The Jones Polynomial and Certain Separable Frobenius Extensions

We first prove the double coset separability of certain HNN extensions with cyclic associated subgroups. Using this we prove a criterion for the conjugacy separability of HNN extensions of conjugacy separable groups with cyclic associated subgroups. Applying this result we show that certain HNN exte

studied the expansion of the colored Jones polynomial of a knot in powers of q &1 and color. They conjectured an upper bound on the power of color versus the power of q &1. They also conjectured that the bounding line in their expansion generated the inverse Alexander Conway polynomial. These conjec

## Abstract A method is described for the extraction and chromatographic separation of tocopherol from pasture. Extraction is carried out using acetone in the cold, and separation is effected by means of double chromatography on magnesia and alumina. Estimation is colorimetric. The method is simple

## Abstract An analysis is given of various aspects of the design of crystallization‐based separation processes. A literature review is included for each of the different themes treated in the study. Special emphasis is placed on the usefulness of the relative composition diagram as a tool for iden

be two sequences of events, and let & N (A) and & M (B) be the number of those A i and B j , respectively, that occur. We prove that Bonferroni-type inequalities for P(& N (A) u, & M (B) v), where u and v are positive integers, are valid if and only if they are valid for a two dimensional triangular