third_party/rust_crates/vendor/regex-syntax/src/hir/interval.rs - fuchsia - Git at Google

 use std::char;
 use std::cmp;
 use std::fmt::Debug;
 use std::slice;
 use std::u8;

 use unicode;

 // This module contains an *internal* implementation of interval sets.
 //
 // The primary invariant that interval sets guards is canonical ordering. That
 // is, every interval set contains an ordered sequence of intervals where
 // no two intervals are overlapping or adjacent. While this invariant is
 // occasionally broken within the implementation, it should be impossible for
 // callers to observe it.
 //
 // Since case folding (as implemented below) breaks that invariant, we roll
 // that into this API even though it is a little out of place in an otherwise
 // generic interval set. (Hence the reason why the `unicode` module is imported
 // here.)
 //
 // Some of the implementation complexity here is a result of me wanting to
 // preserve the sequential representation without using additional memory.
 // In many cases, we do use linear extra memory, but it is at most 2x and it
 // is amortized. If we relaxed the memory requirements, this implementation
 // could become much simpler. The extra memory is honestly probably OK, but
 // character classes (especially of the Unicode variety) can become quite
 // large, and it would be nice to keep regex compilation snappy even in debug
 // builds. (In the past, I have been careless with this area of code and it has
 // caused slow regex compilations in debug mode, so this isn't entirely
 // unwarranted.)
 //
 // Tests on this are relegated to the public API of HIR in src/hir.rs.

 #[derive(Clone, Debug, Eq, PartialEq)]
 pub struct IntervalSet<I> {
     ranges: Vec<I>,
 }

 impl<I: Interval> IntervalSet<I> {
     /// Create a new set from a sequence of intervals. Each interval is
     /// specified as a pair of bounds, where both bounds are inclusive.
     ///
     /// The given ranges do not need to be in any specific order, and ranges
     /// may overlap.
     pub fn new<T: IntoIterator<Item = I>>(intervals: T) -> IntervalSet<I> {
         let mut set = IntervalSet { ranges: intervals.into_iter().collect() };
         set.canonicalize();
         set
     }

     /// Add a new interval to this set.
     pub fn push(&mut self, interval: I) {
         // TODO: This could be faster. e.g., Push the interval such that
         // it preserves canonicalization.
         self.ranges.push(interval);
         self.canonicalize();
     }

     /// Return an iterator over all intervals in this set.
     ///
     /// The iterator yields intervals in ascending order.
     pub fn iter(&self) -> IntervalSetIter<I> {
         IntervalSetIter(self.ranges.iter())
     }

     /// Return an immutable slice of intervals in this set.
     ///
     /// The sequence returned is in canonical ordering.
     pub fn intervals(&self) -> &[I] {
         &self.ranges
     }

     /// Expand this interval set such that it contains all case folded
     /// characters. For example, if this class consists of the range `a-z`,
     /// then applying case folding will result in the class containing both the
     /// ranges `a-z` and `A-Z`.
     ///
     /// This returns an error if the necessary case mapping data is not
     /// available.
     pub fn case_fold_simple(&mut self) -> Result<(), unicode::CaseFoldError> {
         let len = self.ranges.len();
         for i in 0..len {
             let range = self.ranges[i];
             if let Err(err) = range.case_fold_simple(&mut self.ranges) {
                 self.canonicalize();
                 return Err(err);
             }
         }
         self.canonicalize();
         Ok(())
     }

     /// Union this set with the given set, in place.
     pub fn union(&mut self, other: &IntervalSet<I>) {
         // This could almost certainly be done more efficiently.
         self.ranges.extend(&other.ranges);
         self.canonicalize();
     }

     /// Intersect this set with the given set, in place.
     pub fn intersect(&mut self, other: &IntervalSet<I>) {
         if self.ranges.is_empty() {
             return;
         }
         if other.ranges.is_empty() {
             self.ranges.clear();
             return;
         }

