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LSSTDataManagementBasePackage
Interval.h
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22 
23 #ifndef LSST_SPHGEOM_INTERVAL_H_
24 #define LSST_SPHGEOM_INTERVAL_H_
25 
28 
29 #include <algorithm>
30 
31 #include "Relationship.h"
32 
33 
34 namespace lsst {
35 namespace sphgeom {
36 
47 template <typename Derived, typename Scalar>
48 class Interval {
49 public:
51  Interval() : _a(1.0), _b(0.0) {}
52 
54  explicit Interval(Scalar x) : _a(x), _b(x) {}
55 
57  Interval(Scalar x, Scalar y) : _a(x), _b(y) {}
58 
61  bool operator==(Interval const & i) const {
62  return (_a == i._a && _b == i._b) || (i.isEmpty() && isEmpty());
63  }
64 
65  bool operator!=(Interval const & i) const { return !(*this == i); }
66 
68  bool operator==(Scalar x) const {
69  return (_a == x && _b == x) || (x != x && isEmpty());
70  }
71 
72  bool operator!=(Scalar x) const { return !(*this == x); }
73 
76  Scalar getA() const { return _a; }
77 
80  Scalar getB() const { return _b; }
81 
83  bool isEmpty() const {
84  return !(_a <= _b); // returns true when _a and/or _b is NaN
85  }
86 
89  Scalar getCenter() const { return 0.5 * (_a + _b); }
90 
93  Scalar getSize() const { return _b - _a; }
94 
98  bool contains(Scalar x) const {
99  return (_a <= x && x <= _b) || x != x;
100  }
101 
102  bool contains(Interval const & x) const {
103  if (x.isEmpty()) {
104  return true;
105  } else if (isEmpty()) {
106  return false;
107  }
108  return _a <= x._a && _b >= x._b;
109  }
111 
115  bool isDisjointFrom(Scalar x) const {
116  return !intersects(x);
117  }
118 
119  bool isDisjointFrom(Interval const & x) const {
120  if (isEmpty() || x.isEmpty()) {
121  return true;
122  }
123  return _a > x._b || _b < x._a;
124  }
126 
130  bool intersects(Scalar x) const { return _a <= x && x <= _b; }
131 
132  bool intersects(Interval const & x) const {
133  return !isDisjointFrom(x);
134  }
136 
140  bool isWithin(Scalar x) const {
141  return (_a == x && _b == x) || isEmpty();
142  }
143 
144  bool isWithin(Interval const & x) const {
145  return x.contains(*this);
146  }
148 
153  Relationship relate(Scalar x) const;
154  Relationship relate(Interval const & x) const;
156 
160  if (x != x) {
161  _a = x;
162  _b = x;
163  } else {
164  _a = std::max(_a, x);
165  _b = std::min(_b, x);
166  }
167  return *this;
168  }
169 
170  Interval & clipTo(Interval const & x) {
171  if (x.isEmpty()) {
172  *this = x;
173  } else if (!isEmpty()) {
174  _a = std::max(_a, x._a);
175  _b = std::min(_b, x._b);
176  }
177  return *this;
178  }
180 
183  Derived clippedTo(Scalar x) const { return Interval(*this).clipTo(x); }
184 
185  Derived clippedTo(Interval const & x) const {
186  return Interval(*this).clipTo(x);
187  }
189 
193  if (isEmpty()) {
194  _a = x;
195  _b = x;
196  } else if (x < _a) {
197  _a = x;
198  } else if (x > _b) {
199  _b = x;
200  }
201  return *this;
202  }
203 
204  Interval & expandTo(Interval const & x) {
205  if (isEmpty()) {
206  *this = x;
207  } else if (!x.isEmpty()) {
208  _a = std::min(_a, x._a);
209  _b = std::max(_b, x._b);
210  }
211  return *this;
212  }
214 
218  Derived expandedTo(Scalar x) const { return Interval(*this).expandTo(x); }
219 
220  Derived expandedTo(Interval const & x) const {
221  return Interval(*this).expandTo(x);
222  }
224 
231  if (x == x && !isEmpty()) {
232  _a = _a - x;
233  _b = _b + x;
234  }
235  return *this;
236  }
237 
238  Interval & erodeBy(Scalar x) { return dilateBy(-x); }
239  Derived dilatedBy(Scalar x) const { return Interval(*this).dilateBy(x); }
240  Derived erodedBy(Scalar x) const { return Interval(*this).erodeBy(x); }
241 
242 private:
243  Scalar _a;
244  Scalar _b;
245 };
246 
247 
248 template <typename Derived, typename Scalar>
250  if (isEmpty()) {
251  if (x != x) {
252  return CONTAINS | DISJOINT | WITHIN;
253  }
254  return DISJOINT | WITHIN;
255  }
