Higher order corrected trapezoidal rules in Lebesgue and Alexiewicz spaces

Abstract

If f\!:\![a,b] such that f(n) is integrable then integration by parts gives the formula align* &∫ab f(x)\,dx = &(-1)nn!Σk=0n-1(-1)n-k-1[ ϕn(n-k-1)(a)f(k)(a)- ϕn(n-k-1)(b)f(k)(b)] +En(f), align* where ϕn is a monic polynomial of degree n and the error is given by En(f)=(-1)nn!∫ab f(n)(x)ϕn(x)\,dx. This then gives a quadrature formula for ∫abf(x)\,dx. The polynomial ϕn is chosen to optimize the error estimate under the assumption that f(n)∈ Lp([a,b]) for some 1≤ p≤∞ or if f(n) is integrable in the distributional or Henstock--Kurzweil sense. Sharp error estimates are obtained. It is shown that this formula is exact for all such ϕn if f is a polynomial of degree at most n-1. If ϕn is a Legendre polynomial then the formula is exact for f a polynomial of degree at most 2n-1.