         // There should be a way to do this in-place with constant memory,
         // but I couldn't figure out a simple way to do it. So just append
         // the intersection to the end of this range, and then drain it before
         // we're done.
         let drain_end = self.ranges.len();

         let mut ita = (0..drain_end).into_iter();
         let mut itb = (0..other.ranges.len()).into_iter();
         let mut a = ita.next().unwrap();
         let mut b = itb.next().unwrap();
         loop {
             if let Some(ab) = self.ranges[a].intersect(&other.ranges[b]) {
                 self.ranges.push(ab);
             }
             let (it, aorb) =
                 if self.ranges[a].upper() < other.ranges[b].upper() {
                     (&mut ita, &mut a)
                 } else {
                     (&mut itb, &mut b)
                 };
             match it.next() {
                 Some(v) => *aorb = v,
                 None => break,
             }
         }
         self.ranges.drain(..drain_end);
     }

     /// Subtract the given set from this set, in place.
     pub fn difference(&mut self, other: &IntervalSet<I>) {
         if self.ranges.is_empty() || other.ranges.is_empty() {
             return;
         }

         // This algorithm is (to me) surprisingly complex. A search of the
         // interwebs indicate that this is a potentially interesting problem.
         // Folks seem to suggest interval or segment trees, but I'd like to
         // avoid the overhead (both runtime and conceptual) of that.
         //
         // The following is basically my Shitty First Draft. Therefore, in
         // order to grok it, you probably need to read each line carefully.
         // Simplifications are most welcome!
         //
         // Remember, we can assume the canonical format invariant here, which
         // says that all ranges are sorted, not overlapping and not adjacent in
         // each class.
         let drain_end = self.ranges.len();
         let (mut a, mut b) = (0, 0);
         'LOOP: while a < drain_end && b < other.ranges.len() {
             // Basically, the easy cases are when neither range overlaps with
             // each other. If the `b` range is less than our current `a`
             // range, then we can skip it and move on.
             if other.ranges[b].upper() < self.ranges[a].lower() {
                 b += 1;
                 continue;
             }
             // ... similarly for the `a` range. If it's less than the smallest
             // `b` range, then we can add it as-is.
             if self.ranges[a].upper() < other.ranges[b].lower() {
                 let range = self.ranges[a];
                 self.ranges.push(range);
                 a += 1;
                 continue;
             }
             // Otherwise, we have overlapping ranges.
             assert!(!self.ranges[a].is_intersection_empty(&other.ranges[b]));

             // This part is tricky and was non-obvious to me without looking
             // at explicit examples (see the tests). The trickiness stems from
             // two things: 1) subtracting a range from another range could
             // yield two ranges and 2) after subtracting a range, it's possible
             // that future ranges can have an impact. The loop below advances
             // the `b` ranges until they can't possible impact the current
             // range.
             //
             // For example, if our `a` range is `a-t` and our next three `b`
             // ranges are `a-c`, `g-i`, `r-t` and `x-z`, then we need to apply
             // subtraction three times before moving on to the next `a` range.
             let mut range = self.ranges[a];
             while b < other.ranges.len()
                 && !range.is_intersection_empty(&other.ranges[b])
             {
                 let old_range = range;
                 range = match range.difference(&other.ranges[b]) {
                     (None, None) => {
                         // We lost the entire range, so move on to the next
                         // without adding this one.
                         a += 1;
                         continue 'LOOP;
                     }
                     (Some(range1), None) | (None, Some(range1)) => range1,
                     (Some(range1), Some(range2)) => {
                         self.ranges.push(range1);
                         range2
                     }
                 };
                 // It's possible that the `b` range has more to contribute
                 // here. In particular, if it is greater than the original
                 // range, then it might impact the next `a` range *and* it
                 // has impacted the current `a` range as much as possible,
                 // so we can quit. We don't bump `b` so that the next `a`
                 // range can apply it.
                 if other.ranges[b].upper() > old_range.upper() {
                     break;
                 }
                 // Otherwise, the next `b` range might apply to the current
                 // `a` range.
                 b += 1;
             }
             self.ranges.push(range);
             a += 1;
         }
         while a < drain_end {
             let range = self.ranges[a];
             self.ranges.push(range);
             a += 1;
         }
         self.ranges.drain(..drain_end);
     }

     /// Compute the symmetric difference of the two sets, in place.
     ///
     /// This computes the symmetric difference of two interval sets. This
     /// removes all elements in this set that are also in the given set,
     /// but also adds all elements from the given set that aren't in this
     /// set. That is, the set will contain all elements in either set,
     /// but will not contain any elements that are in both sets.
     pub fn symmetric_difference(&mut self, other: &IntervalSet<I>) {
         // TODO(burntsushi): Fix this so that it amortizes allocation.
         let mut intersection = self.clone();
         intersection.intersect(other);
         self.union(other);
         self.difference(&intersection);
     }

