Pages that link to "Item:Q1088997"
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The following pages link to An additivity theorem for the genus of a graph (Q1088997):
Displaying 21 items.
- Irreducible triangulations are small (Q974471) (← links)
- Genus distribution of graphs under surgery: adding edges and splitting vertices (Q983423) (← links)
- The obstructions for toroidal graphs with no \(K_{3,3}\)'s (Q1025559) (← links)
- An application of graph theory to additive number theory (Q1068128) (← links)
- On the Euler genus of a 2-connected graph (Q1074592) (← links)
- On the non-orientable genus of a 2-connected graph (Q1074593) (← links)
- Genus is superadditive under band connected sum (Q1089961) (← links)
- Representations of graphs and networks (coding, layouts and embeddings) (Q1174904) (← links)
- Nonadditivity of the 1-genus of a graph (Q1584230) (← links)
- Connecting specific maps having two equal-sized faces and its genus (Q2024740) (← links)
- The \(\mathbb{Z}_2\)-genus of Kuratowski minors (Q2167311) (← links)
- Irreducible triangulations of surfaces with boundary (Q2637719) (← links)
- (Q3030846) (← links)
- Characterization of groups with planar, toroidal or projective planar (proper) reduced power graphs (Q3296155) (← links)
- The nonorientable genus is additive (Q3745856) (← links)
- The orientable genus is nonadditive (Q3745857) (← links)
- The genus of amalgamations (Q3972126) (← links)
- (Q5088969) (← links)
- Additivity properties of graphs with Form II symmetry (Q5467027) (← links)
- Subgraph densities in a surface (Q5886343) (← links)
- On graph classes with minor-universal elements (Q6652091) (← links)
