by Luc Brun, Walter Kropatsch
Abstract:
This paper presents a new formalism for irregular pyramids based on combinatorial maps. The combinatorial map formalism allows us to encode a planar graph thanks to two permutations encoding the edges and the vertices of the graph.The combinatorial map formalism encode explicitly the orientation of the planar graph. This last property is useful to describe the partitions of an image which may be considered as a subset of the oriented plane $R^2$. This new constraint allows us to design interesting properties for irregular pyramids. Finally the combinatorial formalism allows us to encode efficiently the graph transformations used in irregular pyramids.
Reference:
Dual Contraction of Combinatorial Maps (Luc Brun, Walter Kropatsch), Technical report, PRIP, TU Wien, 1999.
Bibtex Entry:
@TechReport{TR054,
author = "Luc Brun and Walter Kropatsch",
institution = "PRIP, TU Wien",
number = "PRIP-TR-054",
title = "Dual {C}ontraction of {C}ombinatorial {M}aps",
year = "1999",
url = "https://www.prip.tuwien.ac.at/pripfiles/trs/tr54.pdf",
abstract = "This paper presents a new formalism for irregular
pyramids based on combinatorial maps. The
combinatorial map formalism allows us to encode a
planar graph thanks to two permutations encoding the
edges and the vertices of the graph.The
combinatorial map formalism encode explicitly the
orientation of the planar graph. This last property
is useful to describe the partitions of an image
which may be considered as a subset of the oriented
plane $R^2$. This new constraint allows us to design
interesting properties for irregular
pyramids. Finally the combinatorial formalism allows
us to encode efficiently the graph transformations
used in irregular pyramids. ",
}