     /// Negate this interval set.
     ///
     /// For all `x` where `x` is any element, if `x` was in this set, then it
     /// will not be in this set after negation.
     pub fn negate(&mut self) {
         if self.ranges.is_empty() {
             let (min, max) = (I::Bound::min_value(), I::Bound::max_value());
             self.ranges.push(I::create(min, max));
             return;
         }

         // There should be a way to do this in-place with constant memory,
         // but I couldn't figure out a simple way to do it. So just append
         // the negation to the end of this range, and then drain it before
         // we're done.
         let drain_end = self.ranges.len();

         // We do checked arithmetic below because of the canonical ordering
         // invariant.
         if self.ranges[0].lower() > I::Bound::min_value() {
             let upper = self.ranges[0].lower().decrement();
             self.ranges.push(I::create(I::Bound::min_value(), upper));
         }
         for i in 1..drain_end {
             let lower = self.ranges[i - 1].upper().increment();
             let upper = self.ranges[i].lower().decrement();
             self.ranges.push(I::create(lower, upper));
         }
         if self.ranges[drain_end - 1].upper() < I::Bound::max_value() {
             let lower = self.ranges[drain_end - 1].upper().increment();
             self.ranges.push(I::create(lower, I::Bound::max_value()));
         }
         self.ranges.drain(..drain_end);
     }

     /// Converts this set into a canonical ordering.
     fn canonicalize(&mut self) {
         if self.is_canonical() {
             return;
         }
         self.ranges.sort();
         assert!(!self.ranges.is_empty());

         // Is there a way to do this in-place with constant memory? I couldn't
         // figure out a way to do it. So just append the canonicalization to
         // the end of this range, and then drain it before we're done.
         let drain_end = self.ranges.len();
         for oldi in 0..drain_end {
             // If we've added at least one new range, then check if we can
             // merge this range in the previously added range.
             if self.ranges.len() > drain_end {
                 let (last, rest) = self.ranges.split_last_mut().unwrap();
                 if let Some(union) = last.union(&rest[oldi]) {
                     *last = union;
                     continue;
                 }
             }
             let range = self.ranges[oldi];
             self.ranges.push(range);
         }
         self.ranges.drain(..drain_end);
     }

     /// Returns true if and only if this class is in a canonical ordering.
     fn is_canonical(&self) -> bool {
         for pair in self.ranges.windows(2) {
             if pair[0] >= pair[1] {
                 return false;
             }
             if pair[0].is_contiguous(&pair[1]) {
                 return false;
             }
         }
         true
     }
 }

 /// An iterator over intervals.
 #[derive(Debug)]
 pub struct IntervalSetIter<'a, I: 'a>(slice::Iter<'a, I>);

 impl<'a, I> Iterator for IntervalSetIter<'a, I> {
     type Item = &'a I;

     fn next(&mut self) -> Option<&'a I> {
         self.0.next()
     }
 }

 pub trait Interval:
     Clone + Copy + Debug + Default + Eq + PartialEq + PartialOrd + Ord
 {
     type Bound: Bound;

     fn lower(&self) -> Self::Bound;
     fn upper(&self) -> Self::Bound;
     fn set_lower(&mut self, bound: Self::Bound);
     fn set_upper(&mut self, bound: Self::Bound);
     fn case_fold_simple(
         &self,
         intervals: &mut Vec<Self>,
     ) -> Result<(), unicode::CaseFoldError>;

     /// Create a new interval.
     fn create(lower: Self::Bound, upper: Self::Bound) -> Self {
         let mut int = Self::default();
         if lower <= upper {
             int.set_lower(lower);
             int.set_upper(upper);
         } else {
             int.set_lower(upper);
             int.set_upper(lower);
         }
         int
     }

     /// Union the given overlapping range into this range.
     ///
     /// If the two ranges aren't contiguous, then this returns `None`.
     fn union(&self, other: &Self) -> Option<Self> {
         if !self.is_contiguous(other) {
             return None;
         }
         let lower = cmp::min(self.lower(), other.lower());
         let upper = cmp::max(self.upper(), other.upper());
         Some(Self::create(lower, upper))
     }

