Approximation of Integrated Semigroups by "Integrated" Discrete Parameter Semigroups

The present paper deals with the problem of approximation of a continuous parameter semigroup \(T(t), t>0\) on a Banach space \(X\) by means of a sequence of discrete parameter semigroups \(\left(F_{n}^{k}\right)\), where \(F_{n}\) is a bounded operator on a Banach space \(X_{n}, n \in N\), and wher

Let [ f m ; m # N] be a sequence of functions from [0, ) to a Banach space E. We give a new and essential condition on f m , which is weaker than the usual ``local Lipschitz continuity'' condition, ensuring that the convergence of f m is equivalent to the convergence of their Laplace transforms. Thi

It is proved that both the Bass cyclic and bicyclic units generate a subgroup of Ž . finite index in U U ZS , assuming S is a finite semigroup such that QS is semisimple Artinian and does not contain certain types of simple components. ᮊ 1996 Aca- demic Press, Inc.

This paper seeks ring-theoretic conditions of an integral domain R that reflect in the Clifford property or Boolean property of its class semigroup S(R), that is, the semigroup of the isomorphy classes of the nonzero (integral) ideals of R with the operation induced by multiplication. Precisely, in