Navigation

• Education
  • International programmes
  • Faculties
  • ECTS
  • Vision and policy
• Research
  • Research at KU Leuven
  • Support and funding
  • Industry and Society
  • Phd
  • Postdoc researcher
  • Output and impact
  • Networking
  • Vision and policy
• Admissions
  • How to apply
  • Scholarships
  • Degree seeking students
  • Non-degree seeking students
  • Doctoral students
  • Reseachers
  • Short term study visits
  • Prepare your stay
• Living in Leuven
  • Welcome activities
  • News and agenda
  • Student Services
  • Housing
  • Insurance
  • Sports and culture
  • Student organisations
• About KU Leuven
  • Mission statement
  • Facts and figures
  • International networks
  • Development Cooperation
  • Academic Calendar
  • Alumni
  • Fundraising
  • Services and support
  • Boards and councils
  • News and press
  • Jobs

TW 530

Adhemar Bultheel, Ruymán Cruz-Barroso, and Marc Van Barel
On Gauss-type quadrature formulas with prescribed nodes anywhere on the real line

Abstract

In this paper, quadrature formulas on the real line with the highest degree of accuracy, with positive weights, and with one or two prescribed nodes anywhere on the interval of integration are characterized. As an application, the same kind of rules but with one or both (finite) endpoints being fixed nodes and one or two more prescribed nodes inside the interval of integration are derived. An efficient computation of such quadrature formulas is analyzed by considering certain modified Jacobi matrices. Some numerical experiments are finally presented.