Minimizing a functional - MathOverflow most recent 30 from http://mathoverflow.net 2013-05-25T09:01:45Z http://mathoverflow.net/feeds/question/3699 http://www.creativecommons.org/licenses/by-nc/2.5/rdf http://mathoverflow.net/questions/3699/minimizing-a-functional Minimizing a functional Jaakko Seppälä 2009-11-01T19:38:46Z 2010-06-05T09:29:47Z <p>I have wondered the problem in <a href="http://www.helsinki.fi/~hmkokko/Stuff/Esdale/index.html" rel="nofollow">http://www.helsinki.fi/~hmkokko/Stuff/Esdale/index.html</a> for over year without success. If we try to minimize the functional equation T(\theta ) = \int_0^L\frac {dx}{v_0\cos \theta(x)} in the set W = {\theta \in C^1 [0,L]|C(\theta) = y} where C(\theta) = \int_0^L\frac {v_0\sin \theta (x) + v(x)}{v_0\cos \theta (x)}dx, can the solution be represented in a closed form or not? A solution or a proof that no closed form solution exists would be nice.</p> http://mathoverflow.net/questions/3699/minimizing-a-functional/4989#4989 Answer by Duke Leto for Minimizing a functional Duke Leto 2009-11-11T06:32:18Z 2009-11-11T06:32:18Z <p>Here is some of your question properly translated.</p> <p>$T(\theta) = \int \frac{dx}{v_0\cos \theta(x)}dx$</p> <p>$W = {\theta \in C^1 [0,L]|C(\theta) = y}$</p> <p>The definition of C(\theta) doesn't seem to want to work.</p> http://mathoverflow.net/questions/3699/minimizing-a-functional/6963#6963 Answer by David Bar Moshe for Minimizing a functional David Bar Moshe 2009-11-27T16:44:10Z 2009-11-27T16:44:10Z <p>The straight line (with constant theta) given by:</p> <p>y/x = (v0 sin(theta) + v)/(v0 cos(theta)) </p> <p>is the optimal solution. This can be readily seen from the question's formulation: The constrained functional:</p> <p>int[0,L] dx/(v0 cos(theta)) + lambda int[0,L] dx(v0 sin(theta) + v)/(v0 cos(theta)) </p> <p>doesn't depend on the time derivative of theta, thus the Euler lagrange equation does not depend on the derivatives of theta, thus has a constant theta as a solution.</p> <p>Another way to understand the solution is to describe it from the point of view of an observer moving with the current. In this case the problem reduces to the geodesic motion of a free particle on the two dimensional plane. It's solution is a straight line with constant velocity. The (Eucledian) inverse transformation to the original system transforms constant velocity straight lines to constant velocity straight lines.</p> <p>Solutions of general dynamical problems of trajectory time minimization can be systematically formulated using Pontryagin's maximum principle (see the wikipedia article).</p> http://mathoverflow.net/questions/3699/minimizing-a-functional/6976#6976 Answer by amateur algebraist for Minimizing a functional amateur algebraist 2009-11-27T19:25:51Z 2009-11-27T19:25:51Z <p>Sorry. The problem is that we start from the point $(0,0)$ and we swim to $(1,0)$. Now if you swim by straight line you won't necessary end to the point where you want to. Then you have to compute how the flow affects your swimming speed and the direction you are swimming to. I think this leads to the functional equation I got if I computed it correctly. Then you can probably find a solution curve which tells the direction you have to swim with respect to time.</p>