Projects / quiver geometry

Quiver geometry is an experiment in defining a kind of discrete geometry purely in terms of directed graphs with a particular structure of edge labels on them.

I began thinking about this project in late 2020 when thinking about the abstract geometry induced by computational rewriting systems, having found nothing in the existing literature that seemed like a good “port” of the methods and theories of classical differential geometry to the setting of discrete geometry.

I started to create a kind of casual introduction and illustration of the ideas at, which gave me an opportunity to experiment with different pedagogical approaches, and in particular an software to create beautiful visualizations and illustrations.

I’ve since discovered that much of what I was trying to define is already part of the canon of category theory, or can be set up fairly easily within it:

quiver geometry category theory
path functors between freely generated categories
path groupoid of a groupoid of morphism composition in the above
discrete fiber fibered categories
quiver monoidal structure on the category of quivers
cardinal labeling induced on a graph by a 1-object “codiagram”

Anyway, it was still useful to work on this project, and I learned a lot, leading me to algebraic geometry, sheaf theory, and cohomology among other topics.

I do still need to understand how cardinal structure can be understood categorically – it feels like some incarnation of a homotopy lifting property.

The website may also be useful to people who don’t want to engage with category theory but do want a template for how to think about discrete geometry – I may continue to work on it for that reason. There are also sections of general mathematical exposition that I am proud of, such as the exploration of and fiber

I’ve also presented quiver geometry to the Wolfram Physics, where it has formed part of the basis for several student projects at the annual Wolfram summer school such as “Topological invariants in discrete lattice via graph rewriting”, “Gauge field theories on discrete principal fibre bundles”, “Full Discretization of Local Gauge Invariance”