# On $t$-perfect triangulations of the projective plane

**Authors:** Elke Fuchs, Laura Gellert

arXiv: 1702.03175 · 2017-02-15

## TL;DR

This paper characterizes $t$-perfect triangulations of the projective plane, showing they are exactly those that are perfect and lack a $K_4$ subgraph, providing a complete structural description.

## Contribution

It provides a precise characterization of $t$-perfect triangulations of the projective plane, linking $t$-perfection to perfection and the absence of $K_4$.

## Key findings

- A triangulation is $t$-perfect iff it is perfect and contains no $K_4$
- Characterization of $t$-perfect triangulations in the projective plane
- Complete structural description of these triangulations

## Abstract

We prove that a triangulation of the projective plane is (strongly) $t$-perfect if and only if it is perfect and contains no $K_4$.

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Source: https://tomesphere.com/paper/1702.03175