     /// Intersect this range with the given range and return the result.
     ///
     /// If the intersection is empty, then this returns `None`.
     fn intersect(&self, other: &Self) -> Option<Self> {
         let lower = cmp::max(self.lower(), other.lower());
         let upper = cmp::min(self.upper(), other.upper());
         if lower <= upper {
             Some(Self::create(lower, upper))
         } else {
             None
         }
     }

     /// Subtract the given range from this range and return the resulting
     /// ranges.
     ///
     /// If subtraction would result in an empty range, then no ranges are
     /// returned.
     fn difference(&self, other: &Self) -> (Option<Self>, Option<Self>) {
         if self.is_subset(other) {
             return (None, None);
         }
         if self.is_intersection_empty(other) {
             return (Some(self.clone()), None);
         }
         let add_lower = other.lower() > self.lower();
         let add_upper = other.upper() < self.upper();
         // We know this because !self.is_subset(other) and the ranges have
         // a non-empty intersection.
         assert!(add_lower || add_upper);
         let mut ret = (None, None);
         if add_lower {
             let upper = other.lower().decrement();
             ret.0 = Some(Self::create(self.lower(), upper));
         }
         if add_upper {
             let lower = other.upper().increment();
             let range = Self::create(lower, self.upper());
             if ret.0.is_none() {
                 ret.0 = Some(range);
             } else {
                 ret.1 = Some(range);
             }
         }
         ret
     }

     /// Compute the symmetric difference the given range from this range. This
     /// returns the union of the two ranges minus its intersection.
     fn symmetric_difference(
         &self,
         other: &Self,
     ) -> (Option<Self>, Option<Self>) {
         let union = match self.union(other) {
             None => return (Some(self.clone()), Some(other.clone())),
             Some(union) => union,
         };
         let intersection = match self.intersect(other) {
             None => return (Some(self.clone()), Some(other.clone())),
             Some(intersection) => intersection,
         };
         union.difference(&intersection)
     }

     /// Returns true if and only if the two ranges are contiguous. Two ranges
     /// are contiguous if and only if the ranges are either overlapping or
     /// adjacent.
     fn is_contiguous(&self, other: &Self) -> bool {
         let lower1 = self.lower().as_u32();
         let upper1 = self.upper().as_u32();
         let lower2 = other.lower().as_u32();
         let upper2 = other.upper().as_u32();
         cmp::max(lower1, lower2) <= cmp::min(upper1, upper2).saturating_add(1)
     }

     /// Returns true if and only if the intersection of this range and the
     /// other range is empty.
     fn is_intersection_empty(&self, other: &Self) -> bool {
         let (lower1, upper1) = (self.lower(), self.upper());
         let (lower2, upper2) = (other.lower(), other.upper());
         cmp::max(lower1, lower2) > cmp::min(upper1, upper2)
     }

     /// Returns true if and only if this range is a subset of the other range.
     fn is_subset(&self, other: &Self) -> bool {
         let (lower1, upper1) = (self.lower(), self.upper());
         let (lower2, upper2) = (other.lower(), other.upper());
         (lower2 <= lower1 && lower1 <= upper2)
             && (lower2 <= upper1 && upper1 <= upper2)
     }
 }

 pub trait Bound:
     Copy + Clone + Debug + Eq + PartialEq + PartialOrd + Ord
 {
     fn min_value() -> Self;
     fn max_value() -> Self;
     fn as_u32(self) -> u32;
     fn increment(self) -> Self;
     fn decrement(self) -> Self;
 }

 impl Bound for u8 {
     fn min_value() -> Self {
         u8::MIN
     }
     fn max_value() -> Self {
         u8::MAX
     }
     fn as_u32(self) -> u32 {
         self as u32
     }
     fn increment(self) -> Self {
         self.checked_add(1).unwrap()
     }
     fn decrement(self) -> Self {
         self.checked_sub(1).unwrap()
     }
 }

 impl Bound for char {
     fn min_value() -> Self {
         '\x00'
     }
     fn max_value() -> Self {
         '\u{10FFFF}'
     }
     fn as_u32(self) -> u32 {
         self as u32
     }

     fn increment(self) -> Self {
         match self {
             '\u{D7FF}' => '\u{E000}',
             c => char::from_u32((c as u32).checked_add(1).unwrap()).unwrap(),
         }
     }

     fn decrement(self) -> Self {
         match self {
             '\u{E000}' => '\u{D7FF}',
             c => char::from_u32((c as u32).checked_sub(1).unwrap()).unwrap(),
         }
     }
 }

