Graph cycle existence checking for FGL graphs
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src/Data/Graph/Inductive/Query/Cycle.hs
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src/Data/Graph/Inductive/Query/Cycle.hs
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{- This file is part of Vervis.
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-
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- Written in 2016 by fr33domlover <fr33domlover@riseup.net>.
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-
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- ♡ Copying is an act of love. Please copy, reuse and share.
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-
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- The author(s) have dedicated all copyright and related and neighboring
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- rights to this software to the public domain worldwide. This software is
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- distributed without any warranty.
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-
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- You should have received a copy of the CC0 Public Domain Dedication along
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- with this software. If not, see
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- <http://creativecommons.org/publicdomain/zero/1.0/>.
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-}
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-- | Testing for and detecting cycles in graphs.
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--
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-- Names consist of:
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--
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-- 1. An optional direction parameter, specifying which nodes to visit next.
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--
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-- [@x@] undirectional: ignore edge direction
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-- [@r@] reversed: walk edges in reverse
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-- [@x@] user defined: speciy which paths to follow
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--
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-- 2. Base name.
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--
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-- [@cyclic@] checks for existence of cycles
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-- [@cycles@] returns the cyclic paths, if any exist
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--
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-- 3. An optional @n@, in which case a user-given subset of the graph's nodes
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-- will be visited, instead of visiting /all/ the nodes.
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module Data.Graph.Inductive.Query.Cycle
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( -- * Standard
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cyclic
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, cyclicn
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, xcyclic
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, xcyclicn
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-- * Undirected
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, ucyclic
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, ucyclicn
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-- * Reversed
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, rcyclic
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, rcyclicn
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)
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where
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import Prelude
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import Data.Graph.Inductive.Graph
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import Data.Maybe (isNothing)
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import qualified Data.IntSet as I
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-- How to detect cycles in a graph?
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--
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-- Run sort of a DFS, while maintaining a set of the nodes currently in
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-- recursion. If we meet one of them at some point, we have a cycle. But where
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-- to start? Find a node with only out-edges. If there's none, we have a cycle.
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-- However this covers a single component. If the graph is not connected,
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-- repeat for the other components.
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cyclic :: Graph g => g a b -> Bool
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cyclic = xcyclic suc'
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cyclicn :: Graph g => [Node] -> g a b -> Bool
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cyclicn = xcyclicn suc'
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xcyclic :: Graph g => (Context a b -> [Node]) -> g a b -> Bool
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xcyclic follow graph = xcyclicn follow (nodes graph) graph
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xcyclicn :: Graph g => (Context a b -> [Node]) -> [Node] -> g a b -> Bool
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xcyclicn follow nodes graph = isNothing $ go I.empty nodes graph
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where
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go rec [] g = Just g
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go rec (n:ns) g =
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case match n g of
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(Nothing, g') ->
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if I.member n rec
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then Nothing
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else go rec ns g'
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(Just c, g') -> go (I.insert n rec) (follow c) g' >>= go rec ns
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ucyclic :: Graph g => g a b -> Bool
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ucyclic = xcyclic neighbors'
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ucyclicn :: Graph g => [Node] -> g a b -> Bool
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ucyclicn = xcyclicn neighbors'
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rcyclic :: Graph g => g a b -> Bool
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rcyclic = xcyclic pre'
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rcyclicn :: Graph g => [Node] -> g a b -> Bool
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rcyclicn = xcyclicn pre'
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