ガウス求積法の分点と重み(求積法選択)

\(\normalsize Gaussian\ quadrature\\ \hspace{30px} {\large\int_{\small a}^{\small b}}w(x)f(x)dx\simeq{\large\displaystyle \sum_{\small i=1}^{n}}w_{i}f(x_i)\\ \hspace{20px} Quadrature \hspace{30px} interval \hspace{10px} w(x) \hspace{30px} polynomials\\ (1)\ Legendre \hspace{50px} [-1,\ 1] \hspace{25px} 1 \hspace{90px} P_n(x)\\ (2)\ Chebyshev\ 1st \hspace{5px} (-1,\ 1) \hspace{10px} {\large\frac{1}{\sqrt{1-x^2}}} \hspace{70px} T_n(x) \\ (3)\ Chebyshev\ 2nd \hspace{5px} [-1,\ 1] \hspace{10px} \sqrt{1-x^2} \hspace{65px} U_n(x) \\ (4)\ Laguerre \hspace{50px} [0,\infty) \hspace{20px} x^{\alpha} e^{-x} \hspace{65px} L_n^\alpha (x) \\ (5)\ Hermite \hspace{50px} (-\infty,\infty) \hspace{10px} e^{-x^2} \hspace{70px} H_n (x) \\ (6)\ Jacobi \hspace{75px} (-1,\ 1) \hspace{10px} (1-x)^{\alpha}(1+x)^{\beta} \hspace{5px} J_n^{\alpha,\beta} (x) \\ (7)\ Lobatto \hspace{60px} [-1,\ 1] \hspace{25px} 1 \hspace{80px} P_{n-1}^{'} (x)\\ (8)\ Kronrod \hspace{50px} [-1,\ 1] \hspace{25px} 1 \hspace{90px} P_n(x)\\ \)