 // Tests for interval sets are written in src/hir.rs against the public API.
	use std::char;
	use std::cmp;
	use std::fmt::Debug;
	use std::slice;
	use std::u8;

	use unicode;

	// This module contains an internal implementation of interval sets.
	//
	// The primary invariant that interval sets guards is canonical ordering. That
	// is, every interval set contains an ordered sequence of intervals where
	// no two intervals are overlapping or adjacent. While this invariant is
	// occasionally broken within the implementation, it should be impossible for
	// callers to observe it.
	//
	// Since case folding (as implemented below) breaks that invariant, we roll
	// that into this API even though it is a little out of place in an otherwise
	// generic interval set. (Hence the reason why the `unicode` module is imported
	// here.)
	//
	// Some of the implementation complexity here is a result of me wanting to
	// preserve the sequential representation without using additional memory.
	// In many cases, we do use linear extra memory, but it is at most 2x and it
	// is amortized. If we relaxed the memory requirements, this implementation
	// could become much simpler. The extra memory is honestly probably OK, but
	// character classes (especially of the Unicode variety) can become quite
	// large, and it would be nice to keep regex compilation snappy even in debug
	// builds. (In the past, I have been careless with this area of code and it has
	// caused slow regex compilations in debug mode, so this isn't entirely
	// unwarranted.)
	//
	// Tests on this are relegated to the public API of HIR in src/hir.rs.

	#[derive(Clone, Debug, Eq, PartialEq)]
	pub struct IntervalSet<I> {
	ranges: Vec<I>,
	}

	impl<I: Interval> IntervalSet<I> {
	/// Create a new set from a sequence of intervals. Each interval is
	/// specified as a pair of bounds, where both bounds are inclusive.
	///
	/// The given ranges do not need to be in any specific order, and ranges
	/// may overlap.
	pub fn new<T: IntoIterator<Item = I>>(intervals: T) -> IntervalSet<I> {
	let mut set = IntervalSet { ranges: intervals.into_iter().collect() };
	set.canonicalize();
	set
	}

	/// Add a new interval to this set.
	pub fn push(&mut self, interval: I) {
	// TODO: This could be faster. e.g., Push the interval such that
	// it preserves canonicalization.
	self.ranges.push(interval);
	self.canonicalize();
	}

	/// Return an iterator over all intervals in this set.
	///
	/// The iterator yields intervals in ascending order.
	pub fn iter(&self) -> IntervalSetIter<I> {
	IntervalSetIter(self.ranges.iter())
	}

	/// Return an immutable slice of intervals in this set.
	///
	/// The sequence returned is in canonical ordering.
	pub fn intervals(&self) -> &[I] {
	&self.ranges
	}

	/// Expand this interval set such that it contains all case folded
	/// characters. For example, if this class consists of the range `a-z`,
	/// then applying case folding will result in the class containing both the
	/// ranges `a-z` and `A-Z`.
	///
	/// This returns an error if the necessary case mapping data is not
	/// available.
	pub fn case_fold_simple(&mut self) -> Result<(), unicode::CaseFoldError> {
	let len = self.ranges.len();
	for i in 0..len {
	let range = self.ranges[i];
	if let Err(err) = range.case_fold_simple(&mut self.ranges) {
	self.canonicalize();
	return Err(err);
	}
	}
	self.canonicalize();
	Ok(())
	}

	/// Union this set with the given set, in place.
	pub fn union(&mut self, other: &IntervalSet<I>) {
	// This could almost certainly be done more efficiently.
	self.ranges.extend(&other.ranges);
	self.canonicalize();
	}

	/// Intersect this set with the given set, in place.
	pub fn intersect(&mut self, other: &IntervalSet<I>) {
	if self.ranges.is_empty() {
	return;
	}
	if other.ranges.is_empty() {
	self.ranges.clear();
	return;
	}

	// There should be a way to do this in-place with constant memory,
	// but I couldn't figure out a simple way to do it. So just append
	// the intersection to the end of this range, and then drain it before
	// we're done.
	let drain_end = self.ranges.len();

	let mut ita = (0..drain_end).into_iter();
	let mut itb = (0..other.ranges.len()).into_iter();
	let mut a = ita.next().unwrap();
	let mut b = itb.next().unwrap();
	loop {
	if let Some(ab) = self.ranges[a].intersect(&other.ranges[b]) {
	self.ranges.push(ab);
	}
	let (it, aorb) =
	if self.ranges[a].upper() < other.ranges[b].upper() {
	(&mut ita, &mut a)
	} else {
	(&mut itb, &mut b)
	};
	match it.next() {
	Some(v) => *aorb = v,
	None => break,
	}
	}
	self.ranges.drain(..drain_end);
	}

