- 零次 B 样条
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\bm{F}_{i,0}(t) = \begin{cases} 1 & t_i \leq t <t_{i+1} \\ 0 & others \end{cases}
Fi,0(t)={10ti≤t<ti+1others
2. 一次 B 样条,
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\bm{F}_{i, 1}(t) = \frac{t - t_i}{t_{i+1} - t_i} \bm{F}_{i, 0}(t) + \frac{t_{i+2} - t}{t_{i+2} - t_{i+1}} \bm{F}_{i+1, 0}(t)
Fi,1(t)=ti+1−tit−tiFi,0(t)+ti+2−ti+1ti+2−tFi+1,0(t)
通过
F i , 0 ( t ) = { 1 t i ≤ t < t i + 1 0 o t h e r s F i + 1 , 0 ( t ) = { 1 t i + 1 ≤ t < t i + 2 0 o t h e r s \bm{F}_{i,0}(t) = \begin{cases} 1 & t_i \leq t< t_{i+1} \\ 0 & others \end{cases} \qquad \bm{F}_{i+1, 0}(t) = \begin{cases} 1 & t_{i+1} \leq t <t_{i+2} \\ 0 & others \end{cases} Fi,0(t)={10ti≤t<ti+1othersFi+1,0(t)={10ti+1≤t<ti+2others
可以得到
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\bm{F}_{i, 1}(t) = \begin{cases} \frac{t - t_i}{t_{i+1} - t_i} & t-i \leq t < t_{i=1}\\ \\ \frac{t_{i+2} - t}{t_{i+2} - t_{i+1}} & t_{i+1} \leq t <t_{i+2} \\ \\ 0 & others \end{cases}
Fi,1(t)=⎩
⎨
⎧ti+1−tit−titi+2−ti+1ti+2−t0t−i≤t<ti=1ti+1≤t<ti+2others
3. 二次 B 样条
F i , 2 ( t ) = t − t i t i + 2 − t i F i , 1 ( t ) + t i + 3 − t t i + 3 − t i + 1 F i + 1 , 1 ( t ) \bm{F}_{i, 2}(t) = \frac{t - t_i}{t_{i+2} - t_i} \bm{F}_{i, 1}(t) + \frac{t_{i+3} - t}{t_{i+3} - t_{i+1}} \bm{F}_{i+1, 1}(t) Fi,2(t)=ti+2−tit−tiFi,1(t)+ti+3−ti+1ti+3−tFi+1,1(t)
由 F i , 1 ( t ) = { t − t i t i + 1 − t i t i ≤ t < t i + 1 t i + 2 − t t i + 2 − t i + 1 t i + 1 ≤ t < t i + 2 0 o t h e r s F i + 1 , 1 ( t ) = { t − t i + 1 t i + 2 − t i + 1 t i + 1 ≤ t < t i + 2 t i + 3 − t t i + 3 − t i + 2 t i + 2 ≤ t < t i + 3 0 o t h e r s \bm{F}_{i, 1}(t) = \begin{cases} \frac{t - t_i}{t_{i+1} - t_i} & t_i \leq t < t_{i+1}\\ \\ \frac{t_{i+2} - t}{t_{i+2} - t_{i+1}} & t_{i+1} \leq t <t_{i+2} \\ \\ 0 & others \end{cases} \qquad \bm{F}_{i+1, 1}(t) = \begin{cases} \frac{t - t_{i+1}}{t_{i+2} - t_{i+1}} & t_{i+1} \leq t < t_{i+2}\\ \\ \frac{t_{i+3} - t}{t_{i+3} - t_{i+2}} & t_{i+2} \leq t <t_{i+3} \\ \\ 0 & others \end{cases} Fi,1(t)=⎩ ⎨ ⎧ti+1−tit−titi+2−ti+1ti+2−t0ti≤t<ti+1ti+1≤t<ti+2othersFi+1,1(t)=⎩ ⎨ ⎧ti+2−ti+1t−ti+1ti+3−ti+2ti+3−t0ti+1≤t<ti+2ti+2≤t<ti+3others
得到
F i , 1 ( t ) = { t − t i t i + 2 − t i t − t i t i + 1 − t i t i ≤ t < t i + 1 t − t i t i + 2 − t i t i + 2 − t t i + 2 − t i + 1 + t i + 3 − t i + 1 t i + 3 − t i + 1 t − t i + 1 t i + 2 − t i + 1 t i + 1 ≤ t < t i + 2 ( t i = 3 − t ) 2 ( t i = 3 − t i + 1 ) ( t i + 3 − t i + 2 ) t i + 2 ≤ t < t i + 3 0 o t h e r s \bm{F}_{i, 1}(t) = \begin{cases} \frac{t - t_i}{t_{i+2} - t_i} \frac{t-t_i}{t_{i+1}-t_i} & t_i \leq t < t_{i+1} \\ \\ \frac{t - t_i}{t_{i+2} - t_i} \frac{t_{i+2}-t}{t_{i+2}-t_{i+1}} + \frac{t_{i+3} - t_{i+1}}{t_{i+3} - t_{i+1}} \frac{t-t_{i+1}}{t_{i+2}-t_{i+1}} & t_{i+1} \leq t < t_{i+2} & \\ \\ \frac{(t_{i=3} - t)^2}{(t_{i=3} - t_{i+1})(t_{i+3} - t_{i+2})}& t_{i+2} \leq t < t_{i+3} & \\ \\ 0 & others \end{cases} Fi,1(t)=⎩ ⎨ ⎧ti+2−tit−titi+1−tit−titi+2−tit−titi+2−ti+1ti+2−t+ti+3−ti+1ti+3−ti+1ti+2−ti+1t−ti+1(ti=3−ti+1)(ti+3−ti+2)(ti=3−t)20ti≤t<ti+1ti+1≤t<ti+2ti+2≤t<ti+3others
