Abel equation of the first kind

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In mathematics, an Abel equation of the first kind, named after Niels Henrik Abel, is any ordinary differential equation that is cubic in the unknown function. In other words, it is an equation of the form

${\displaystyle y^{\prime }=f_3(x)y^3+f_2(x)y^2+f_1(x)y+f_0(x)}$

where ${\displaystyle f_3(x)\ne 0}$.

If ${\displaystyle f_3(x)=0}$ and ${\displaystyle f_0(x)=0}$, or ${\displaystyle f_2(x)=0}$ and ${\displaystyle f_0(x)=0}$, the equation reduces to a Bernoulli equation, while if ${\displaystyle f_3(x)=0}$ the equation reduces to a Riccati equation.

The substitution ${\displaystyle y={\displaystyle \frac{1}{u}}}$ brings the Abel equation of the first kind to the Abel equation of the second kind, of the form

${\displaystyle u{u}^{\prime }=-f_0(x)u^3-f_1(x)u^2-f_2(x)u-f_3(x).}$

The substitution

${\displaystyle \begin{array}{cc}\xi & =\int f_3(x)E^{2}dx,\\ u& =(y+{\displaystyle \frac{f_2(x)}{3f_3(x)}})E^{-1},\\ E& =\exp (\int (f_1(x)-\frac{f_2^2(x)}{3f_3(x)})dx)\end{array}}$

brings the Abel equation of the first kind to the canonical form

${\displaystyle u^{\prime }=u^3+\varphi (\xi ).}$

Dimitrios E. Panayotounakos and Theodoros I. Zarmpoutis discovered an analytic method to solve the above equation in an implicit form.^[1]

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