Group relationships and homomorphisms of Boolean matrix semigroups

By TAKAYUKI TAMURA of Davis/Calif. (Eingegangen am 12. 6. 1972) \*) This paper was presented a t the meeting of American Mathematical Society at Berkeley, April 22, 1972.

In this paper we deal with the symmetry group S f of a boolean function f on n-variables, that is, the set of all permutations on n elements which leave f invariant. The main problem is that of concrete representation: which permutation Ž . groups on n elements can be represented as G s S f for some

In a recent paper (Trans. Amer. Math. Soc. 349 (1997), 4265-4310), P.G. Trotter and the author introduced a "regular" semidirect product U \* V of e-varieties U and V. Among several specific situations investigated there was the case V = RZ, the e-variety of right zero semigroups. Applying a coverin

It is shown within Bishop's constructive mathematics that, under one extra, classically automatic, hypothesis, a continuous homomorphism from R onto a compact metric abelian group is periodic, but that the existence of the minimum value of the period is not derivable.

We prove that all continuous convolution semigroups of probability distributions on an arbitrary Lie group are injective. Let [+ t , t>0] be a continuous convolution semigroup of probability distributions on a Lie group G. For each t>0, we set T t f (x)= G f (xy) + t (dy) for a bounded continuous fu