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variationnels

Variationnels is a term used to refer to methods and principles based on the calculus of variations, a field in mathematics and theoretical physics concerned with finding functions that optimize functionals. In French-language scholarly writing, the adjective variationnel is often used to describe techniques, problems, and principles tied to variational methods and their applications.

The central idea of the variationnels is to determine a function that makes a functional stationary, typically

The scope of variationnels includes the calculus of variations, variational methods, variational principles, and variational inequalities.

Applications of variationnels are widespread. In physics, variational principles underlie classical mechanics, optics, quantum mechanics, and

Historically, variationnels trace to contributions by Euler and Lagrange in the 18th and 19th centuries, with

a
minimum,
maximum,
or
saddle
point.
This
involves
considering
small
perturbations
of
the
unknown
function
and
requiring
that
the
first
variation
of
the
functional
vanishes.
In
classical
form,
this
leads
to
Euler-Lagrange
type
equations,
which
provide
differential
equations
and
boundary
conditions
that
the
optimal
function
must
satisfy.
Variational
problems
may
be
constrained
by
endpoints
or
by
integral
conditions,
leading
to
natural
boundary
conditions
or
Lagrange
multipliers.
Key
concepts
include
the
action
principle
in
physics,
where
the
path
of
a
system
extremizes
an
action
integral,
and
weak
formulations
in
functional
analysis
used
to
study
partial
differential
equations.
Variational
techniques
also
underpin
numerical
methods,
such
as
finite
element
methods,
and
play
a
role
in
shape
optimization
and
material
science.
general
relativity.
In
engineering
and
economics,
variational
approaches
appear
in
optimization
problems,
structural
design,
and
inequality
formulations
that
capture
equilibrium
states.
later
developments
by
Hadamard,
Hilbert,
and
many
others
enriching
the
theory
and
its
methods.