;;; graph.el --- Working with in-memory graphs -*- lexical-binding: t -*- ;; Author: William Carroll ;; Version: 0.0.1 ;; Package-Requires: ((emacs "24.3")) ;;; Commentary: ;; ;; Remember that there are optimal three ways to model a graph: ;; 1. Edge List ;; 2. Vertex Table (a.k.a. Neighbors Table) ;; 3. Adjacency Matrix ;; ;; I may call these "Edges", "Neighbors", "Adjacencies" to avoid verbose naming. ;; For now, I'm avoiding dealing with Adjacency Matrices as I don't have an ;; immediate use-case for them. This is subject to change. ;; ;; There are also hybrid representations of graphs that combine the three ;; aforementioned models. I believe Erlang's digraph module models graphs in ;; Erlang Term Storage (i.e. ETS) this way. ;; TODO: Verify this claim. ;; ;; Graphs can be weighted or unweighted. They can also be directed or ;; undirected. ;; TODO: Create a table explaining all graph variants. ;; ;; TODO: Figure out the relationship of this module and tree.el, which should in ;; principle overlap. ;;; Code: ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Dependencies ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; (require 'prelude) ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Library ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; For now, I'll support storing *either* neighbors or edges in the graph struct ;; as long as both aren't set, since that introduces consistency issues. I may ;; want to handle that use-case in the future, but not now. (cl-defstruct graph neighbors edges) ;; TODO: How do you find the starting point for a topo sort? (defun graph-sort (xs) "Return a topological sort of XS.") (defun graph-from-edges (xs) "Create a graph struct from the Edge List, XS. The user must pass in a valid Edge List since asserting on the shape of XS might be expensive." (make-graph :edges xs)) (defun graph-from-neighbors (xs) "Create a graph struct from a Neighbors Table, XS. The user must pass in a valid Neighbors Table since asserting on the shape of XS might be expensive." (make-graph :neighbors xs)) (defun graph-instance? (xs) "Return t if XS is a graph struct." (graph-p xs)) ;; TODO: Model each of the mapping functions into an isomorphism. (defun graph-edges->neighbors (xs) "Map Edge List, XS, into a Neighbors Table." (prelude-assert (graph-instance? xs))) (defun graph-neighbors->edges (xs) "Map Neighbors Table, XS, into an Edge List." (prelude-assert (graph-instance? xs))) ;; Below are three different models of the same unweighted, directed graph. (defvar graph-edges '((a . b) (a . c) (a . e) (b . c) (b . d) (c . e) (d . f) (e . d) (e . f))) (defvar graph-neighbors ((a b c e) (b c d) (c e) (d f) (e d g) (f))) (provide 'graph) ;;; graph.el ends here