	/// Subtract the given set from this set, in place.
	pub fn difference(&mut self, other: &IntervalSet<I>) {
	if self.ranges.is_empty() \|\| other.ranges.is_empty() {
	return;
	}

	// This algorithm is (to me) surprisingly complex. A search of the
	// interwebs indicate that this is a potentially interesting problem.
	// Folks seem to suggest interval or segment trees, but I'd like to
	// avoid the overhead (both runtime and conceptual) of that.
	//
	// The following is basically my Shitty First Draft. Therefore, in
	// order to grok it, you probably need to read each line carefully.
	// Simplifications are most welcome!
	//
	// Remember, we can assume the canonical format invariant here, which
	// says that all ranges are sorted, not overlapping and not adjacent in
	// each class.
	let drain_end = self.ranges.len();
	let (mut a, mut b) = (0, 0);
	'LOOP: while a < drain_end && b < other.ranges.len() {
	// Basically, the easy cases are when neither range overlaps with
	// each other. If the `b` range is less than our current `a`
	// range, then we can skip it and move on.
	if other.ranges[b].upper() < self.ranges[a].lower() {
	b += 1;
	continue;
	}
	// ... similarly for the `a` range. If it's less than the smallest
	// `b` range, then we can add it as-is.
	if self.ranges[a].upper() < other.ranges[b].lower() {
	let range = self.ranges[a];
	self.ranges.push(range);
	a += 1;
	continue;
	}
	// Otherwise, we have overlapping ranges.
	assert!(!self.ranges[a].is_intersection_empty(&other.ranges[b]));

	// This part is tricky and was non-obvious to me without looking
	// at explicit examples (see the tests). The trickiness stems from
	// two things: 1) subtracting a range from another range could
	// yield two ranges and 2) after subtracting a range, it's possible
	// that future ranges can have an impact. The loop below advances
	// the `b` ranges until they can't possible impact the current
	// range.
	//
	// For example, if our `a` range is `a-t` and our next three `b`
	// ranges are `a-c`, `g-i`, `r-t` and `x-z`, then we need to apply
	// subtraction three times before moving on to the next `a` range.
	let mut range = self.ranges[a];
	while b < other.ranges.len()
	&& !range.is_intersection_empty(&other.ranges[b])
	{
	let old_range = range;
	range = match range.difference(&other.ranges[b]) {
	(None, None) => {
	// We lost the entire range, so move on to the next
	// without adding this one.
	a += 1;
	continue 'LOOP;
	}
	(Some(range1), None) \| (None, Some(range1)) => range1,
	(Some(range1), Some(range2)) => {
	self.ranges.push(range1);
	range2
	}
	};
	// It's possible that the `b` range has more to contribute
	// here. In particular, if it is greater than the original
	// range, then it might impact the next `a` range and it
	// has impacted the current `a` range as much as possible,
	// so we can quit. We don't bump `b` so that the next `a`
	// range can apply it.
	if other.ranges[b].upper() > old_range.upper() {
	break;
	}
	// Otherwise, the next `b` range might apply to the current
	// `a` range.
	b += 1;
	}
	self.ranges.push(range);
	a += 1;
	}
	while a < drain_end {
	let range = self.ranges[a];
	self.ranges.push(range);
	a += 1;
	}
	self.ranges.drain(..drain_end);
	}

	/// Compute the symmetric difference of the two sets, in place.
	///
	/// This computes the symmetric difference of two interval sets. This
	/// removes all elements in this set that are also in the given set,
	/// but also adds all elements from the given set that aren't in this
	/// set. That is, the set will contain all elements in either set,
	/// but will not contain any elements that are in both sets.
	pub fn symmetric_difference(&mut self, other: &IntervalSet<I>) {
	// TODO(burntsushi): Fix this so that it amortizes allocation.
	let mut intersection = self.clone();
	intersection.intersect(other);
	self.union(other);
	self.difference(&intersection);
	}

