src/net/base/interval.h - cobalt - Git at Google

 // Copyright 2015 The Chromium Authors. All rights reserved.
 // Use of this source code is governed by a BSD-style license that can be
 // found in the LICENSE file.
 //
 // An Interval<T> is a data structure used to represent a contiguous, mutable
 // range over an ordered type T. Supported operations include testing a value to
 // see whether it is included in the interval, comparing two intervals, and
 // performing their union, intersection, and difference. For the purposes of
 // this library, an "ordered type" is any type that induces a total order on its
 // values via its less-than operator (operator<()). Examples of such types are
 // basic arithmetic types like int and double as well as class types like
 // string.
 //
 // An Interval<T> is represented using the usual C++ STL convention, namely as
 // the half-open interval [min, max). A point p is considered to be contained in
 // the interval iff p >= min && p < max. One consequence of this definition is
 // that for any non-empty interval, min is contained in the interval but max is
 // not. There is no canonical representation for the empty interval; rather, any
 // interval where max <= min is regarded as empty. As a consequence, two empty
 // intervals will still compare as equal despite possibly having different
 // underlying min() or max() values. Also beware of the terminology used here:
 // the library uses the terms "min" and "max" rather than "begin" and "end" as
 // is conventional for the STL.
 //
 // T is required to be default- and copy-constructable, to have an assignment
 // operator, and the full complement of comparison operators (<, <=, ==, !=, >=,
 // >).  A difference operator (operator-()) is required if Interval<T>::Length
 // is used.
 //
 // For equality comparisons, Interval<T> supports an Equals() method and an
 // operator==() which delegates to it. Two intervals are considered equal if
 // either they are both empty or if their corresponding min and max fields
 // compare equal. For ordered comparisons, Interval<T> also provides the
 // comparator Interval<T>::Less and an operator<() which delegates to it.
 // Unfortunately this comparator is currently buggy because its behavior is
 // inconsistent with Equals(): two empty ranges with different representations
 // may be regarded as equivalent by Equals() but regarded as different by
 // the comparator. Bug 9240050 has been created to address this.
 //
 // This class is thread-compatible if T is thread-compatible. (See
 // go/thread-compatible).
 //
 // Examples:
 //   Interval<int> r1(0, 100);  // The interval [0, 100).
 //   EXPECT_TRUE(r1.Contains(0));
 //   EXPECT_TRUE(r1.Contains(50));
 //   EXPECT_FALSE(r1.Contains(100));  // 100 is just outside the interval.
 //
 //   Interval<int> r2(50, 150);  // The interval [50, 150).
 //   EXPECT_TRUE(r1.Intersects(r2));
 //   EXPECT_FALSE(r1.Contains(r2));
 //   EXPECT_TRUE(r1.IntersectWith(r2));  // Mutates r1.
 //   EXPECT_EQ(Interval<int>(50, 100), r1);  // r1 is now [50, 100).
 //
 //   Interval<int> r3(1000, 2000);  // The interval [1000, 2000).
 //   EXPECT_TRUE(r1.IntersectWith(r3));  // Mutates r1.
 //   EXPECT_TRUE(r1.Empty());  // Now r1 is empty.
 //   EXPECT_FALSE(r1.Contains(r1.min()));  // e.g. doesn't contain its own min.

 #ifndef NET_BASE_INTERVAL_H_
 #define NET_BASE_INTERVAL_H_

 #include <algorithm>
 #include <functional>
 #include <ostream>
 #include <string>
 #include <utility>
 #include <vector>

 #include "starboard/types.h"

 namespace net {

 template <typename T>
 class Interval {
  private:
 // TODO(rtenneti): Implement after suupport for std::decay.
 #if 0
   // Type trait for deriving the return type for Interval::Length.  If
   // operator-() is not defined for T, then the return type is void.  This makes
   // the signature for Length compile so that the class can be used for such T,
   // but code that calls Length would still generate a compilation error.
   template <typename U>
   class DiffTypeOrVoid {
    private:
     template <typename V>
     static auto f(const V* v) -> decltype(*v - *v);
     template <typename V>
     static void f(...);

    public:
     using type = typename std::decay<decltype(f<U>(0))>::type;
   };
 #endif

  public:
   // Compatibility alias.
   using Less = std::less<Interval>;

   // Construct an Interval representing an empty interval.
   Interval() : min_(), max_() {}

