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nonvariational

Nonvariational is an adjective used in mathematics and related fields to describe problems, equations, or methods that do not arise from or cannot be expressed as the stationary points of a functional, i.e., they do not have a variational formulation as Euler–Lagrange equations of a functional.

In the context of partial differential equations, a problem is variational if its solutions can be characterized

In numerical analysis, the term nonvariational finite element method (NVFEM) is used to describe discretizations of

Nonvariational problems commonly appear in contexts involving dissipation, external forcing, or transport-dominated processes, where a traditional

as
minimizers
or
extrema
of
an
energy
or
action
functional.
Nonvariational
PDEs
lack
such
a
reformulation
or
do
not
admit
a
meaningful
functional
whose
critical
points
correspond
to
solutions.
This
distinction
has
implications
for
both
theory
and
computation:
variational
problems
allow
energy
methods,
existence
proofs
via
direct
methods,
and
natural
numerical
schemes
based
on
Galerkin-type
weak
forms.
Nonvariational
problems,
by
contrast,
may
require
alternative
approaches
that
do
not
rely
on
an
energy
principle,
such
as
operator-theoretic
techniques,
residual-based
formulations,
or
discretizations
that
work
with
the
strong
form
in
a
weak
sense.
PDEs
that
do
not
possess
a
standard
variational
form.
NVFEM
and
related
methods
aim
to
provide
stable
and
accurate
solutions
for
nonvariational
operators,
including
non-self-adjoint
or
non-potential
systems,
by
adapting
the
finite
element
framework
to
accommodate
forms
that
cannot
be
derived
from
a
functional.
energy-based
formulation
is
unavailable.