Is it possible to solve the following differential equation:
$g: \Bbb{R} \to \Bbb{R}$, $$ g'(a)=a\cdot g(a-1),\ g(0)=\frac{1}{2}$$
I can't find any method for ordinary differential equations which works here.
Is it possible to solve the following differential equation:
$g: \Bbb{R} \to \Bbb{R}$, $$ g'(a)=a\cdot g(a-1),\ g(0)=\frac{1}{2}$$
I can't find any method for ordinary differential equations which works here.