	/// Negate this interval set.
	///
	/// For all `x` where `x` is any element, if `x` was in this set, then it
	/// will not be in this set after negation.
	pub fn negate(&mut self) {
	if self.ranges.is_empty() {
	let (min, max) = (I::Bound::min_value(), I::Bound::max_value());
	self.ranges.push(I::create(min, max));
	return;
	}

	// There should be a way to do this in-place with constant memory,
	// but I couldn't figure out a simple way to do it. So just append
	// the negation to the end of this range, and then drain it before
	// we're done.
	let drain_end = self.ranges.len();

	// We do checked arithmetic below because of the canonical ordering
	// invariant.
	if self.ranges[0].lower() > I::Bound::min_value() {
	let upper = self.ranges[0].lower().decrement();
	self.ranges.push(I::create(I::Bound::min_value(), upper));
	}
	for i in 1..drain_end {
	let lower = self.ranges[i - 1].upper().increment();
	let upper = self.ranges[i].lower().decrement();
	self.ranges.push(I::create(lower, upper));
	}
	if self.ranges[drain_end - 1].upper() < I::Bound::max_value() {
	let lower = self.ranges[drain_end - 1].upper().increment();
	self.ranges.push(I::create(lower, I::Bound::max_value()));
	}
	self.ranges.drain(..drain_end);
	}

	/// Converts this set into a canonical ordering.
	fn canonicalize(&mut self) {
	if self.is_canonical() {
	return;
	}
	self.ranges.sort();
	assert!(!self.ranges.is_empty());

	// Is there a way to do this in-place with constant memory? I couldn't
	// figure out a way to do it. So just append the canonicalization to
	// the end of this range, and then drain it before we're done.
	let drain_end = self.ranges.len();
	for oldi in 0..drain_end {
	// If we've added at least one new range, then check if we can
	// merge this range in the previously added range.
	if self.ranges.len() > drain_end {
	let (last, rest) = self.ranges.split_last_mut().unwrap();
	if let Some(union) = last.union(&rest[oldi]) {
	*last = union;
	continue;
	}
	}
	let range = self.ranges[oldi];
	self.ranges.push(range);
	}
	self.ranges.drain(..drain_end);
	}

	/// Returns true if and only if this class is in a canonical ordering.
	fn is_canonical(&self) -> bool {
	for pair in self.ranges.windows(2) {
	if pair[0] >= pair[1] {
	return false;
	}
	if pair[0].is_contiguous(&pair[1]) {
	return false;
	}
	}
	true
	}
	}

	/// An iterator over intervals.
	#[derive(Debug)]
	pub struct IntervalSetIter<'a, I: 'a>(slice::Iter<'a, I>);

	impl<'a, I> Iterator for IntervalSetIter<'a, I> {
	type Item = &'a I;

	fn next(&mut self) -> Option<&'a I> {
	self.0.next()
	}
	}

	pub trait Interval:
	Clone + Copy + Debug + Default + Eq + PartialEq + PartialOrd + Ord
	{
	type Bound: Bound;

	fn lower(&self) -> Self::Bound;
	fn upper(&self) -> Self::Bound;
	fn set_lower(&mut self, bound: Self::Bound);
	fn set_upper(&mut self, bound: Self::Bound);
	fn case_fold_simple(
	&self,
	intervals: &mut Vec<Self>,
	) -> Result<(), unicode::CaseFoldError>;

	/// Create a new interval.
	fn create(lower: Self::Bound, upper: Self::Bound) -> Self {
	let mut int = Self::default();
	if lower <= upper {
	int.set_lower(lower);
	int.set_upper(upper);
	} else {
	int.set_lower(upper);
	int.set_upper(lower);
	}
	int
	}

	/// Union the given overlapping range into this range.
	///
	/// If the two ranges aren't contiguous, then this returns `None`.
	fn union(&self, other: &Self) -> Option<Self> {
	if !self.is_contiguous(other) {
	return None;
	}
	let lower = cmp::min(self.lower(), other.lower());
	let upper = cmp::max(self.upper(), other.upper());
	Some(Self::create(lower, upper))
	}

	/// Intersect this range with the given range and return the result.
	///
	/// If the intersection is empty, then this returns `None`.
	fn intersect(&self, other: &Self) -> Option<Self> {
	let lower = cmp::max(self.lower(), other.lower());
	let upper = cmp::min(self.upper(), other.upper());
	if lower <= upper {
	Some(Self::create(lower, upper))
	} else {
	None
	}
	}

