Question:

di di Such an equation is said to be an ordinary

Last updated: 9/18/2023

di di Such an equation is said to be an ordinary

di di Such an equation is said to be an ordinary differential equation Thus an ordinary differential equation is a differential equation in which the constituent function X X t is a function of a single real variable We often use the acronym ODE in place of the full term ordinary differential equation II On the other hand there are differential equations in a function u xu x of a real multivariable x x x x which ranges in an open subset of R Such a function u u x gives rise to mixed partial derivatives du x 1 i n Du x x jl i j n Grer er D u for various multi indices 0 0 o with o EZ i 0 1 2 the mixed partial derivative D u having the order 0 9 a Now a differential equation in such a function u ux of a multi variable x x x ranging in an open subset of R is an equation of the type du Fx u 11 d u D u ox m 0 2 its order being m Equation 2 is said to be a partial differential equation in u x because it involves the mixed partial derivatives of u We use the acronym PDE for this type of differential equations There is more about the setting of a differential equation In a mathematical problem a differential equation is accompanied by auxiliary data A solution of a differential equation is required to satisfy this auxiliary data To be more specific we are given a subset of the domain of a prospective solution and some of its derivatives of the solution at the points of this subset