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Padémethode

Padé method, or Padé approximation, is a technique in numerical analysis and approximation theory for approximating a function by a rational function. The idea is to construct a ratio of two polynomials whose power series expansion matches a given function as closely as possible, often better than a corresponding truncated Taylor series.

In its common form, for a function f with a Taylor series around a point a (often

Padé approximants are valued because they can capture poles and other singularities of the target function,

Common variants include diagonal and near-diagonal approximants, and the Padé table, which organizes approximants by increasing

a
=
0),
the
Padé
approximant
[m/n]
is
a
ratio
P_m(x)/Q_n(x)
where
P_m
has
degree
at
most
m
and
Q_n
has
degree
at
most
n,
with
Q_n(a)
=
1.
The
coefficients
of
P_m
and
Q_n
are
chosen
so
that
the
Taylor
expansion
of
P_m(x)/Q_n(x)
agrees
with
f(x)
up
to
the
order
m+n.
This
yields
a
system
of
linear
equations
that
can
be
solved
to
determine
the
coefficients.
The
Padé
approximant
is
unique
under
these
normalization
conditions.
enabling
more
accurate
approximation
near
such
features
and
beyond
the
radius
of
convergence
of
the
original
Taylor
series.
They
are
often
superior
to
truncating
a
power
series,
particularly
for
analytic
continuation
and
for
evaluating
functions
at
larger
arguments.
m
and
n.
Applications
span
summation
of
divergent
series,
numerical
evaluation
of
special
functions,
solving
differential
equations,
control
theory
(for
time-delay
approximations),
and
signal
processing.
The
method
is
named
after
Henri
Padé,
who
introduced
the
concept
in
the
late
19th
century.