github.com/jingcheng-WU/gonum@v0.9.1-0.20210323123734-f1a2a11a8f7b/integrate/quad/quad.go

github.com/jingcheng-WU/gonum@v0.9.1-0.20210323123734-f1a2a11a8f7b/integrate/quad/quad.go (about)

     1  // Copyright ©2015 The Gonum Authors. All rights reserved.
     2  // Use of this source code is governed by a BSD-style
     3  // license that can be found in the LICENSE file.
     4  
     5  package quad
     6  
     7  import (
     8  	"math"
     9  	"sync"
    10  )
    11  
    12  // FixedLocationer computes a set of quadrature locations and weights and stores
    13  // them in-place into x and weight respectively. The number of points generated is equal to
    14  // the len(x). The weights and locations should be chosen such that
    15  //  int_min^max f(x) dx ≈ \sum_i w_i f(x_i)
    16  type FixedLocationer interface {
    17  	FixedLocations(x, weight []float64, min, max float64)
    18  }
    19  
    20  // FixedLocationSingle returns the location and weight for element k in a
    21  // fixed quadrature rule with n total samples and integral bounds from min to max.
    22  type FixedLocationSingler interface {
    23  	FixedLocationSingle(n, k int, min, max float64) (x, weight float64)
    24  }
    25  
    26  // Fixed approximates the integral of the function f from min to max using a fixed
    27  // n-point quadrature rule. During evaluation, f will be evaluated n times using
    28  // the weights and locations specified by rule. That is, Fixed estimates
    29  //  int_min^max f(x) dx ≈ \sum_i w_i f(x_i)
    30  // If rule is nil, an acceptable default is chosen, otherwise it is
    31  // assumed that the properties of the integral match the assumptions of rule.
    32  // For example, Legendre assumes that the integration bounds are finite. If
    33  // rule is also a FixedLocationSingler, the quadrature points are computed
    34  // individually rather than as a unit.
    35  //
    36  // If concurrent <= 0, f is evaluated serially, while if concurrent > 0, f
    37  // may be evaluated with at most concurrent simultaneous evaluations.
    38  //
    39  // min must be less than or equal to max, and n must be positive, otherwise
    40  // Fixed will panic.
    41  func Fixed(f func(float64) float64, min, max float64, n int, rule FixedLocationer, concurrent int) float64 {
    42  	// TODO(btracey): When there are Hermite polynomial quadrature, add an additional
    43  	// example to the documentation comment that talks about weight functions.
    44  	if n <= 0 {
    45  		panic("quad: non-positive number of locations")
    46  	}
    47  	if min > max {
    48  		panic("quad: min > max")
    49  	}
    50  	if min == max {
    51  		return 0
    52  	}
    53  	intfunc := f
    54  	// If rule is non-nil it is assumed that the function and the constraints
    55  	// of rule are aligned. If it is nil, wrap the function and do something
    56  	// reasonable.
    57  	// TODO(btracey): Replace wrapping with other quadrature rules when
    58  	// we have rules that support infinite-bound integrals.
    59  	if rule == nil {
    60  		// int_a^b f(x)dx = int_u^-1(a)^u^-1(b) f(u(t))u'(t)dt
    61  		switch {
    62  		case math.IsInf(max, 1) && math.IsInf(min, -1):
    63  			// u(t) = (t/(1-t^2))
    64  			min = -1
    65  			max = 1
    66  			intfunc = func(x float64) float64 {
    67  				v := 1 - x*x
    68  				return f(x/v) * (1 + x*x) / (v * v)
    69  			}
    70  		case math.IsInf(max, 1):
    71  			// u(t) = a + t / (1-t)
    72  			a := min
    73  			min = 0
    74  			max = 1
    75  			intfunc = func(x float64) float64 {
    76  				v := 1 - x
    77  				return f(a+x/v) / (v * v)
    78  			}
    79  		case math.IsInf(min, -1):
    80  			// u(t) = a - (1-t)/t
    81  			a := max
    82  			min = 0
    83  			max = 1
    84  			intfunc = func(x float64) float64 {
    85  				return f(a-(1-x)/x) / (x * x)
    86  			}
    87  		}
    88  		rule = Legendre{}
    89  	}
    90  	singler, isSingler := rule.(FixedLocationSingler)
    91  
    92  	var xs, weights []float64
    93  	if !isSingler {
    94  		xs = make([]float64, n)
    95  		weights = make([]float64, n)
    96  		rule.FixedLocations(xs, weights, min, max)
    97  	}
    98  
    99  	if concurrent > n {
   100  		concurrent = n
   101  	}
   102  
   103  	if concurrent <= 0 {
   104  		var integral float64
   105  		// Evaluate in serial.
   106  		if isSingler {
   107  			for k := 0; k < n; k++ {
   108  				x, weight := singler.FixedLocationSingle(n, k, min, max)
   109  				integral += weight * intfunc(x)
   110  			}
   111  			return integral
   112  		}
   113  		for i, x := range xs {
   114  			integral += weights[i] * intfunc(x)
   115  		}
   116  		return integral
   117  	}
   118  
   119  	// Evaluate concurrently
   120  	tasks := make(chan int)
   121  
   122  	// Launch distributor
   123  	go func() {
   124  		for i := 0; i < n; i++ {
   125  			tasks <- i
   126  		}
   127  		close(tasks)
   128  	}()
   129  
   130  	var mux sync.Mutex
   131  	var integral float64
   132  	var wg sync.WaitGroup
   133  	wg.Add(concurrent)
   134  	for i := 0; i < concurrent; i++ {
   135  		// Launch workers
   136  		go func() {
   137  			defer wg.Done()
   138  			var subIntegral float64
   139  			for k := range tasks {
   140  				var x, weight float64
   141  				if isSingler {
   142  					x, weight = singler.FixedLocationSingle(n, k, min, max)
   143  				} else {
   144  					x = xs[k]
   145  					weight = weights[k]
   146  				}
   147  				f := intfunc(x)
   148  				subIntegral += f * weight
   149  			}
   150  			mux.Lock()
   151  			integral += subIntegral
   152  			mux.Unlock()
   153  		}()
   154  	}
   155  	wg.Wait()
   156  	return integral
   157  }