Page 85 - INTRODUCTION TO THE CALCULUS OF VARIATIONS

P. 85

72 Classical methods

Therefore a solution of the equation is given by
u
Z
p
S = S (x, u)= S (u)= 2g (s)ds .
0
We next solve
p
0
u (x)= H v (u (x) ,S u (u (x))) = S u (u (x)) = 2g (u (x))
which has a solution given implicitly by
u(x)
Z
ds
= x.
p
u(0) 2g (s)
Setting v (x)= S u (u (x)), we have indeed found a solution of the Hamiltonian
system
⎧
u (x)= H v (u (x) ,v (x)) = v (x)
0
⎨
v (x)= −H u (u (x) ,v (x)) = g (u (x)) .
⎩
0
0
Note also that such a function u solves
u (x)= g (u (x))
00
0
which is the Euler-Lagrange equation associated to the Lagrangian f.
2.5.1 Exercises

N
Exercise 2.5.1 Write the Hamilton-Jacobi equation when u ∈ R , N ≥ 1,and
generalize Theorem 2.19 to this case.
p p 2
Exercise 2.5.2 Let f (x, u, ξ)= f (u, ξ)= g (u) 1+ ξ . Solve the Hamilton-
Jacobi equation and ﬁnd the stationary points of
Z
b
0
I (u)= f (u (x) ,u (x)) dx .
a
Exercise 2.5.3 Same exercise as the preceding one with f (x, u, ξ)= f (u, ξ)=
2
a (u) ξ /2 where a (u) ≥ a 0 > 0. Compare the result with Exercise 2.2.10.

2.6 Fields theories
As already said we will only give a very brief account on the ﬁelds theories and
we refer to the bibliography for more details. These theories are conceptually
important but often diﬃcult to manage for speciﬁcexamples.

80 81 82 83 84 85 86 87 88 89 90