Abstract
The total angular resolution of a straight-line drawing is the minimum angle between two edges of the drawing. It combines two properties contributing to the readability of a drawing: the angular resolution, which is the minimum angle between incident edges, and the crossing resolution, which is the minimum angle between crossing edges. We consider the total angular resolution of a graph, which is the maximum total angular resolution of a straight-line drawing of this graph. We prove tight bounds for the number of edges for graphs for some values of the total angular resolution up to a finite number of well specified exceptions of constant size. In addition, we show that deciding whether a graph has total angular resolution at least is NP-hard. Further we present some special graphs and their total angular resolution.
Original language | English |
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Journal | Theoretical Computer Science |
Volume | 943 |
Pages (from-to) | 73-88 |
ISSN | 0304-3975 |
DOIs | |
Publication status | Published - 2023 |
Keywords
- Angular resolution
- Crossing resolution
- Graph drawing
- NP-hardness
- Total angular resolution