   // Construct an Interval representing the interval [min, max). If min < max,
   // the constructed object will represent the non-empty interval containing all
   // values from min up to (but not including) max. On the other hand, if min >=
   // max, the constructed object will represent the empty interval.
   Interval(const T& min, const T& max) : min_(min), max_(max) {}

   const T& min() const { return min_; }
   const T& max() const { return max_; }
   void SetMin(const T& t) { min_ = t; }
   void SetMax(const T& t) { max_ = t; }

   void Set(const T& min, const T& max) {
     SetMin(min);
     SetMax(max);
   }

   void Clear() { *this = {}; }
   void CopyFrom(const Interval& i) { *this = i; }
   bool Equals(const Interval& i) const { return *this == i; }
   bool Empty() const { return min() >= max(); }

   // Returns the length of this interval. The value returned is zero if
   // IsEmpty() is true; otherwise the value returned is max() - min().
   const T Length() const { return (min_ >= max_ ? min_ : max_) - min_; }

   // Returns true iff t >= min() && t < max().
   bool Contains(const T& t) const { return min() <= t && max() > t; }

   // Returns true iff *this and i are non-empty, and *this includes i. "*this
   // includes i" means that for all t, if i.Contains(t) then this->Contains(t).
   // Note the unintuitive consequence of this definition: this method always
   // returns false when i is the empty interval.
   bool Contains(const Interval& i) const {
     return !Empty() && !i.Empty() && min() <= i.min() && max() >= i.max();
   }

   // Returns true iff there exists some point t for which this->Contains(t) &&
   // i.Contains(t) evaluates to true, i.e. if the intersection is non-empty.
   bool Intersects(const Interval& i) const {
     return !Empty() && !i.Empty() && min() < i.max() && max() > i.min();
   }

   // Returns true iff there exists some point t for which this->Contains(t) &&
   // i.Contains(t) evaluates to true, i.e. if the intersection is non-empty.
   // Furthermore, if the intersection is non-empty and the intersection pointer
   // is not null, this method stores the calculated intersection in
   // *intersection.
   bool Intersects(const Interval& i, Interval* out) const;

   // Sets *this to be the intersection of itself with i. Returns true iff
   // *this was modified.
   bool IntersectWith(const Interval& i);

   // Calculates the smallest interval containing both *this i, and updates *this
   // to represent that interval, and returns true iff *this was modified.
   bool SpanningUnion(const Interval& i);

   // Determines the difference between two intervals as in
   // Difference(Interval&, vector*), but stores the results directly in out
   // parameters rather than dynamically allocating an Interval* and appending
   // it to a vector. If two results are generated, the one with the smaller
   // value of min() will be stored in *lo and the other in *hi. Otherwise (if
   // fewer than two results are generated), unused arguments will be set to the
   // empty interval (it is possible that *lo will be empty and *hi non-empty).
   // The method returns true iff the intersection of *this and i is non-empty.
   bool Difference(const Interval& i, Interval* lo, Interval* hi) const;

   friend bool operator==(const Interval& a, const Interval& b) {
     bool ae = a.Empty();
     bool be = b.Empty();
     if (ae && be)
       return true;  // All empties are equal.
     if (ae != be)
       return false;  // Empty cannot equal nonempty.
     return a.min() == b.min() && a.max() == b.max();
   }

   friend bool operator!=(const Interval& a, const Interval& b) {
     return !(a == b);
   }

   // Defines a comparator which can be used to induce an order on Intervals, so
   // that, for example, they can be stored in an ordered container such as
   // std::set. The ordering is arbitrary, but does provide the guarantee that,
   // for non-empty intervals X and Y, if X contains Y, then X <= Y.
   // TODO(kosak): The current implementation of this comparator has a problem
   // because the ordering it induces is inconsistent with that of Equals(). In
   // particular, this comparator does not properly consider all empty intervals
   // equivalent. Bug b/9240050 has been created to track this.
   friend bool operator<(const Interval& a, const Interval& b) {
     return a.min() < b.min() || (a.min() == b.min() && a.max() > b.max());
   }

   friend std::ostream& operator<<(std::ostream& out, const Interval& i) {
     return out << "[" << i.min() << ", " << i.max() << ")";
   }

  private:
   T min_;  // Inclusive lower bound.
   T max_;  // Exclusive upper bound.
 };

 //==============================================================================
 // Implementation details: Clients can stop reading here.