根据参数
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t 的值和次数
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k 与节点矢量双精度数组
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Knot 计算第
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k 次的 B 样条基函数的
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分析
F i , k ( t ) = t − t i t i + k − t i F i , k − 1 ( t ) + t i + k + 1 − t t i + k + 1 − t i + 1 F i + 1 , k − 1 ( t ) F_{i, k}(t) = \frac{t -t_i}{t_{i+k} - t_i} F_{i, k-1}(t) + \frac{t_{i+k+1} - t }{t_{i+k+1} - t_{i+1}} F_{i+1, k-1}(t) Fi,k(t)=ti+k−tit−tiFi,k−1(t)+ti+k+1−ti+1ti+k+1−tFi+1,k−1(t)
n u m b e r a t o r 1 = t − t i n u m b e r a t o r 2 = t i + k + 1 − t d e n o m i n a t o r 1 = t i + k − t i d e n o m i n a t o r 2 = t i + k + 1 − t i + 1 c o f f i c i e n t 1 = n u m b e r a t o r 1 d e n o m i n a t o r 1 c o f f i c i e n t 1 = n u m b e r a t o r 2 d e n o m i n a t o r 2 v a l u e 1 = c o f f i c i e n t 1 × F i , k − 1 ( t ) v a l u e 2 = c o f f i c i e n t 2 × F i + 1 , k − 1 ( t ) numberator_1 = t - t_i \\ numberator_2 = t_{i+k+1} - t \\ denominator_1 = t_{i+k} - t_i \\ denominator_2 = t_{i+k+1} - t_{i+1} \\ cofficient_1 = \frac{numberator_1 }{denominator_1 }\\ cofficient_1 = \frac{numberator_2 }{denominator_2 }\\ value_1 = cofficient_1 \times F_{i, k-1}(t)\\ value_2 = cofficient_2 \times F_{i+1, k-1}(t) numberator1=t−tinumberator2=ti+k+1−tdenominator1=ti+k−tidenominator2=ti+k+1−ti+1cofficient1=denominator1numberator1cofficient1=denominator2numberator2value1=cofficient1×Fi,k−1(t)value2=cofficient2×Fi+1,k−1(t)
double BasisFunctionValue(double t, int i, int k)
{
double val1, val2, val;
if (k == 0)
{
if ((t >= knot[i]) && t < knot[i + 1])
{
return 1.0;
}
else
{ // 其它
return 0.0;
}
}
if (k > 0) {
if (t < knot[i] || t > knot[i + k + 1]) {
return 0.0; // 其它
}
else
{
double coffcient1, coffcient2; // 凸组合系数1 凸组合系数 2
double denominator = 0.0; // 分母
denominator = knot[i + k] - knot[i];
if (denominator == 0.0)
{
// 约定 0/0 = 0
coffcient1 = 0.0;
}
else
{
coffcient1 = (t - knot[i]) / denominator; // 计算的第一项
}
denominator = knot[i + k + 1] - knot[i + 1]; // 递推公式第二项分母
if (denominator == 0.0)
{
// 约定 0/0 = 0
coffcient2 = 0.0;
}
else
{
coffcient2 = (knot[i + k + 1] - t) / denominator; // 递推公式第二项
}
val1 = coffcient1 * BasisFunctionValue(t, i, k - 1); // 递推公式第一项的只
val2 = coffcient2 * BasisFunctionValue(t, i+1, k - 1); // 递推公式第二项的只
val = val1 + val2; // 基函数的值
}
}
return val;
}
