A Note on the Inverse Laplace Transformation of f(t)

Abstract

Let L\f(t)\ = ∫0∞e-stf(t)dt denote the Laplace transform of f. It is well-known that if f(t) is a piecewise continuous function on the interval t:[0,∞) and of exponential order for t > N; then s∞F(s) = 0, where F(s) = L\f(t)\. In this paper we prove that the lesser known converse does not hold true; namely, if F(s) is a continuous function in terms of s for which s∞F(s) = 0, then it does not follow that F(s) is the Laplace transform of a piecewise continuous function of exponential order.