 template <typename T>
 bool Interval<T>::Intersects(const Interval& i, Interval* out) const {
   if (!Intersects(i))
     return false;
   if (out != nullptr) {
     *out = Interval(std::max(min(), i.min()), std::min(max(), i.max()));
   }
   return true;
 }

 template <typename T>
 bool Interval<T>::IntersectWith(const Interval& i) {
   if (Empty())
     return false;
   bool modified = false;
   if (i.min() > min()) {
     SetMin(i.min());
     modified = true;
   }
   if (i.max() < max()) {
     SetMax(i.max());
     modified = true;
   }
   return modified;
 }

 template <typename T>
 bool Interval<T>::SpanningUnion(const Interval& i) {
   if (i.Empty())
     return false;
   if (Empty()) {
     *this = i;
     return true;
   }
   bool modified = false;
   if (i.min() < min()) {
     SetMin(i.min());
     modified = true;
   }
   if (i.max() > max()) {
     SetMax(i.max());
     modified = true;
   }
   return modified;
 }

 template <typename T>
 bool Interval<T>::Difference(const Interval& i,
                              Interval* lo,
                              Interval* hi) const {
   // Initialize *lo and *hi to empty
   *lo = {};
   *hi = {};
   if (Empty())
     return false;
   if (i.Empty()) {
     *lo = *this;
     return false;
   }
   if (min() < i.max() && min() >= i.min() && max() > i.max()) {
     //            [------ this ------)
     // [------ i ------)
     //                 [-- result ---)
     *hi = Interval(i.max(), max());
     return true;
   }
   if (max() > i.min() && max() <= i.max() && min() < i.min()) {
     // [------ this ------)
     //            [------ i ------)
     // [- result -)
     *lo = Interval(min(), i.min());
     return true;
   }
   if (min() < i.min() && max() > i.max()) {
     // [------- this --------)
     //      [---- i ----)
     // [ R1 )           [ R2 )
     // There are two results: R1 and R2.
     *lo = Interval(min(), i.min());
     *hi = Interval(i.max(), max());
     return true;
   }
   if (min() >= i.min() && max() <= i.max()) {
     //   [--- this ---)
     // [------ i --------)
     // Intersection is <this>, so difference yields the empty interval.
     return true;
   }
   *lo = *this;  // No intersection.
   return false;
 }

 }  // namespace net

 #endif  // NET_BASE_INTERVAL_H_
	// Copyright 2015 The Chromium Authors. All rights reserved.
	// Use of this source code is governed by a BSD-style license that can be
	// found in the LICENSE file.
	//
	// An Interval<T> is a data structure used to represent a contiguous, mutable
	// range over an ordered type T. Supported operations include testing a value to
	// see whether it is included in the interval, comparing two intervals, and
	// performing their union, intersection, and difference. For the purposes of
	// this library, an "ordered type" is any type that induces a total order on its
	// values via its less-than operator (operator<()). Examples of such types are
	// basic arithmetic types like int and double as well as class types like
	// string.
	//
	// An Interval<T> is represented using the usual C++ STL convention, namely as
	// the half-open interval [min, max). A point p is considered to be contained in
	// the interval iff p >= min && p < max. One consequence of this definition is
	// that for any non-empty interval, min is contained in the interval but max is
	// not. There is no canonical representation for the empty interval; rather, any
	// interval where max <= min is regarded as empty. As a consequence, two empty
	// intervals will still compare as equal despite possibly having different
	// underlying min() or max() values. Also beware of the terminology used here:
	// the library uses the terms "min" and "max" rather than "begin" and "end" as
	// is conventional for the STL.
	//
	// T is required to be default- and copy-constructable, to have an assignment
	// operator, and the full complement of comparison operators (<, <=, ==, !=, >=,
	// >). A difference operator (operator-()) is required if Interval<T>::Length
	// is used.
	//
	// For equality comparisons, Interval<T> supports an Equals() method and an
	// operator==() which delegates to it. Two intervals are considered equal if
	// either they are both empty or if their corresponding min and max fields
	// compare equal. For ordered comparisons, Interval<T> also provides the
	// comparator Interval<T>::Less and an operator<() which delegates to it.
	// Unfortunately this comparator is currently buggy because its behavior is
	// inconsistent with Equals(): two empty ranges with different representations
	// may be regarded as equivalent by Equals() but regarded as different by
	// the comparator. Bug 9240050 has been created to address this.
	//
	// This class is thread-compatible if T is thread-compatible. (See
	// go/thread-compatible).
	//
	// Examples:
	// Interval<int> r1(0, 100); // The interval [0, 100).
	// EXPECT_TRUE(r1.Contains(0));
	// EXPECT_TRUE(r1.Contains(50));
	// EXPECT_FALSE(r1.Contains(100)); // 100 is just outside the interval.
	//
	// Interval<int> r2(50, 150); // The interval [50, 150).
	// EXPECT_TRUE(r1.Intersects(r2));
	// EXPECT_FALSE(r1.Contains(r2));
	// EXPECT_TRUE(r1.IntersectWith(r2)); // Mutates r1.
	// EXPECT_EQ(Interval<int>(50, 100), r1); // r1 is now [50, 100).
	//
	// Interval<int> r3(1000, 2000); // The interval [1000, 2000).
	// EXPECT_TRUE(r1.IntersectWith(r3)); // Mutates r1.
	// EXPECT_TRUE(r1.Empty()); // Now r1 is empty.
	// EXPECT_FALSE(r1.Contains(r1.min())); // e.g. doesn't contain its own min.

