The fundamental theorem of vector relative invariants

After the fundamental theorem for nonregular reductive prehomogeneous vector spaces was proved by A. Gyoja (Tsukuba J. Math. 14 (1990), 437-457), the construction of the theory of nonregular prehomogeneous vector spaces became an interesting problem. However, only Sp n × GL 2 1 ⊗ 2 1 M 2n 3 is known

## Introduction Let V be a set, and call the elements of V voters or players. A subset A V is called a coalition. The compliment V&A of a coalition A is denoted A . A set of coalitions S is a game if all supersets of winning coalitions are winning as well. A coalition A V is said to be blocking (

The work of al-F~risi on amicable numbers begins with nine propositions of elementary number theory. The purpose of this article is to produce an English translation of these propositions and to provide a commentary on al-Ffirisi's methods. In particular we consider whether he proved, or attempted t

that if G is a finite group with a subgroup H of finite index n, then the nth power Ž . n Ž . of the Schur multiplier of G, M G , is isomorphic to a subgroup of M H . In this paper we prove a similar result for the centre by centre by w variety of groups, where w is any outer commutator word. Then u

## Abstract In [This Zeitschrift 25 (1979), 45‐52, 119‐134, 447‐464], Pavelka systematically discussed propositional calculi with values in enriched residuated lattices and developed a general framework for approximate reasoning. In the first part of this paper we introduce the concept of generaliz