|
- 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
- ordinary differential equations - difference between implicit and . . .
What is difference between implicit and explicit solution of an initial value problem? Please explain with example both solutions (implicit and explicit)of same initial value problem? Or without exa
- What makes a differential equation, linear or non-linear?
Among these differential equations why one is linear while other is non-linear? What is criteria to find out whether a differential equation is linear or non-linear?
- 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 φ φ is a solution and λ λ scalar, then λφ λ φ is a solution as well
- What is a differential form? - Mathematics Stack Exchange
68 can someone please informally (but intuitively) explain what "differential form" mean? I know that there is (of course) some formalism behind it - definition and possible operations with differential forms, but what is the motivation of introducing and using this object (differential form)?
- Best books for self-studying differential geometry
Next semester (fall 2021) I am planning on taking a grad-student level differential topology course but I have never studied differential geometry which is a pre-requisite for the course My plan i
- Differential Equations; Mixture problem - Mathematics Stack Exchange
Differential Equations; Mixture problem Ask Question Asked 12 years, 9 months ago Modified 8 years, 10 months ago
- Distributions of a group scheme as differential operators.
Hence μ μ is a differential operator of order one An induction proves the result for all n ≥ 1 n ≥ 1 Definition: If k → R k → R is a map of commutative rings and E, F E, F are R R -modules you define Diffn k (E, F) D i f f k n (E, F) inductively as the set of maps D ∈ Homk(E, F) D ∈ H o m k (E, F) with
|
|
|