Singular solution

of an ordinary differential equation

A solution at every point of which the uniqueness of the solution of the Cauchy problem for this equation is violated. For example, for an equation of the first order

$$ \tag{* } y ^ \prime = f( x, y) $$

with a continuous right-hand side which has a finite or infinite partial derivative everywhere with respect to $ y $, a singular solution can only lie in the set

$$ M = \{ {( x, y) } : {| f _ {y} ^ { \prime } ( x, y) | = \infty } \} . $$

A curve $ \gamma \subset M $ is a singular solution of (*) if $ \gamma $ is an integral curve of the equation (*) and if at least one more integral curve of (*) passes through every point of $ \gamma $. Let equation (*) have a general integral $ \phi ( x, y, c) = 0 $ in a domain $ G $; if this family of curves has an envelope, then this is a singular solution of equation (*). For a differential equation

$$ F( x, y, y ^ \prime ) = 0 , $$

a singular solution is found by examining the discriminant curve.

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Comments

Under "singular solution of a differential equation" is also understood a particular solution that is not obtainable by specifying the integration constant in a general solution. The two notions have much to do with one another but are not identical, cf. [a1].

References