- #1
Aero6
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I'm plotting phase portraits and have a question about determining the direction of nullclines.
The systematic method that I'm using to plot phase portraits is:
1) find the nullclines
2) determine the direction of the arrows on the nullclines
3) find the eigenvalues
4)find the eigen vectors
5)plot the eigen vectors on phase portrait
6) determine the direction of the arrows on the eigen vectors according
7) draw the solutions to the equations by following the arrows on your nullclines and your eigenvectors
The two equations I have are:
Xsub1 = x subscript 1
Xsub2 = x subscript 2
Equation A) dXsub1\dt = 3Xsub1 - 2(Xsub2)
Equation B) dXsub2\dt = 2Xsub1 - Xsub2
when finding the nullclines, I set each derivative equation equal to 0.
for equation:
Substitution A) (2)(Xsub1) = Xsub2
Substitution B) (3\2)(Xsub1) = Xsub2
After plotting these two nullclines in my Xsub1 , Xsub2 plane, I tried to determine the direction of the arrows that you put on each nullcline (these arrows are what I follow when trying to plot my solution)
NOTE: Xsub2 corresponds to the vertical axis on my graph and Xsub1 corresponds to the horizontal axis on my graph.
Since the origin on my graph is my equilibrium solution, I looked to the right of the nullcline for dXsub1\dt. Since we are looking at dXsub1\dt =0 (this is the nullcline I plotted), Xsub1 is not changing so I can only move vertically along the nullcline for dXsub1\dt.
To determine the direction, I first substituted 'Substitution A' into 'Equation B' and solved for Xsub1 and got :
dXsub2\dt = -Xsub1 negative values of Xsub1 would mean my arrows along this
nullcline point to the right, correct?
positive values of Xsub1 would mean my arrows along this
nullcline would point to the left because my overall
dXsub2\dt would be negative, correct?
Then I substituted 'Substitution B' into 'Equation A' and solved for Xsub1 and got:
dXsub1\dt = (.5)(Xsub1) negative values for Xsub1 mean my arrows point to down
along this nullcline, because a negative value for Xsub1 would
make dXsub1dt negative, correct?
positive values for Xsub1 means that my arrows would point up
along this nullcline because this would make dXsub1\dt positive?
When I looked at this example and another from class, the arrows go the direction opposite of how I've written them here and that's why I'm confused about how you determine the direction of the arrows on your nullclines.
Thank you
The systematic method that I'm using to plot phase portraits is:
1) find the nullclines
2) determine the direction of the arrows on the nullclines
3) find the eigenvalues
4)find the eigen vectors
5)plot the eigen vectors on phase portrait
6) determine the direction of the arrows on the eigen vectors according
7) draw the solutions to the equations by following the arrows on your nullclines and your eigenvectors
The two equations I have are:
Xsub1 = x subscript 1
Xsub2 = x subscript 2
Equation A) dXsub1\dt = 3Xsub1 - 2(Xsub2)
Equation B) dXsub2\dt = 2Xsub1 - Xsub2
when finding the nullclines, I set each derivative equation equal to 0.
for equation:
Substitution A) (2)(Xsub1) = Xsub2
Substitution B) (3\2)(Xsub1) = Xsub2
After plotting these two nullclines in my Xsub1 , Xsub2 plane, I tried to determine the direction of the arrows that you put on each nullcline (these arrows are what I follow when trying to plot my solution)
NOTE: Xsub2 corresponds to the vertical axis on my graph and Xsub1 corresponds to the horizontal axis on my graph.
Since the origin on my graph is my equilibrium solution, I looked to the right of the nullcline for dXsub1\dt. Since we are looking at dXsub1\dt =0 (this is the nullcline I plotted), Xsub1 is not changing so I can only move vertically along the nullcline for dXsub1\dt.
To determine the direction, I first substituted 'Substitution A' into 'Equation B' and solved for Xsub1 and got :
dXsub2\dt = -Xsub1 negative values of Xsub1 would mean my arrows along this
nullcline point to the right, correct?
positive values of Xsub1 would mean my arrows along this
nullcline would point to the left because my overall
dXsub2\dt would be negative, correct?
Then I substituted 'Substitution B' into 'Equation A' and solved for Xsub1 and got:
dXsub1\dt = (.5)(Xsub1) negative values for Xsub1 mean my arrows point to down
along this nullcline, because a negative value for Xsub1 would
make dXsub1dt negative, correct?
positive values for Xsub1 means that my arrows would point up
along this nullcline because this would make dXsub1\dt positive?
When I looked at this example and another from class, the arrows go the direction opposite of how I've written them here and that's why I'm confused about how you determine the direction of the arrows on your nullclines.
Thank you