The infinity norm bounds and characteristic polynomial for high order RK matrices

Abstract

This paper shows that tm ≤ \|A\|∞ ≤ tm holds, when A ∈ Rm × m is a Runge-Kutta matrix which nodes originating from the Gaussian quadrature that integrates polynomials of degree 2m-2 exactly. It can be shown that this is also true for the Gauss-Lobatto quadrature. Additionally, the characteristic polynomial of A, when the matrix is nonsingular, is pA(λ) = m!tm + (m-1)!am-1tm-1 + … + a0, where the coefficients ai are the coefficients of the polynomial of nodes ω(t) = (t - t1) … (t - tm) = tm + am-1tm-1 + … + a0.