In the more abstract setting of incidence geometry, which is a set having a symmetric and reflexive relation called incidence defined on its elements, a flag is a set of elements that are mutually incident.^[1] This level of abstraction generalizes both the polyhedral concept given above as well as the related flag concept from linear algebra.

A flag is maximal if it is not contained in a larger flag. An incidence geometry (Ω, I) has rank r if Ω can be partitioned into sets Ω₁, Ω₂, ..., Ω_r, such that each maximal flag of the geometry intersects each of these sets in exactly one element. In this case, the elements of set Ω_j are called elements of type j.

Consequently, in a geometry of rank r, each maximal flag has exactly r elements.

An incidence geometry of rank 2 is commonly called an incidence structure with elements of type 1 called points and elements of type 2 called blocks (or lines in some situations).^[2] More formally,

An incidence structure is a triple D = (V, B, I) where V and B are any two disjoint sets and I is a binary relation between V and B, that is, I ⊆ V × B. The elements of V will be called points, those of B blocks and those of I flags.^[3]

• Beutelspacher, Albrecht; Rosenbaum, Ute (1998), Projective Geometry: from foundations to applications, Cambridge: Cambridge University Press, ISBN 0-521-48277-1
• Peter R. Cromwell, Polyhedra, Cambridge University Press 1997, ISBN 0-521-55432-2
• Peter McMullen, Egon Schulte, Abstract Regular Polytopes, Cambridge University Press, 2002. ISBN 0-521-81496-0