Let ${\displaystyle S=({\mathcal {P}},{\mathcal {L}},{\textbf {I}})}$  an incidence structure, for which the elements of ${\displaystyle {\mathcal {P}}}$  are called points and the elements of ${\displaystyle {\mathcal {L}}}$  are called lines. S is a partial linear space, if the following axioms hold:

• any line is incident with at least two points
• any pair of distinct points is incident with at most one line

If there is a unique line incident with every pair of distinct points, then we get a linear space.

The De Bruijn–Erdős theorem shows that in any finite linear space ${\displaystyle S=({\mathcal {P}},{\mathcal {L}},{\textbf {I}})}$  which is not a single point or a single line, we have ${\displaystyle |{\mathcal {P}}|\leq |{\mathcal {L}}|}$ .

• Projective space
• Affine space
• Polar space
• Generalized quadrangle
• Generalized polygon
• Near polygon

• Shult, Ernest E. (2011), Points and Lines, Universitext, Springer, doi:10.1007/978-3-642-15627-4, ISBN 978-3-642-15626-7.

• Lynn Batten: Combinatorics of Finite Geometries. Cambridge University Press 1986, ISBN 0-521-31857-2, p. 1-22
• Lynn Batten and Albrecht Beutelspacher: The Theory of Finite Linear Spaces. Cambridge University Press, Cambridge, 1992.
• Eric Moorhouse: Incidence Geometry. Lecture notes (archived)

• partial linear space at the University of Kiel
• partial linear space at PlanetMath