Existence-uniqueness: Difference between revisions
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The '''existence-uniqueness theorem''' theorem states that if <math>f(t,y)</math> and | The '''existence-uniqueness theorem''' theorem states that if <math>f(t,y)</math> and <math>\frac{\partial f}{\partial y}</math> is continuous in some rectangle <math>a<t<b</math>, <math>c<y<d</math> about <math>(t_0, y_0)</math>, then there exists a unique solution of the IVP defined for some time interval <math>a'<t<b'</math> about <math>t_0</math>. | ||
= Notes = | = Notes = | ||
The time interval may be much shorter than <math>a<t<b</math>. The solution gives ''no information'' on the time interval. This means that the solution can go off to undefined values even when the inputs are defined. | The time interval may be much shorter than <math>a<t<b</math>. The solution gives ''no information'' on the time interval. This means that the solution can go off to undefined values even when the inputs are defined. | ||
Differentiability is important to ensure that the solution is unique. | |||
= Geometric intuition = | = Geometric intuition = |
Revision as of 21:05, 17 May 2024
Consider an IVP for a general first order scalar ODE.
The existence-uniqueness theorem theorem states that if and is continuous in some rectangle , about , then there exists a unique solution of the IVP defined for some time interval about .
Notes
The time interval may be much shorter than . The solution gives no information on the time interval. This means that the solution can go off to undefined values even when the inputs are defined.
Differentiability is important to ensure that the solution is unique.
Geometric intuition
Geometrically, is the slope. Consider the vector . This vector would be tangential to the movement of the curve.