	#ifndef NET_BASE_INTERVAL_H_
	#define NET_BASE_INTERVAL_H_

	#include <algorithm>
	#include <functional>
	#include <ostream>
	#include <string>
	#include <utility>
	#include <vector>

	#include "starboard/types.h"

	namespace net {

	template <typename T>
	class Interval {
	private:
	// TODO(rtenneti): Implement after suupport for std::decay.
	#if 0
	// Type trait for deriving the return type for Interval::Length. If
	// operator-() is not defined for T, then the return type is void. This makes
	// the signature for Length compile so that the class can be used for such T,
	// but code that calls Length would still generate a compilation error.
	template <typename U>
	class DiffTypeOrVoid {
	private:
	template <typename V>
	static auto f(const V* v) -> decltype(v - v);
	template <typename V>
	static void f(...);

	public:
	using type = typename std::decay<decltype(f<U>(0))>::type;
	};
	#endif

	public:
	// Compatibility alias.
	using Less = std::less<Interval>;

	// Construct an Interval representing an empty interval.
	Interval() : min_(), max_() {}

	// Construct an Interval representing the interval [min, max). If min < max,
	// the constructed object will represent the non-empty interval containing all
	// values from min up to (but not including) max. On the other hand, if min >=
	// max, the constructed object will represent the empty interval.
	Interval(const T& min, const T& max) : min_(min), max_(max) {}

	const T& min() const { return min_; }
	const T& max() const { return max_; }
	void SetMin(const T& t) { min_ = t; }
	void SetMax(const T& t) { max_ = t; }

	void Set(const T& min, const T& max) {
	SetMin(min);
	SetMax(max);
	}

	void Clear() { *this = {}; }
	void CopyFrom(const Interval& i) { *this = i; }
	bool Equals(const Interval& i) const { return *this == i; }
	bool Empty() const { return min() >= max(); }

	// Returns the length of this interval. The value returned is zero if
	// IsEmpty() is true; otherwise the value returned is max() - min().
	const T Length() const { return (min_ >= max_ ? min_ : max_) - min_; }

	// Returns true iff t >= min() && t < max().
	bool Contains(const T& t) const { return min() <= t && max() > t; }

	// Returns true iff this and i are non-empty, and this includes i. "*this
	// includes i" means that for all t, if i.Contains(t) then this->Contains(t).
	// Note the unintuitive consequence of this definition: this method always
	// returns false when i is the empty interval.
	bool Contains(const Interval& i) const {
	return !Empty() && !i.Empty() && min() <= i.min() && max() >= i.max();
	}

	// Returns true iff there exists some point t for which this->Contains(t) &&
	// i.Contains(t) evaluates to true, i.e. if the intersection is non-empty.
	bool Intersects(const Interval& i) const {
	return !Empty() && !i.Empty() && min() < i.max() && max() > i.min();
	}

	// Returns true iff there exists some point t for which this->Contains(t) &&
	// i.Contains(t) evaluates to true, i.e. if the intersection is non-empty.
	// Furthermore, if the intersection is non-empty and the intersection pointer
	// is not null, this method stores the calculated intersection in
	// *intersection.
	bool Intersects(const Interval& i, Interval* out) const;

	// Sets *this to be the intersection of itself with i. Returns true iff
	// *this was modified.
	bool IntersectWith(const Interval& i);

