LITTLE Q-LAGUERRE POLYNOMIALS ABS COMPLEX 3D MAPLE PLOT
LITTLE Q-LAGUERRE POLYNOMIALS IM COMPLEX 3D MAPLE PLOT
LITTLE Q-LAGUERRE POLYNOMIALS RE COMPLEX 3D MAPLE PLOT
LITTLE Q-LAGUERRE POLYNOMIALS ABS DENSITY MAPLE PLOT
LITTLE Q-LAGUERRE POLYNOMIALS IM DENSITY MAPLE PLOT
LITTLE Q-LAGUERRE POLYNOMIALS RE DENSITY MAPLE PLOT
参考文献编辑
Chihara, Theodore Seio, An introduction to orthogonal polynomials, Mathematics and its Applications 13, New York: Gordon and Breach Science Publishers, 1978 [2015-02-06], ISBN 978-0-677-04150-6, MR 0481884, Reprinted by Dover 2011, ISBN 978-0-486-47929-3, (原始内容于2018-08-10)
Gasper, George; Rahman, Mizan, Basic hypergeometric series, Encyclopedia of Mathematics and its Applications 96 2nd, Cambridge University Press, 2004, ISBN 978-0-521-83357-8, MR 2128719, doi:10.2277/0521833574
Koekoek, Roelof; Lesky, Peter A.; Swarttouw, René F., Hypergeometric orthogonal polynomials and their q-analogues, Springer Monographs in Mathematics, Berlin, New York: Springer-Verlag, 2010, ISBN 978-3-642-05013-8, MR 2656096, doi:10.1007/978-3-642-05014-5
Koornwinder, Tom H.; Wong, Roderick S. C.; Koekoek, Roelof; Swarttouw, René F., http://dlmf.nist.gov/18|contribution-url=缺少标题 (帮助), Olver, Frank W. J.; Lozier, Daniel M.; Boisvert, Ronald F.; Clark, Charles W. (编), NIST Handbook of Mathematical Functions, Cambridge University Press, 2010, ISBN 978-0521192255, MR2723248
Van Assche, Walter; Koornwinder, Tom H., Asymptotic behaviour for Wall polynomials and the addition formula for little q-Legendre polynomials, SIAM Journal on Mathematical Analysis, 1991, 22 (1): 302–311, ISSN 0036-1410, MR 1080161, doi:10.1137/0522019 引文格式1维护:MR格式 (link)
Wall, H. S., A continued fraction related to some partition formulas of Euler, The American Mathematical Monthly, 1941, 48: 102–108, ISSN 0002-9890, JSTOR 2303599, MR 0003641
一月 01, 1970
小q拉盖尔多项式, 是一个以基本超几何函数定义的正交多项式4th, order, little, laguerre, polynomials, displaystyle, displaystyle, frac, 极限关系, 编辑大q拉盖尔多项式, 在大q拉盖尔多项式中, 令x, displaystyle, nbsp, 并令b, displaystyle, infty, nbsp, 即得lim, displaystyle, infty, nbsp, 仿射q克拉夫楚克多项式, displaystyle, nbsp, d. 小q拉盖尔多项式是一个以基本超几何函数定义的正交多项式4th order Little q Laguerre polynomials p n x a q 2 ϕ 1 q n 0 a q q q x 1 a 1 q n q n 2 ϕ 0 q n x 1 q x a displaystyle displaystyle p n x a q 2 phi 1 q n 0 aq q qx frac 1 a 1 q n q n 2 phi 0 q n x 1 q x a 极限关系 编辑大q拉盖尔多项式 小q拉盖尔多项式 在大q拉盖尔多项式中 令x b q x displaystyle x to bqx nbsp 并令b displaystyle b to infty nbsp 即得小q拉盖尔多项式lim b P n b q x a b q p n x a q displaystyle lim b to infty P n bqx a b q p n x a q nbsp 仿射Q克拉夫楚克多项式 小q拉盖尔多项式 lim a 1 K n a f f q x N p N q p n q x p q displaystyle lim a to 1 K n aff q x N p N q p n q x p q nbsp 令小q拉盖尔多项式 a q a displaystyle a q a nbsp x 1 q x displaystyle x 1 q x nbsp 然后令q 1 即得拉盖尔多项式lim q 1 P a 1 q x q a q L n a x L n a 0 displaystyle lim q to 1 P a 1 q x q a q frac L n a x L n a 0 nbsp 验证 9阶小q拉盖尔多项式 拉盖尔多项式 作上述代换 P a 1 q x q a q 1 q x 1 q a q x q 8 1 q a q displaystyle P a 1 q x q a q 1 frac qx 1 q alpha q frac x q 8 