A complete characterization of graphic sequences with a \(Z_3\)-connected realization
From MaRDI portal
Publication:499463
DOI10.1016/j.ejc.2015.05.008zbMath1321.05055OpenAlexW971943233MaRDI QIDQ499463
Publication date: 30 September 2015
Published in: European Journal of Combinatorics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.ejc.2015.05.008
Related Items (4)
An extremal problem on bigraphic pairs with an \(A\)-connected realization ⋮ Group Connectivity, Strongly Z_m-Connectivity, and Edge Disjoint Spanning Trees ⋮ Bigraphic pairs with an \(A\)-connected realization ⋮ Modulo 5-orientations and degree sequences
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Realizing degree sequences as \(Z_3\)-connected graphs
- A note on an extremal problem for group-connectivity
- An extremal problem on group connectivity of graphs
- Degree sum condition for \(Z_{3}\)-connectivity in graphs
- Nowhere-zero \(Z_3\)-flows through \(Z_3\)-connectivity
- Group connectivity of graphs --- a nonhomogeneous analogue of nowhere-zero flow properties
- Group connectivity of 3-edge-connected chordal graphs
- An extremal problem on potentially \(K_{r,s}\)-graphic sequences
- Group connectivity and group colorings of graphs --- a survey
- Algorithms for constructing graphs and digraphs with given valences and factors
- Nowhere-zero 4-flows; simultaneous edge-colorings; and critical partial Latin squares
- Realizing Degree Sequences with Graphs Having Nowhere-Zero 3-Flows
This page was built for publication: A complete characterization of graphic sequences with a \(Z_3\)-connected realization
