Mamedov, B.A. (2007). "Evaluation of the generalized Goodwin–Staton integral using binomial expansion theorem". Journal of Quantitative Spectroscopy and Radiative Transfer. 105: 8–11. doi:10.1016/j.jqsrt.2006.09.018.
F. W. J. Olver, Werner Rheinbolt, Academic Press, 2014, Mathematics,Asymptotics and Special Functions, 588 pages, ISBN9781483267449 gbook
January 01, 1970
goodwin, staton, integral, mathematics, defined, displaystyle, infty, frac, satisfies, following, third, order, nonlinear, differential, equation, displaystyle, frac, frac, frac, left, right, properties, editsymmetry, displaystyle, nbsp, expansion, small, csgn. In mathematics the Goodwin Staton integral is defined as 1 G z 0 e t 2 t z d t displaystyle G z int 0 infty frac e t 2 t z dt It satisfies the following third order nonlinear differential equation 4 w z 8 z d d z w z 2 2 z 2 d 2 d z 2 w z z d 3 d z 3 w z 0 displaystyle 4w z 8 z frac d dz w z 2 2 z 2 frac d 2 dz 2 w z z frac d 3 dz 3 w left z right 0 Properties editSymmetry G z G z displaystyle G z G z nbsp Expansion for small z G z 1 g ln z 2 i csgn i z 2 p 2 i p z 2 g ln z 2 i csgn i z 2 p z 2 4 i 3 p z 3 5 4 1 2 g 1 2 ln z 2 1 2 i csgn i z 2 p z 4 O z 5 displaystyle begin aligned G z amp 1 gamma ln z 2 i operatorname csgn iz 2 pi frac 2i sqrt pi z 5pt amp qquad 2 gamma ln z 2 i operatorname csgn iz 2 pi Big z 2 frac 4i 3 sqrt pi z 3 5pt amp qquad left frac 5 4 frac 1 2 gamma frac 1 2 ln z 2 frac 1 2 i operatorname csgn iz 2 pi right z 4 O z 5 end aligned nbsp References edit Frank William John Olver ed N M Temme Chapter contr NIST Handbook of Mathematical Functions Chapter 7 p160 Cambridge University Press 2010 http journals cambridge org article S0013091504001087 Mamedov B A 2007 Evaluation of the generalized Goodwin Staton integral using binomial expansion theorem Journal of Quantitative Spectroscopy and Radiative Transfer 105 8 11 doi 10 1016 j jqsrt 2006 09 018 http dlmf nist gov 7 2 https web archive org web 20150225035306 http discovery dundee ac uk portal en research the generalized goodwinstaton integral 3db9f429 7d7f 488c a1d7 c8efffd01158 html https web archive org web 20150225105452 http discovery dundee ac uk portal en research the generalized goodwinstaton integral 3db9f429 7d7f 488c a1d7 c8efffd01158 export html http www damtp cam ac uk user na NA papers NA2009 02 pdf F W J Olver Werner Rheinbolt Academic Press 2014 Mathematics Asymptotics and Special Functions 588 pages ISBN 9781483267449 gbook Retrieved from https en wikipedia org w index php title Goodwin Staton integral amp oldid 1144731366, wikipedia, wiki, book, books, library,