256  if (x != x) {
257  return CONTAINS | DISJOINT;
258  }
259  if (_a == x && _b == x) {
260  return CONTAINS | WITHIN;
261  }
262  if (intersects(x)) {
263  return CONTAINS;
264  }
265  return DISJOINT;
266 }
267 
268 template <typename Derived, typename Scalar>
270  Interval<Derived, Scalar> const & x) const
271 {
272  if (isEmpty()) {
273  if (x.isEmpty()) {
274  return CONTAINS | DISJOINT | WITHIN;
275  }
276  return DISJOINT | WITHIN;
277  }
278  if (x.isEmpty()) {
279  return CONTAINS | DISJOINT;
280  }
281  if (_a == x._a && _b == x._b) {
282  return CONTAINS | WITHIN;
283  }
284  if (_a > x._b || _b < x._a) {
285  return DISJOINT;
286  }
287  if (_a <= x._a && _b >= x._b) {
288  return CONTAINS;
289  }
290  if (x._a <= _a && x._b >= _b) {
291  return WITHIN;
292  }
293  return INTERSECTS;
294 }
295 
296 }} // namespace lsst::sphgeom
297 
298 #endif // LSST_SPHGEOM_INTERVAL_H_
Derived clippedTo(Scalar x) const
Definition: Interval.h:183
Scalar getA() const
getA returns the lower endpoint of this interval.
Definition: Interval.h:76
Interval & erodeBy(Scalar x)
Definition: Interval.h:238
bool isWithin(Interval const &x) const
Definition: Interval.h:144
Interval & clipTo(Scalar x)
Definition: Interval.h:159
bool isDisjointFrom(Interval const &x) const
Definition: Interval.h:119
int y
Definition: SpanSet.cc:49
double Scalar
Typedefs to be used for probability and parameter values.
Definition: common.h:44
bool isWithin(Scalar x) const
Definition: Interval.h:140
Interval()
This constructor creates an empty interval.
Definition: Interval.h:51
bool contains(Interval const &x) const
Definition: Interval.h:102
Scalar getCenter() const
getCenter returns the center of this interval.
Definition: Interval.h:89
Derived erodedBy(Scalar x) const
Definition: Interval.h:240
Scalar getSize() const
getSize returns the size (length, width) of this interval.
Definition: Interval.h:93
T min(T... args)
Interval & clipTo(Interval const &x)
Definition: Interval.h:170
Relationship relate(Scalar x) const
Definition: Interval.h:249
A base class for image defects.
bool intersects(Interval const &x) const
Definition: Interval.h:132
Interval & expandTo(Scalar x)
Definition: Interval.h:192
Interval(Scalar x, Scalar y)
This constructor creates an interval from the given endpoints.
Definition: Interval.h:57
Derived expandedTo(Scalar x) const
Definition: Interval.h:218
Interval(Scalar x)
This constructor creates a closed interval containing only x.
Definition: Interval.h:54
bool isEmpty() const
isEmpty returns true if this interval does not contain any points.
Definition: Interval.h:83
T max(T... args)
Derived dilatedBy(Scalar x) const
Definition: Interval.h:239
double x
bool operator!=(Scalar x) const
Definition: Interval.h:72
bool operator==(Scalar x) const
A closed interval is equal to a point x if both endpoints equal x.
Definition: Interval.h:68
Scalar getB() const
getB returns the upper endpoint of this interval.
Definition: Interval.h:80
This file provides a type alias for describing set relationships.
Derived clippedTo(Interval const &x) const
Definition: Interval.h:185
bool isDisjointFrom(Scalar x) const
Definition: Interval.h:115
bool contains(Scalar x) const
Definition: Interval.h:98
Interval represents a closed interval of the real numbers by its upper and lower bounds.
Definition: Interval.h:48
Interval & dilateBy(Scalar x)
For positive x, dilateBy morphologically dilates this interval by [-x,x], which is equivalent to the ...
Definition: Interval.h:230
STL class.
bool operator!=(Interval const &i) const
Definition: Interval.h:65
Interval & expandTo(Interval const &x)
Definition: Interval.h:204
Derived expandedTo(Interval const &x) const
Definition: Interval.h:220
bool intersects(Scalar x) const
Definition: Interval.h:130
bool operator==(Interval const &i) const
Two closed intervals are equal if their endpoints are the same, or both are empty.
Definition: Interval.h:61