Classifying second-order Partial differential equations

hellomrrobot · Feb 1, 2016

What does it mean when it says to classify the second-order partial differential? (See attached)
How would I get started?

Number Nine · Feb 1, 2016

Linear second order PDE's can, by a change of coordinates, be written in one of three (technically four, but one is degenerate) standard forms, called elliptic, parabolic, and hyperbolic equations. Any introductory PDE textbook should contain a description of these three types of equations. See e.g. http://www.math.psu.edu/tseng/class/Math251/Notes-PDE%20pt1.pdf

HallsofIvy · Feb 3, 2016

Partial differential equations with constant coefficients can be so classified. If there are variable coefficients, the equation may change from "parabolic" to "hyperbolic" to "elliptic" depending on the value of the independent variables.

Number Nine · Feb 3, 2016

HallsofIvy said:

Partial differential equations with constant coefficients can be so classified. If there are variable coefficients, the equation may change from "parabolic" to "hyperbolic" to "elliptic" depending on he value of the independent variables.

Good catch. Thanks.

Classifying second-order Partial differential equations

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