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7.2: Stationary Flows
https://math.libretexts.org/Bookshelves/Analysis/Complex_Variables_with_Applications_(Orloff)/07%3A_Two_Dimensional_Hydrodynamics_and_Complex_Potentials/7.02%3A_Stationary_Flows
If the velocity field is unchanging in time we call the flow a stationary flow. In this case, we can drop t as an argument.
6: Stable and Unstable Manifolds of Equilibria
https://math.libretexts.org/Bookshelves/Differential_Equations/Ordinary_Differential_Equations_(Wiggins)/06%3A_Stable_and_Unstable_Manifolds_of_Equilibria
Moreover, the x-axis is the unstable subspace for the linearized vector field and the y axis is the stable subspace for the linearized vector field. The global unstable manifold of the origin is the s...Moreover, the x-axis is the unstable subspace for the linearized vector field and the y axis is the stable subspace for the linearized vector field. The global unstable manifold of the origin is the set of initial conditions having the property that the trajectories through these initial conditions approach the origin at an exponential rate as $t \rightarrow -\infty$ .
4.9: The Divergence Theorem and a Unified Theory
https://math.libretexts.org/Bookshelves/Calculus/Supplemental_Modules_(Calculus)/Vector_Calculus/4%3A_Integration_in_Vector_Fields/4.9%3A_The_Divergence_Theorem_and_a_Unified_Theory
When we looked at Green's Theorem, we saw that there was a relationship between a region and the curve that encloses it. This gave us the relationship between the line integral and the double integral...When we looked at Green's Theorem, we saw that there was a relationship between a region and the curve that encloses it. This gave us the relationship between the line integral and the double integral. Now consider the following theorem:

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