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 274

K. Engelborghs and D. Roose
Numerical computation of stability and detection of Hopf bifurcations of steady state solutions of delay differential equations

Abstract

The characteristic equation of a system of delay differential equations (DDEs) is a nonlinear equation with infinitely many zeros. The stability of a steady state solution of such a DDE system is determined by the number of zeros of this equation with positive real part. We present a numerical algorithm to compute the rightmost, i.e. stability determining, zeros of the characteristic equation. The algorithm is based on the application of subspace iteration on the time integration operator of the system or its variational equations. The computed zeros provide insight in the systems behaviour, can be used for robust bifurcation detection and for efficient indirect calculation of bifurcations points.