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- Easy to read partial differential equations book?
Partial Differential Equations: An Introduction by Walter Strauss An Introduction to Partial Differential Equations by Michael Renardy Partial Differential Equations by Fritz John Partial Differential Equations by Lawrence C Evans My background is having read A First Course in Differential Equations with Modelling Applications by Dennis Zill
- analysis - How to tell if a differential equation is homogeneous, or . . .
The simplest test of homogeneity, and definition at the same time, not only for differential equations, is the following: An equation is homogeneous if whenever $\varphi$ is a solution and $\lambda$ scalar, then $\lambda\varphi$ is a solution as well
- reference request - Best Book For Differential Equations? - Mathematics . . .
The differential equations class I took as a youth was disappointing, because it seemed like little more than a bag of tricks that would work for a few equations, leaving the vast majority of interesting problems insoluble Simmons' book fixed that
- Linear vs nonlinear differential equation - Mathematics Stack Exchange
2 One could define a linear differential equation as one in which linear combinations of its solutions are also solutions
- How To Solve a Trigonometric Differential Equation
Explore related questions ordinary-differential-equations trigonometry proof-explanation See similar questions with these tags
- What comes after Differential Equations? - Mathematics Stack Exchange
Partial differential equations play a very important role in physics, and many problems in modeling of physical systems amounts to correctly figuring out how to set up a system of partial differential equations
- What is the essential difference between ordinary differential . . .
What is the essential difference between ordinary differential equations and partial differential equations? Ask Question Asked 10 years, 3 months ago Modified 3 years, 7 months ago
- Differential Equations: Stable, Semi-Stable, and Unstable
I am trying to identify the stable, unstable, and semistable critical points for the following differential equation: $\\dfrac{dy}{dt} = 4y^2 (4 - y^2)$ If I understand the definition of stable and
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