Convolutions with the continuous primitive integral

Abstract

If F is a continuous function on the real line and f=F' is its distributional derivative then the continuous primitive integral of distribution f is ∫abf=F(b)-F(a). This integral contains the Lebesgue, Henstock--Kurzweil and wide Denjoy integrals. Under the Alexiewicz norm the space of integrable distributions is a Banach space. We define the convolution f g(x)=∫inf f(x-y)g(y) dy for f an integrable distribution and g a function of bounded variation or an L1 function. Usual properties of convolutions are shown to hold: commutativity, associativity, commutation with translation. For g of bounded variation, f g is uniformly continuous and we have the estimate \|f g\|∞≤ \|f\|\|g\| where \|f\|=I|∫If| is the Alexiewicz norm. This supremum is taken over all intervals I⊂. When g∈ L1 the estimate is \|f g\|≤ \|f\|\|g\|1. There are results on differentiation and integration of convolutions. A type of Fubini theorem is proved for the continuous primitive integral.