Abel equation of the first kind explained

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

_0(x)

where

f_{3(x) ≠}0

Properties

f_3(x)=0

and

f_0(x)=0

, or

f_2(x)=0

and

f_0(x)=0

, the equation reduces to a Bernoulli equation, while if

f_3(x)=0

the equation reduces to a Riccati equation.

The substitution

y=\dfrac{1}{u}

brings the Abel equation of the first kind to the Abel equation of the second kind, of the form

_3(x).

The substitution

\begin{align} \xi&=\int

\\[6pt] u&=\left(y+\dfrac{f_2(x)}{3f

,\\[6pt] E&=

\exp\left(\int\left(f

1(x)-

3f_3(x)

\right)~dx\right) \end{align}

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

u'=u^3+\phi(\xi).

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

Panayotounakos . D.E. . Panayotounakou . N.D. . Vakakis . A.F.A . On the Solution of the Unforced Damped Duffing Oscillator with No Linear Stiffness Term . Nonlinear Dynamics . 2002 . 28 . 1–16 . 10.1023/A:1014925032022 . 117115358.
Mancas. Stefan C.. Rosu. Haret C.. 1212.3636. Integrable dissipative nonlinear second order differential equations via factorizations and Abel equations. Physics Letters A . 377 . 2013. 1434–1438. 10.1016/j.physleta.2013.04.024.

Panayotounakos . Dimitrios E. . Zarmpoutis . Theodoros I. . Construction of Exact Parametric or Closed Form Solutions of Some Unsolvable Classes of Nonlinear ODEs (Abel's Nonlinear ODEs of the First Kind and Relative Degenerate Equations) . International Journal of Mathematics and Mathematical Sciences . Hindawi Publishing Corporation . 2011 . 2011 . 1–13 . 10.1155/2011/387429 . free .