The structure of interference functions and comprehensive sets

Martin Schubert, Holger Boche

Research output: Chapter in Book/Report/Conference proceedingChapterpeer-review

Abstract

In the previous chapters we have introduced and motivated the analysis of interference-coupled systems by means of SIR and QoS regions. Since the QoS is defined as a strictly monotone and continuous function (2.36), both QoS and SIR regions are bijective, i.e., they can be mapped into each other in such a way that the mapping can be inverted without loss of information. Thus, we can learn about the structure of QoS regions by studying the SIR region instead. Some properties of SIR regions have a direct relationship to properties of the QoS region. We will make use of this connection many times throughout this book. Examples of such properties are comprehensiveness (Subsection 2.6.2) and Pareto optimality (Subsection 4.5.3).

Original languageEnglish
Title of host publicationFoundations in Signal Processing, Communications and Networking
PublisherSpringer Science and Business Media B.V.
Pages39-98
Number of pages60
DOIs
StatePublished - 2012

Publication series

NameFoundations in Signal Processing, Communications and Networking
Volume7
ISSN (Print)1863-8538
ISSN (Electronic)1863-8546

Keywords

  • Convex Comp
  • Convex Func

Fingerprint

Dive into the research topics of 'The structure of interference functions and comprehensive sets'. Together they form a unique fingerprint.

Cite this