Noun
partial differential (plural partial differentials)
(mathematics) an infinitesimal change in a variable in a partial derivative, or the result of partial differentiation
After completing a PhD in particle physics at the University of Colorado at Boulder, his postdoctoral research in applied mathematics centered on the development of fast algorithms for the solution of partial differential equations in multiple dimensions. Source: Internet
DCTs are also widely employed in solving partial differential equations by spectral methods, where the different variants of the DCT correspond to slightly different even/odd boundary conditions at the two ends of the array. Source: Internet
A partial differential equation (PDE) for the function is an equation of the form : If f is a linear function of u and its derivatives, then the PDE is called linear. Source: Internet
Even if the solution of a partial differential equation exists and is unique, it may nevertheless have undesirable properties. Source: Internet
Roughly speaking, the semigroup approach is to regard a time-dependent partial differential equation as an ordinary differential equation on a function space. Source: Internet
An online resource focusing on algebraic, ordinary differential, partial differential ( mathematical physics ), integral, and other mathematical equations. Source: Internet