eng
Schloss Dagstuhl – Leibniz-Zentrum für Informatik
Dagstuhl Seminar Proceedings
1862-4405
2006-11-30
1
9
10.4230/DagSemProc.06111.6
article
Computing Shortest Paths in Series-Parallel Graphs in Logarithmic Space
Jakoby, Andreas
Tantau, Till
Series-parallel graphs, which are built by repeatedly applying
series or parallel composition operations to paths, play an
important role in computer science as they model the flow of
information in many types of programs. For directed series-parallel
graphs, we study the problem of finding a shortest path between two
given vertices. Our main result is that we can find such a path in
logarithmic space, which shows that the distance problem for
series-parallel graphs is L-complete. Previously, it was known
that one can compute some path in logarithmic space; but for
other graph types, like undirected graphs or tournament graphs,
constructing some path between given vertices is possible in
logarithmic space while constructing a shortest path is
NL-complete.
https://drops.dagstuhl.de/storage/16dagstuhl-seminar-proceedings/dsp-vol06111/DagSemProc.06111.6/DagSemProc.06111.6.pdf
Series-parallel graphs
shortest path
logspace