A Further Property of Functions in Class B(m)

Abstract

We say that a function α(x) belongs to the set A(γ) if it has an asymptotic expansion of the form α(x) Σ∞i=0αixγ-i as x∞, which can be differentiated term by term infinitely many times. A function f(x) is in the class B(m) if it satisfies a linear homogeneous differential equation of the form f(x)=Σmk=1pk(x)f(k)(x), with pk∈ A(ik), ik being integers satisfying ik≤ k. These functions have been shown to have many interesting properties, and their integrals ∫∞0 f(x)\,dx, whether convergent or divergent, can be evaluated very efficiently via the Levin--Sidi D(m)-transformation. (In case of divergence, they are defined in some summability sense, such as Abel summability or Hadamard finite part or a mixture of these two.) In this note, we show that if f(x) is in B(m), then so is (f g)(x)=f(g(x)), where g(x)>0 for all large x and g∈ A(s), s being a positive integer. This enlarges the scope of the D(m)-transformation considerably to include functions of complicated arguments. We demonstrate the validity of our result with an application of the D(3) transformation to two integrals I[f] and I[f g], for some f∈ B(3) and g∈ A(2).