Shortest-path graph
In mathematics and geographic information science, a shortest-path graph is an undirected graph defined from a set of points in the Euclidean plane. The shortest-path graph is proposed with the idea of inferring edges between a point set such that the shortest path taken over the inferred edges will roughly align with the shortest path taken over the imprecise region represented by the point set.The edge set of the shortest-path graph varies based on a single parameter t ≥ 1. When the weight of an edge is defined as its Euclidean length raised to the power of the parameter t ≥ 1, the edge is present in the shortest-path graph if and only if it is the least weight path between its endpoints.
- Comment
- enIn mathematics and geographic information science, a shortest-path graph is an undirected graph defined from a set of points in the Euclidean plane. The shortest-path graph is proposed with the idea of inferring edges between a point set such that the shortest path taken over the inferred edges will roughly align with the shortest path taken over the imprecise region represented by the point set.The edge set of the shortest-path graph varies based on a single parameter t ≥ 1. When the weight of an edge is defined as its Euclidean length raised to the power of the parameter t ≥ 1, the edge is present in the shortest-path graph if and only if it is the least weight path between its endpoints.
- Depiction
- Has abstract
- enIn mathematics and geographic information science, a shortest-path graph is an undirected graph defined from a set of points in the Euclidean plane. The shortest-path graph is proposed with the idea of inferring edges between a point set such that the shortest path taken over the inferred edges will roughly align with the shortest path taken over the imprecise region represented by the point set.The edge set of the shortest-path graph varies based on a single parameter t ≥ 1. When the weight of an edge is defined as its Euclidean length raised to the power of the parameter t ≥ 1, the edge is present in the shortest-path graph if and only if it is the least weight path between its endpoints.
- Is primary topic of
- Shortest-path graph
- Label
- enShortest-path graph
- Link from a Wikipage to another Wikipage
- Category:Geometric graphs
- Delaunay triangulation
- Euclidean plane
- File:Lake Michigan Shortest Path Graph t=2.svg
- Gabriel graph
- Geographic information science
- Mathematics
- Minimum spanning tree
- Undirected graph
- SameAs
- Bx7YE
- Q85800963
- Subject
- Category:Geometric graphs
- Thumbnail
- WasDerivedFrom
- Shortest-path graph?oldid=1000473521&ns=0
- WikiPageLength
- 1965
- Wikipage page ID
- 62405306
- Wikipage revision ID
- 1000473521
- WikiPageUsesTemplate
- Template:Reflist
