Hans Günzler

Copyright © 1999 Hans Günzler. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

In Section 1 relations between various forms of Landau inequalities ‖y(m)‖n≤λ‖y‖n−m‖y(n)‖m and Halperin–Pitt inequalities ‖y(m)‖≤ε‖y(n)‖+S(ε)‖y‖ are discussed, for arbitrary norms, intervals and Banach-space-valued y. In Section 2 such inequalities are derived for weighted LP-norms, Stepanoff- and Orlicz-norms.

With this, Esclangon–Landau theorems for solutions y of linear neutral delay difference- differential systems are obtained: If y is bounded e.g. in a weighted LP- or Stepanoff-norm, then so are the y(m). This holds also for some nonlinear functional differential equations.