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An Invitation to Dynamic Graph Problems: Lower Bounds — III
Date Issued
01-10-2022
Author(s)
Kashyop, Manas Jyoti
Indian Institute of Technology, Madras
Abstract
In this section of Resonance, we invite readers to pose questions likely to be raised in a classroom situation. We may suggest strategies for dealing with them, or invite responses, or both. “Classroom” is equally a forum for raising broader issues and sharing personal experiences and viewpoints on matters related to teaching and learning science. We present a three-part paper consisting of a survey of some of the extensively used techniques in the dynamic graph model that have appeared recently in the computer science community. In this third part of the three-part survey paper, we present a set of techniques to prove lower bounds for dynamic graph problems. In the first part1 of the survey, we presented the motivation for research in dynamic graph algorithms and an introduction to dynamic graphs. In the second part2 of the survey, we presented a set of techniques to prove upper bounds for dynamic graph problems. A dynamic graph is a graph that has a fixed vertex set and an evolving edge set. The edge set keeps changing due to the insertion of a new edge or the deletion of an existing edge. Research in dynamic graphs has succeeded in obtaining efficient upper bounds for an extensive collection of problems. However, there are problems of stubborn nature. Such complex problems lead to the investigation of lower bounds.
Volume
27