Lagrange multipliers on Banach spaces

In the field of calculus of variations in mathematics, the method of Lagrange multipliers on Banach spaces can be used to solve certain infinite-dimensional constrained optimization problems. The method is a generalization of the classical method of Lagrange multipliers as used to find extrema of a function of finitely many variables.

The Lagrange multiplier theorem for Banach spaces

Let X and Y be real Banach spaces. Let U be an open subset of X and let f : UR be a continuously differentiable function. Let g : UY be another continuously differentiable function, the constraint: the objective is to find the extremal points (maxima or minima) of f subject to the constraint that g is zero.

Suppose that u0 is a constrained extremum of f, i.e. an extremum of f on

Suppose also that the Fréchet derivative Dg(u0) : XY of g at u0 is a surjective linear map. Then there exists a Lagrange multiplier λ : YR in Y, the dual space to Y, such that

Since Df(u0) is an element of the dual space X, equation (L) can also be written as

where (Dg(u0))(λ) is the pullback of λ by Dg(u0), i.e. the action of the adjoint map (Dg(u0)) on λ, as defined by

Connection to the finite-dimensional case

In the case that X and Y are both finite-dimensional (i.e. linearly isomorphic to Rm and Rn for some natural numbers m and n) then writing out equation (L) in matrix form shows that λ is the usual Lagrange multiplier vector; in the case n = 1, λ is the usual Lagrange multiplier, a real number.

Application

In many optimization problems, one seeks to minimize a functional defined on an infinite-dimensional space such as a Banach space.

Consider, for example, the Sobolev space and the functional given by

Without any constraint, the minimum value of f would be 0, attained by u0(x) = 0 for all x between 1 and +1. One could also consider the constrained optimization problem, to minimize f among all those uX such that the mean value of u is +1. In terms of the above theorem, the constraint g would be given by

However this problem can be solved as in the finite dimensional case since the Lagrange multiplier is only a scalar.

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See also

  • Pontryagin's minimum principle, Hamiltonian method in calculus of variations

References

  • Luenberger, David G. (1969). "Local Theory of Constrained Optimization". Optimization by Vector Space Methods. New York: John Wiley & Sons. pp. 239–270. ISBN 0-471-55359-X.
  • Zeidler, Eberhard (1995). Applied functional analysis: Variational Methods and Optimization. Applied Mathematical Sciences 109. New York, NY: Springer-Verlag. ISBN 978-1-4612-9529-7. (See Section 4.14, pp.270271.)

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