Differential equation, partial, with singular coefficients

A partial differential equation the coefficients and/or the free term of which have discontinuities of the first kind or become infinite on certain manifolds in the closure of their domain of definition.

Typical equations of this kind are the Lavrent'ev–Bitsadze equation

$$ \mathop{\rm sign} y \cdot u _ {xx} + u _ {yy} = 0 $$

and the Euler–Poisson–Darboux equation

$$ u _ {xy} + \frac{\beta ^ \prime }{y - x } u _ {x} - \frac \beta {y - x } u _ {y} = 0 ,\ \beta , \beta ^ \prime = \textrm{ const } , $$

or

$$ \Delta u - u _ {x _ {0} x _ {0} } = \frac \lambda {x _ {0} } u _ {x _ {0} } , $$

$$ \Delta u - u _ {x _ {0} x _ {0} } = \frac \lambda {x _ {0} } u _ {x _ {0} } ,\ \lambda = \textrm{ const } , $$

where $ \Delta $ is the Laplace operator with respect to the variables $ x _ {1} \dots x _ {n} $.

Many degenerate partial differential equations are equations with singular coefficients.

Of prime importance in the theory of differential equations with singular coefficients is the study of the solvability of initial value, boundary value and mixed problems in their classical and generalized formulations, as well as the search for new well-posed problems. A fairly complete study was made of boundary value problems for linear elliptic, hyperbolic and parabolic equations of the second order with weak singularities in the coefficients that are usually summable of a larger degree than the dimension of their domain of definition. If the coefficients of these equations have discontinuities of the first kind only on certain sufficiently smooth surfaces located within the domain of definition, a fairly complete theory of the principal boundary value problems is available. See Differential equation, partial, discontinuous coefficients, and also [3], [5], [6].

References

Comments

For non-linear equations singularities of coefficients may occur for particular values of the unknown function. In such a case the set of singular points can be described as a free boundary (see Differential equation, partial, free boundaries). A typical example is

$$ \tag{a1 } \frac \partial {\partial t } C ( u) + \lambda H ( u) = \Delta K ( u) , $$

where $ C ( u) = \int _ {0} ^ {u} c ( v) d v $, $ K ( u) = \int _ {0} ^ {u} k ( v) d v $( $ c $ and $ k $ representing heat capacity and thermal conductivity, respectively), $ \lambda $ is the latent heat, and $ H $ is the Heaviside function. Equation (a1) describes heat conduction with change of phase ( $ u = 0 $ is the melting point). See Stefan problem. Of course, all the derivatives in (a1) are understood in the generalized sense.

The free boundary for (a1) coincides with the set $ \{ u = 0 \} $. If it consists of a smooth surface $ \phi ( x , t ) = 0 $( $ x \in \mathbf R ^ {n} $), then it can be shown that (a1) is equivalent to solving

$$ c ^ \prime ( u) \frac{\partial u }{\partial t } = \ \mathop{\rm div} ( k ( u) \mathop{\rm grad} u ) $$

in the set $ \{ u \neq 0 \} $, with the conditions

$$ u = 0 ,\ [ k ( u) \mathop{\rm grad} u \cdot \mathop{\rm grad} \phi ] _ {-} ^ {+} - \lambda \frac{\partial \phi }{\partial t } = 0 $$

on the free boundary, $ [ \cdot ] _ {-} ^ {+} $ denoting the difference between the limits from the positivity and the negativity set of $ u $.