left 1 q alpha q right nbsp 1 q 9 1 q 8 q 2 1 q x 2 1 q 2 1 1 q a q 1 1 q a q 2 1 displaystyle left 1 q 9 right left 1 q 8 right q 2 left 1 q right x 2 left 1 q 2 right 1 left 1 q alpha q right 1 left 1 q alpha q 2 right 1 nbsp 1 q 9 1 q 8 1 q 7 q 3 1 q 2 x 3 1 q 2 1 displaystyle left 1 q 9 right left 1 q 8 right left 1 q 7 right q 3 left 1 q right 2 x 3 left 1 q 2 right 1 nbsp 1 q 3 1 1 q a q 1 1 q a q 2 1 1 q a q 3 1 displaystyle left 1 q 3 right 1 left 1 q alpha q right 1 left 1 q alpha q 2 right 1 left 1 q alpha q 3 right 1 cdots nbsp 求q 1极限得 nbsp 令a 3 得 1 9 4 x 9 5 x 2 7 10 x 3 3 20 x 4 3 160 x 5 1 720 x 6 1 16800 x 7 1 739200 x 8 1 79833600 x 9 displaystyle 1 frac 9 4 x frac 9 5 x 2 frac 7 10 x 3 frac 3 20 x 4 frac 3 160 x 5 frac 1 720 x 6 frac 1 16800 x 7 frac 1 739200 x 8 frac 1 79833600 x 9 nbsp 另一方面L n 3 x L n 3 0 displaystyle frac L n 3 x L n 3 0 nbsp 1 9 4 x 9 5 x 2 7 10 x 3 3 20 x 4 3 160 x 5 1 720 x 6 1 16800 x 7 1 739200 x 8 1 79833600 x 9 displaystyle 1 frac 9 4 x frac 9 5 x 2 frac 7 10 x 3 frac 3 20 x 4 frac 3 160 x 5 frac 1 720 x 6 frac 1 16800 x 7 frac 1 739200 x 8 frac 1 79833600 x 9 nbsp 二者显然相等 QED图集 编辑 nbsp LITTLE Q LAGUERRE POLYNOMIALS ABS COMPLEX 3D MAPLE PLOT nbsp LITTLE Q LAGUERRE POLYNOMIALS IM COMPLEX 3D MAPLE PLOT nbsp LITTLE Q LAGUERRE POLYNOMIALS RE COMPLEX 3D MAPLE PLOT nbsp LITTLE Q LAGUERRE POLYNOMIALS ABS DENSITY MAPLE PLOT nbsp LITTLE Q LAGUERRE POLYNOMIALS IM DENSITY MAPLE PLOT nbsp LITTLE Q LAGUERRE POLYNOMIALS RE DENSITY MAPLE PLOT参考文献 编辑Chihara Theodore Seio An introduction to orthogonal polynomials Mathematics and its Applications 13 New York Gordon and Breach Science Publishers 1978 2015 02 06 ISBN 978 0 677 04150 6 MR 0481884 Reprinted by Dover 2011 ISBN 978 0 486 47929 3 原始内容存档于2018 08 10 Gasper George Rahman Mizan Basic hypergeometric series Encyclopedia of Mathematics and its Applications 96 2nd Cambridge University Press 2004 ISBN 978 0 521 83357 8 MR 2128719 doi 10 2277 0521833574 Koekoek Roelof Lesky Peter A Swarttouw Rene F Hypergeometric orthogonal polynomials and their q analogues Springer Monographs in Mathematics Berlin New York Springer Verlag 2010 ISBN 978 3 642 05013 8 MR 2656096 doi 10 1007 978 3 642 05014 5 Koornwinder Tom H Wong Roderick S C Koekoek Roelof Swarttouw Rene F http dlmf nist gov 18 contribution url 缺少标题 帮助 Olver Frank W J Lozier Daniel M Boisvert Ronald F Clark Charles W 编 NIST Handbook of Mathematical Functions Cambridge University Press 2010 ISBN 978 0521192255 MR2723248 Van Assche Walter Koornwinder Tom H Asymptotic behaviour for Wall polynomials and the addition formula for little q Legendre polynomials SIAM Journal on Mathematical Analysis 1991 22 1 302 311 ISSN 0036 1410 MR 1080161 doi 10 1137 0522019 引文格式1维护 MR格式 link Wall H S A continued fraction related to some partition formulas of Euler The American Mathematical Monthly 1941 48 102 108 ISSN 0002 9890 JSTOR 2303599 MR 0003641 取自 https zh wikipedia org w index php title 小q拉盖尔多项式 amp oldid 67618708, 维基百科,wiki,书籍,书籍,图书馆,
