process of measuring is considered, one of the basic questions is how to assess the precision of measurement methods and/or instruments. In this paper, this question is formulated and solved as a problem of tolerance regions for absolute and relative normaly distributed errors