	/// Subtract the given range from this range and return the resulting
	/// ranges.
	///
	/// If subtraction would result in an empty range, then no ranges are
	/// returned.
	fn difference(&self, other: &Self) -> (Option<Self>, Option<Self>) {
	if self.is_subset(other) {
	return (None, None);
	}
	if self.is_intersection_empty(other) {
	return (Some(self.clone()), None);
	}
	let add_lower = other.lower() > self.lower();
	let add_upper = other.upper() < self.upper();
	// We know this because !self.is_subset(other) and the ranges have
	// a non-empty intersection.
	assert!(add_lower \|\| add_upper);
	let mut ret = (None, None);
	if add_lower {
	let upper = other.lower().decrement();
	ret.0 = Some(Self::create(self.lower(), upper));
	}
	if add_upper {
	let lower = other.upper().increment();
	let range = Self::create(lower, self.upper());
	if ret.0.is_none() {
	ret.0 = Some(range);
	} else {
	ret.1 = Some(range);
	}
	}
	ret
	}

	/// Compute the symmetric difference the given range from this range. This
	/// returns the union of the two ranges minus its intersection.
	fn symmetric_difference(
	&self,
	other: &Self,
	) -> (Option<Self>, Option<Self>) {
	let union = match self.union(other) {
	None => return (Some(self.clone()), Some(other.clone())),
	Some(union) => union,
	};
	let intersection = match self.intersect(other) {
	None => return (Some(self.clone()), Some(other.clone())),
	Some(intersection) => intersection,
	};
	union.difference(&intersection)
	}

	/// Returns true if and only if the two ranges are contiguous. Two ranges
	/// are contiguous if and only if the ranges are either overlapping or
	/// adjacent.
	fn is_contiguous(&self, other: &Self) -> bool {
	let lower1 = self.lower().as_u32();
	let upper1 = self.upper().as_u32();
	let lower2 = other.lower().as_u32();
	let upper2 = other.upper().as_u32();
	cmp::max(lower1, lower2) <= cmp::min(upper1, upper2).saturating_add(1)
	}

	/// Returns true if and only if the intersection of this range and the
	/// other range is empty.
	fn is_intersection_empty(&self, other: &Self) -> bool {
	let (lower1, upper1) = (self.lower(), self.upper());
	let (lower2, upper2) = (other.lower(), other.upper());
	cmp::max(lower1, lower2) > cmp::min(upper1, upper2)
	}

	/// Returns true if and only if this range is a subset of the other range.
	fn is_subset(&self, other: &Self) -> bool {
	let (lower1, upper1) = (self.lower(), self.upper());
	let (lower2, upper2) = (other.lower(), other.upper());
	(lower2 <= lower1 && lower1 <= upper2)
	&& (lower2 <= upper1 && upper1 <= upper2)
	}
	}

	pub trait Bound:
	Copy + Clone + Debug + Eq + PartialEq + PartialOrd + Ord
	{
	fn min_value() -> Self;
	fn max_value() -> Self;
	fn as_u32(self) -> u32;
	fn increment(self) -> Self;
	fn decrement(self) -> Self;
	}

	impl Bound for u8 {
	fn min_value() -> Self {
	u8::MIN
	}
	fn max_value() -> Self {
	u8::MAX
	}
	fn as_u32(self) -> u32 {
	self as u32
	}
	fn increment(self) -> Self {
	self.checked_add(1).unwrap()
	}
	fn decrement(self) -> Self {
	self.checked_sub(1).unwrap()
	}
	}

	impl Bound for char {
	fn min_value() -> Self {
	'\x00'
	}
	fn max_value() -> Self {
	'\u{10FFFF}'
	}
	fn as_u32(self) -> u32 {
	self as u32
	}

	fn increment(self) -> Self {
	match self {
	'\u{D7FF}' => '\u{E000}',
	c => char::from_u32((c as u32).checked_add(1).unwrap()).unwrap(),
	}
	}

	fn decrement(self) -> Self {
	match self {
	'\u{E000}' => '\u{D7FF}',
	c => char::from_u32((c as u32).checked_sub(1).unwrap()).unwrap(),
	}
	}
	}

	// Tests for interval sets are written in src/hir.rs against the public API.