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Chapter 8: Q10E (page 437)

The 鈥淏鈥 in B-spline refers to the fact that a segment \({\bf{x}}\left( t \right)\)may be written in terms of a basis matrix, \(\,{M_S}\) , in a form similar to a B茅zier curve. That is,

\({\bf{x}}\left( t \right) = G{M_S}{\bf{u}}\left( t \right)\)for \(\,0 \le t \le 1\)

where \(G\) is the geometry matrix \(\,\left( {{{\bf{p}}_{\bf{0}}}\,\,\,\,{{\bf{p}}_{{\bf{1}}\,\,\,}}\,{{\bf{p}}_{\bf{2}}}\,\,\,{{\bf{p}}_{\bf{3}}}} \right)\)and \({\bf{u}}\left( {\bf{t}} \right)\) is the column vector \(\left( {1,\,\,t,\,\,{t^2},\,{t^3}} \right)\) . In a uniform B-spline, each segment uses the same basis matrix \(\,{M_S}\), but the geometry matrix changes. Construct the basis matrix \(\,{M_S}\) for \({\bf{x}}\left( t \right)\).

Short Answer

Expert verified

The basis matrix is \({M_S} = \left( {\begin{array}{{}}1&{ - 3}&3&{ - 1}\\4&0&{ - 6}&3\\1&3&3&{ - 3}\\0&0&0&1\end{array}} \right)\).

Step by step solution

01

Write matrix \({\bf{x}}\left( t \right) = G{M_S}{\bf{u}}\left( t \right)\)for control points\(\,\left( {{{\bf{p}}_{\bf{0}}}\,\,\,\,{{\bf{p}}_{{\bf{1}}\,\,\,}}\,{{\bf{p}}_{\bf{2}}}\,\,\,{{\bf{p}}_{\bf{3}}}} \right)\)

The matrix \({\rm{x}}\left( t \right) = G{M_S}{\rm{u}}\left( t \right)\)is given as \({\bf{x}}\left( t \right) = \frac{1}{6}\left( {\left( {1 - 3t + 3{t^2} - {t^3}} \right){{\bf{p}}_o} + \left( {4 - 6{t^2} + 3{t^3}} \right){{\bf{p}}_1} + \left( {1 + 3t + 3{t^2} - 3{t^3}} \right){{\bf{p}}_2} + {t^3}{{\bf{p}}_3}} \right)\) for \(0 \le t \le 1\) .

02

Step 2:Write vector of weights of \({\bf{x}}\left( t \right)\)

The weighted vector of \({\rm{x}}\left( t \right)\)is\(\frac{1}{6}\left( {\begin{array}{{}}{1 - 3t + 3{t^2} - {t^3}}\\{4 - 6{t^2} + 3{t^3}}\\{1 + 3t + 3{t^2} - 3{t^3}}\\{\,\,\,\,\,\,{t^3}}\end{array}} \right)\).

03

The weighted matrix

Factor the weighted vector as\({M_S}{\bf{u}}\left( t \right)\), where\({\bf{u}}\left( t \right)\)is the column vector involving ascending powers of t as shown below:

\({M_S}{\bf{u}}\left( t \right) = \left( {\begin{array}{{}}1&{ - 3}&3&{ - 1}\\4&0&{ - 6}&3\\1&3&3&{ - 3}\\0&0&0&1\end{array}} \right)\left( \begin{array}{l}1\\t\\{t^2}\\{t^3}\end{array} \right)\)

04

Compare and write \({M_S}\)

The basis matrix is \({M_S} = \left( {\begin{array}{{}}1&{ - 3}&3&{ - 1}\\4&0&{ - 6}&3\\1&3&3&{ - 3}\\0&0&0&1\end{array}} \right)\).

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Most popular questions from this chapter

Question: In Exercise 5, determine whether or not each set is compact and whether or not it is convex.

5. Use the sets from Exercise 3.

In Exercises 7 and 8, find the barycentric coordinates of p with respect to the affinely independent set of points that precedes it.

7. \(\left( {\begin{array}{{}}1\\{ - 1}\\2\\1\end{array}} \right),\left( {\begin{array}{{}}2\\1\\0\\1\end{array}} \right),\left( {\begin{array}{{}}1\\2\\{ - 2}\\0\end{array}} \right)\), \({\mathop{\rm p}\nolimits} = \left( {\begin{array}{{}}5\\4\\{ - 2}\\2\end{array}} \right)\)

Question: Suppose that the solutions of an equation \(A{\bf{x}} = {\bf{b}}\) are all of the form \({\bf{x}} = {x_{\bf{3}}}{\bf{u}} + {\bf{p}}\), where \({\bf{u}} = \left( {\begin{array}{*{20}{c}}{\bf{5}}\\{\bf{1}}\\{ - {\bf{2}}}\end{array}} \right)\) and \({\bf{p}} = \left( {\begin{array}{*{20}{c}}{\bf{1}}\\{ - {\bf{3}}}\\{\bf{4}}\end{array}} \right)\). Find points \({{\bf{v}}_{\bf{1}}}\) and \({{\bf{v}}_{\bf{2}}}\) such that the solution set of \(A{\bf{x}} = {\bf{b}}\) is \({\bf{aff}}\left\{ {{{\bf{v}}_{\bf{1}}},\,{{\bf{v}}_{\bf{2}}}} \right\}\).

Question: 25. Let \(p = \left( \begin{array}{l}1\\1\end{array} \right)\). Find a hyperplane \(\left( {f:d} \right)\) that strictly separates \(B\left( {0,3} \right)\) and \(B\left( {p,1} \right)\). (Hint: After finding \(f\), show that the point \(v = \left( {1 - .75} \right)0 + .75p\) is neither in \(B\left( {0,3} \right)\) nor in \(B\left( {p,1} \right)\)).

Question: 18. Choose a set \(S\) of four points in \({\mathbb{R}^3}\) such that aff \(S\) is the plane \(2{x_1} + {x_2} - 3{x_3} = 12\). Justify your work.
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