Order Evaluation of Products of Subsets in Finite Groups and Its Applications, I

We shall describe an algorithm based on an idea of Roggenkamp and Scott (Roggenkamp and Scott, 1993) ) to compute \(\mathrm{Hom}_{\text {alg }}(\mathbb{F} H, \mathbb{F} G\) ), where \(H, G\) are finite \(p\)-groups and \(\mathbb{F} H, \mathbb{F} G\) are their group algebras over \(\mathbb{F}=\mathbb

We present an algorithm for determining the Fitting subgroup of a polycyclicby-finite group. As applications we describe methods for calculating the centre and the FC-centre and for exhibiting the nilpotent-by-abelian-by-finite structure of a polycyclic-by-finite group.

In electromagnetic field analysis, a systematic method of construction is presented for higher-order vector elements without respect to order. From the Helmholtz theorem, the vector basis functions are chosen. From the similarity with the scalar elements, the shape functions are determined by assign

## Abstract The method is based on the determination of the content of fish meat of soluble, non‐heat‐precipitable protein which is brought in relation to the total amount of sarcoplasmic protein. The method is also suited to evaluate the freshness of iced fish where other procedures sometimes fail