Safe Haskell | Safe |
---|---|
Language | Haskell2010 |
This module exports all the partial functions from Data.Text.Lazy
Synopsis
- head :: Text -> Char
- last :: Text -> Char
- tail :: Text -> Text
- init :: Text -> Text
- replace :: Text -> Text -> Text -> Text
- foldl1 :: (Char -> Char -> Char) -> Text -> Char
- foldl1' :: (Char -> Char -> Char) -> Text -> Char
- foldr1 :: (Char -> Char -> Char) -> Text -> Char
- maximum :: Text -> Char
- minimum :: Text -> Char
- breakOn :: Text -> Text -> (Text, Text)
- breakOnEnd :: Text -> Text -> (Text, Text)
- splitOn :: Text -> Text -> [Text]
- breakOnAll :: Text -> Text -> [(Text, Text)]
Creation and elimination
O(1) Returns the first character of a Text
, which must be
non-empty. Subject to fusion.
O(n/c) Returns the last character of a Text
, which must be
non-empty. Subject to fusion.
O(1) Returns all characters after the head of a Text
, which
must be non-empty. Subject to fusion.
O(n/c) Returns all but the last character of a Text
, which must
be non-empty. Subject to fusion.
Transformations
:: Text |
|
-> Text |
|
-> Text |
|
-> Text |
O(m+n) Replace every non-overlapping occurrence of needle
in
haystack
with replacement
.
This function behaves as though it was defined as follows:
replace needle replacement haystack =intercalate
replacement (splitOn
needle haystack)
As this suggests, each occurrence is replaced exactly once. So if
needle
occurs in replacement
, that occurrence will not itself
be replaced recursively:
replace "oo" "foo" "oo" == "foo"
In cases where several instances of needle
overlap, only the
first one will be replaced:
replace "ofo" "bar" "ofofo" == "barfo"
In (unlikely) bad cases, this function's time complexity degrades towards O(n*m).
Folds
foldl1' :: (Char -> Char -> Char) -> Text -> Char #
O(n) A strict version of foldl1
. Subject to fusion.
Special folds
Substrings
Breaking strings
breakOn :: Text -> Text -> (Text, Text) #
O(n+m) Find the first instance of needle
(which must be
non-null
) in haystack
. The first element of the returned tuple
is the prefix of haystack
before needle
is matched. The second
is the remainder of haystack
, starting with the match.
Examples:
breakOn "::" "a::b::c" ==> ("a", "::b::c") breakOn "/" "foobar" ==> ("foobar", "")
Laws:
append prefix match == haystack where (prefix, match) = breakOn needle haystack
If you need to break a string by a substring repeatedly (e.g. you
want to break on every instance of a substring), use breakOnAll
instead, as it has lower startup overhead.
This function is strict in its first argument, and lazy in its second.
In (unlikely) bad cases, this function's time complexity degrades towards O(n*m).
breakOnEnd :: Text -> Text -> (Text, Text) #
O(n+m) Similar to breakOn
, but searches from the end of the string.
The first element of the returned tuple is the prefix of haystack
up to and including the last match of needle
. The second is the
remainder of haystack
, following the match.
breakOnEnd "::" "a::b::c" ==> ("a::b::", "c")
Breaking into many substrings
O(m+n) Break a Text
into pieces separated by the first Text
argument (which cannot be an empty string), consuming the
delimiter. An empty delimiter is invalid, and will cause an error
to be raised.
Examples:
splitOn "\r\n" "a\r\nb\r\nd\r\ne" == ["a","b","d","e"] splitOn "aaa" "aaaXaaaXaaaXaaa" == ["","X","X","X",""] splitOn "x" "x" == ["",""]
and
intercalate s . splitOn s == id splitOn (singleton c) == split (==c)
(Note: the string s
to split on above cannot be empty.)
This function is strict in its first argument, and lazy in its second.
In (unlikely) bad cases, this function's time complexity degrades towards O(n*m).
Searching
O(n+m) Find all non-overlapping instances of needle
in
haystack
. Each element of the returned list consists of a pair:
- The entire string prior to the kth match (i.e. the prefix)
- The kth match, followed by the remainder of the string
Examples:
breakOnAll "::" "" ==> [] breakOnAll "/" "a/b/c/" ==> [("a", "/b/c/"), ("a/b", "/c/"), ("a/b/c", "/")]
This function is strict in its first argument, and lazy in its second.
In (unlikely) bad cases, this function's time complexity degrades towards O(n*m).
The needle
parameter may not be empty.