3 , mkInterval, intervalToInfinityFrom
7 , emptyIntervalSet, extendIntervalSet, deleteFromIntervalSet
14 #include "HsVersions.h"
16 ------------------------------------------------------------------
17 -- Intervals and Sets of Intervals
18 ------------------------------------------------------------------
20 -- This module implements intervals over the integer line and sets of
21 -- disjoint intervals.
24 An interval $[x,y)$ over ordered points represents a half-open
25 interval of points: $\{ p \mid x \leq p < y \}$. Half-open intervals
26 have the nice property $[x,y) \cup [y,z) = [x,z)$. Non-empty
27 intervals can precede or overlap each other; an empty interval never
28 overlaps or precedes any other. The set of ordered elements contains
29 a unique element $\mathit{zero}$; using it in any interval is an
30 \emph{unchecked} run-time error.
34 data Interval = Interval { i_min :: Int, i_lim :: Int }
35 -- width == i_lim - i_min >= 0
39 mkInterval :: Int -> Width -> Interval
40 mkInterval min w = ASSERT (w>=0) Interval min (min+w)
41 intervalToInfinityFrom :: Int -> Interval
42 intervalToInfinityFrom min = Interval min maxBound
43 integersInInterval :: Interval -> [Int]
44 integersInInterval (Interval min lim) = gen min lim
45 where gen min lim | min >= lim = []
46 | otherwise = min : gen (min+1) lim
48 precedes, overlaps, adjoins, contains :: Interval -> Interval -> Bool
49 precedes (Interval m l) (Interval m' l') = l <= m' || l' <= m
50 overlaps i i' = not (i `precedes` i' || i' `precedes` i)
51 adjoins (Interval _ l) (Interval m _) = l == m
52 contains (Interval m l) (Interval m' l') = m <= m' && l >= l'
54 merge :: Interval -> Interval -> Interval
55 merge _i@(Interval m _) _i'@(Interval _ l) = {- ASSERT (adjoins i i') -} (Interval m l)
61 newtype DisjointIntervalSet = Intervals [Interval]
62 -- invariants: * No two intervals overlap
63 -- * Adjacent intervals have a gap between
64 -- * Intervals are sorted by min element
66 emptyIntervalSet :: DisjointIntervalSet
67 emptyIntervalSet = Intervals []
68 extendIntervalSet :: DisjointIntervalSet -> Interval -> DisjointIntervalSet
69 extendIntervalSet (Intervals l) i = Intervals (insert [] i l)
70 where insert :: [Interval] -> Interval -> [Interval] -> [Interval]
71 -- precondition: in 'insert prev' i l', every element of prev'
72 -- precedes and does not adjoin i
73 insert prev' i [] = rev_app prev' [i]
74 insert prev' i (i':is) =
75 if i `precedes` i' then
76 if i `adjoins` i' then
77 insert prev' (merge i i') is
79 rev_app prev' (i : i' : is)
80 else if i' `precedes` i then
81 if i' `adjoins` i then
82 insert prev' (merge i' i) is
84 insert (i' : prev') i is
86 panic "overlapping intervals"
88 deleteFromIntervalSet :: DisjointIntervalSet -> Interval -> DisjointIntervalSet
89 deleteFromIntervalSet (Intervals l) i = Intervals (rm [] i l)
90 where rm :: [Interval] -> Interval -> [Interval] -> [Interval]
91 -- precondition: in 'rm prev' i l', every element of prev'
92 -- precedes and does not adjoin i
93 rm _ _ [] = panic "removed interval not present in set"
95 if i `precedes` i' then
96 panic "removed interval not present in set"
97 else if i' `precedes` i then
100 -- remove i from i', leaving 0, 1, or 2 leftovers
102 ASSERTX (i' `contains` i)
103 let (Interval m l, Interval m' l'
104 panic "overlapping intervals"
107 subIntervals :: DisjointIntervalSet -> Width -> [Interval]
108 subIntervals = undefined
110 rev_app :: [a] -> [a] -> [a]
112 rev_app (y:ys) xs = rev_app ys (y:xs)
115 _unused = undefined i_min i_lim overlaps contains
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