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Hyperbolic Partial Differential Equations 📂Partial Differential Equations

Hyperbolic Partial Differential Equations

Definition1 2

Consider the following 2nd order linear partial differential equation for $u(t,x)$.

$$ Au_{tt} + Bu_{tx} + Cu_{xx} + Du_{t} + Eu_{x} + Fu + G = 0\qquad (ABC \ne 0) \tag{1} $$

Here, the coefficients $A, \dots, G$ are functions of $(t,x)$. $\Delta = B^{2} - 4AC$ is called the discriminant. A partial differential equation $(1)$ with a positive discriminant is called a hyperbolic PDE.

$$ (1) \text{ is called hyperbolic, if } \Delta (t,x) \gt 0. $$

Explanation

In fact, it is rarely called a hyperbolic partial differential equation, and is commonly referred to simply by its phonetic translation, hyperbolic PDE. The origin of the name, of course, comes from the hyperbola.

A conic section $Ax^{2} + Bxy + Cy^{2} + Dx + Ey + F = 0$ is a hyperbola if it satisfies $B^{2} - 4AC \gt 0$.

In a narrow sense, it refers to the wave equation.

$$ u_{tt} - \Delta u = 0 \qquad (\Delta = 0^{2} - 4(1)(-1) = 4) $$


  1. Peter J. Olver, Introduction to Partial Differential Equations (2014), p171-173 ↩︎

  2. Lawrence C. Evans, Partial Differential Equations (2nd Edition, 2010), p399 ↩︎