	// Calculates the smallest interval containing both this i, and updates this
	// to represent that interval, and returns true iff *this was modified.
	bool SpanningUnion(const Interval& i);

	// Determines the difference between two intervals as in
	// Difference(Interval&, vector*), but stores the results directly in out
	// parameters rather than dynamically allocating an Interval* and appending
	// it to a vector. If two results are generated, the one with the smaller
	// value of min() will be stored in lo and the other in hi. Otherwise (if
	// fewer than two results are generated), unused arguments will be set to the
	// empty interval (it is possible that lo will be empty and hi non-empty).
	// The method returns true iff the intersection of *this and i is non-empty.
	bool Difference(const Interval& i, Interval* lo, Interval* hi) const;

	friend bool operator==(const Interval& a, const Interval& b) {
	bool ae = a.Empty();
	bool be = b.Empty();
	if (ae && be)
	return true; // All empties are equal.
	if (ae != be)
	return false; // Empty cannot equal nonempty.
	return a.min() == b.min() && a.max() == b.max();
	}

	friend bool operator!=(const Interval& a, const Interval& b) {
	return !(a == b);
	}

	// Defines a comparator which can be used to induce an order on Intervals, so
	// that, for example, they can be stored in an ordered container such as
	// std::set. The ordering is arbitrary, but does provide the guarantee that,
	// for non-empty intervals X and Y, if X contains Y, then X <= Y.
	// TODO(kosak): The current implementation of this comparator has a problem
	// because the ordering it induces is inconsistent with that of Equals(). In
	// particular, this comparator does not properly consider all empty intervals
	// equivalent. Bug b/9240050 has been created to track this.
	friend bool operator<(const Interval& a, const Interval& b) {
	return a.min() < b.min() \|\| (a.min() == b.min() && a.max() > b.max());
	}

	friend std::ostream& operator<<(std::ostream& out, const Interval& i) {
	return out << "[" << i.min() << ", " << i.max() << ")";
	}

	private:
	T min_; // Inclusive lower bound.
	T max_; // Exclusive upper bound.
	};

	//==============================================================================
	// Implementation details: Clients can stop reading here.

	template <typename T>
	bool Interval<T>::Intersects(const Interval& i, Interval* out) const {
	if (!Intersects(i))
	return false;
	if (out != nullptr) {
	*out = Interval(std::max(min(), i.min()), std::min(max(), i.max()));
	}
	return true;
	}

	template <typename T>
	bool Interval<T>::IntersectWith(const Interval& i) {
	if (Empty())
	return false;
	bool modified = false;
	if (i.min() > min()) {
	SetMin(i.min());
	modified = true;
	}
	if (i.max() < max()) {
	SetMax(i.max());
	modified = true;
	}
	return modified;
	}

	template <typename T>
	bool Interval<T>::SpanningUnion(const Interval& i) {
	if (i.Empty())
	return false;
	if (Empty()) {
	*this = i;
	return true;
	}
	bool modified = false;
	if (i.min() < min()) {
	SetMin(i.min());
	modified = true;
	}
	if (i.max() > max()) {
	SetMax(i.max());
	modified = true;
	}
	return modified;
	}

	template <typename T>
	bool Interval<T>::Difference(const Interval& i,
	Interval* lo,
	Interval* hi) const {
	// Initialize lo and hi to empty
	*lo = {};
	*hi = {};
	if (Empty())
	return false;
	if (i.Empty()) {
	lo = this;
	return false;
	}
	if (min() < i.max() && min() >= i.min() && max() > i.max()) {
	// [------ this ------)
	// [------ i ------)
	// [-- result ---)
	*hi = Interval(i.max(), max());
	return true;
	}
	if (max() > i.min() && max() <= i.max() && min() < i.min()) {
	// [------ this ------)
	// [------ i ------)
	// [- result -)
	*lo = Interval(min(), i.min());
	return true;
	}
	if (min() < i.min() && max() > i.max()) {
	// [------- this --------)
	// [---- i ----)
	// [ R1 ) [ R2 )
	// There are two results: R1 and R2.
	*lo = Interval(min(), i.min());
	*hi = Interval(i.max(), max());
	return true;
	}
	if (min() >= i.min() && max() <= i.max()) {
	// [--- this ---)
	// [------ i --------)
	// Intersection is <this>, so difference yields the empty interval.
	return true;
	}
	lo = this; // No intersection.
	return false;
	}

	} // namespace net

	#endif // NET_BASE_INTERVAL_H_