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advectiondiffusionreaction

Advection-diffusion-reaction is a class of mathematical models used to describe the transport and transformation of substances in flowing media. The model combines three coupled processes: advection, diffusion, and reaction.

Advection refers to transport by the bulk motion of the fluid. In a velocity field v, the

In many formulations for a scalar concentration c(x,t) in an assumed flow, the advection-diffusion-reaction equation can

Solutions require initial concentration distributions and boundary conditions, such as specified concentrations or fluxes on domain

Applications span groundwater and environmental engineering, atmospheric and oceanic transport, chemical reactors, and biomedical contexts. Analytical

advective
transport
of
concentration
c
is
represented
by
the
term
v
·
∇c.
Diffusion
accounts
for
spreading
due
to
concentration
gradients,
described
by
a
diffusion
coefficient
D
(scalar
or
tensor)
and
the
term
∇
·
(D
∇c).
Reaction
encompasses
local
production
or
consumption
through
chemical,
biological,
or
other
transformations,
with
a
source
term
R(c,
x,
t).
be
written
as
∂c/∂t
+
v
·
∇c
=
∇
·
(D
∇c)
+
R(c,
x,
t).
For
more
general
conditions,
including
variable
density
or
mass
conservation,
alternative
but
related
forms
such
as
∂c/∂t
+
∇
·
(v
c)
=
∇
·
(D
∇c)
+
R
may
be
used,
depending
on
the
modeling
assumptions.
boundaries.
In
practice,
D
and
R
may
depend
on
position,
time,
or
c,
making
the
problem
nonlinear.
solutions
exist
for
simplified
linear
cases;
most
real-world
problems
rely
on
numerical
methods
such
as
finite
difference,
finite
element,
or
finite
volume
schemes.
Dimensional
analysis
using
Peclet
and
Damköhler
numbers
helps
identify
the
relative
importance
of
transport,
spreading,
and
reaction
processes.