Homogeneous differential equation

A homogeneous differential equation has several distinct meanings.

One meaning is that a first-order ordinary differential equation is homogeneous if it has the form : $frac{dy}{dx} = F(y/x).$ To solve such equations, one makes the change of variables "u" = "y"/"x", which will transform such an equation into separable one.

Another meaning is a linear homogeneous differential equation, which is a differential equation of the form

: $Ly = 0 ,$

where the differential operator "L" is a linear operator, and "y" is the unknown function.

Example of deriving a homogenous equation

A well known homogenous equation in x and y of degree m, subsequently showing one of Euler's identities is as follows.

: $f(x,y) = x^m Fleft(frac{y}{x}
ight).$ Deriving $f_x (x,y)$ We obtain the following,

$frac{partial f(x,y)}{partial x} = mx^{m-1}Fleft(frac{y}{x}
ight)+ x^mF^'left(frac{y}{x}
ight)cdotleft(-frac{y}{x^2}
ight)$ .

Where $F^'$ denotes the first derivative of F with respect to the homogenous argument.

Also,

$frac{partial f(x,y)}{partial y} = x^mF^'left(frac{y}{x}
ight).left(frac{1}{x}
ight).$

Now taking each derivative and multiplying by its corresponding variable we arrive at the following equation.

$xfrac{partial f(x,y)}{partial x} + yfrac{partial f(x,y)}{partial y} = xleft [mx^{m-1}Fleft(frac{y}{x}
ight)+ x^m.left(-frac{y}{x^2}
ight)F^'left(frac{y}{x}
ight)
ight] + yleft [ x^m.left(frac{1}{x}
ight)F^'left(frac{y}{x}
ight)
ight]$

$xfrac{partial f(x,y)}{partial x} + yfrac{partial f(x,y)}{partial y} = xleft [mx^{m-1}Fleft(frac{y}{x}
ight)-x^{m-2}yF^'left(frac{y}{x}
ight)
ight] + yleft [ x^{m-1}F^'left(frac{y}{x}
ight)
ight]$

: $= mx^mFleft(frac{y}{x}
ight)$

: $= mf(x,y).$

Which in turn is one of Euler's identities,

$xfrac{partial f(x,y)}{partial x} + yfrac{partial f(x,y)}{partial y} = mf(x,y)$

This identity is generalized by Euler's theorem on homogeneous functions.

External links

* [http://mathworld.wolfram.com/HomogeneousOrdinaryDifferentialEquation.html Homogeneous differential equations at MathWorld]
* [http://math.stcc.edu/DiffEq/DiffEQ41.html Homogeneous Differential equations]
* [http://en.wikibooks.org/wiki/Differential_Equations/Substitution_1 Wikibooks: Differential Equations/First-Order/Substitution Methods]

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