Airy functions : Airy_Ai and Airy_Bi

Airy_Ai and Airy_Bi takes as argument a real x.
Airy_Ai and Airy_Bi are two independant solutions of the equation

y^{$\prime{^\prime}$} - x*y = 0

They are defined by :

$$= (1/\pi) \int_0^\infty \cos(t^3/3 + x*t) dt$$ Airy(x)

$$\mbox{Airy\_Bi}(x) = (1/\pi) \int_0^\infty (e^{- t^3/3} + \sin( t^3/3 + x*t)) dt$$

Properties :

$$\tt\mbox{Airy\_Ai}(x) \prime$$ =

$$\tt\mbox{Airy\_Bi}(x) = \sqrt{3}(\mbox{Airy\_Ai}(0)*f(x) -\mbox{Airy\_Ai}^\prime (0)*g(x) )$$

where f and g are two entire series solutions of

w^{$\prime{^\prime}$} - x*w = 0

more precisely :

$$\sum_{{k=0}}^{\infty} \left(\vphantom{\frac{\Gamma(k+\frac{1}{3})}{\Gamma(\frac{1}{3})}}\right. {\frac{{\Gamma(k+\frac{1}{3})}}{{\Gamma(\frac{1}{3})}}} \left.\vphantom{\frac{\Gamma(k+\frac{1}{3})}{\Gamma(\frac{1}{3})}}\right) {\frac{{x^{3k}}}{{(3k)!}}}$$ f (x) =

$$\sum_{{k=0}}^{\infty} \left(\vphantom{\frac{\Gamma(k+\frac{2}{3})}{\Gamma(\frac{2}{3})}}\right. {\frac{{\Gamma(k+\frac{2}{3})}}{{\Gamma(\frac{2}{3})}}} \left.\vphantom{\frac{\Gamma(k+\frac{2}{3})}{\Gamma(\frac{2}{3})}}\right) {\frac{{x^{3k+1}}}{{(3k+1)!}}}$$ g(x) =

Input :

Airy_Ai(1)

Output :

0.135292416313

Input :

Airy_Bi(1)

Output :

1.20742359495

Input :

Airy_Ai(0)

Output :

0.355028053888

Input :

Airy_Bi(0)

Output :

0.614926627446