Math::Symbolic::VectorUseruContributed Perl DMath::Symbolic::VectorCalculus(3)NAMEMath::Symbolic::VectorCalculus - Symbolically comp. grad, Jacobi
matrices etc.
SYNOPSIS
use Math::Symbolic qw/:all/;
use Math::Symbolic::VectorCalculus; # not loaded by Math::Symbolic
@gradient = grad 'x+y*z';
# or:
$function = parse_from_string('a*b^c');
@gradient = grad $function;
# or:
@signature = qw(x y z);
@gradient = grad 'a*x+b*y+c*z', @signature; # Gradient only for x, y, z
# or:
@gradient = grad $function, @signature;
# Similar syntax variations as with the gradient:
$divergence = div @functions;
$divergence = div @functions, @signature;
# Again, similar DWIM syntax variations as with grad:
@rotation = rot @functions;
@rotation = rot @functions, @signature;
# Signatures always inferred from the functions here:
@matrix = Jacobi @functions;
# $matrix is now array of array references. These hold
# Math::Symbolic trees. Or:
@matrix = Jacobi @functions, @signature;
# Similar to Jacobi:
@matrix = Hesse $function;
# or:
@matrix = Hesse $function, @signature;
$wronsky_determinant = WronskyDet @functions, @vars;
# or:
$wronsky_determinant = WronskyDet @functions; # functions of 1 variable
$differential = TotalDifferential $function;
$differential = TotalDifferential $function, @signature;
$differential = TotalDifferential $function, @signature, @point;
$dir_deriv = DirectionalDerivative $function, @vector;
$dir_deriv = DirectionalDerivative $function, @vector, @signature;
$taylor = TaylorPolyTwoDim $function, $var1, $var2, $degree;
$taylor = TaylorPolyTwoDim $function, $var1, $var2,
$degree, $var1_0, $var2_0;
# example:
$taylor = TaylorPolyTwoDim 'sin(x)*cos(y)', 'x', 'y', 2;
DESCRIPTION
This module provides several subroutines related to vector calculus
such as computing gradients, divergence, rotation, and Jacobi/Hesse
Matrices of Math::Symbolic trees. Furthermore it provides means of
computing directional derivatives and the total differential of a
scalar function and the Wronsky Determinant of a set of n scalar
functions.
Please note that the code herein may or may not be refactored into the
OO-interface of the Math::Symbolic module in the future.
EXPORT
None by default.
You may choose to have any of the following routines exported to the
calling namespace. ':all' tag exports all of the following:
grad
div
rot
Jacobi
Hesse
WronskyDet
TotalDifferential
DirectionalDerivative
TaylorPolyTwoDim
SUBROUTINES
grad
This subroutine computes the gradient of a Math::Symbolic tree
representing a function.
The gradient of a function f(x1, x2, ..., xn) is defined as the vector:
( df(x1, x2, ..., xn) / d(x1),
df(x1, x2, ..., xn) / d(x2),
...,
df(x1, x2, ..., xn) / d(xn) )
(These are all partial derivatives.) Any good book on calculus will
have more details on this.
grad uses prototypes to allow for a variety of usages. In its most
basic form, it accepts only one argument which may either be a
Math::Symbolic tree or a string both of which will be interpreted as
the function to compute the gradient for. Optionally, you may specify a
second argument which must be a (literal) array of
Math::Symbolic::Variable objects or valid Math::Symbolic variable names
(strings). These variables will the be used for the gradient instead of
the x1, ..., xn inferred from the function signature.
div
This subroutine computes the divergence of a set of Math::Symbolic
trees representing a vectorial function.
The divergence of a vectorial function F = (f1(x1, ..., xn), ...,
fn(x1, ..., xn)) is defined like follows:
sum_from_i=1_to_n( dfi(x1, ..., xn) / dxi )
That is, the sum of all partial derivatives of the i-th component
function to the i-th coordinate. See your favourite book on calculus
for details. Obviously, it is important to keep in mind that the
number of function components must be equal to the number of
variables/coordinates.
Similar to grad, div uses prototypes to offer a comfortable interface.
First argument must be a (literal) array of strings and Math::Symbolic
trees which represent the vectorial function's components. If no second
argument is passed, the variables used for computing the divergence
will be inferred from the functions. That means the function signatures
will be joined to form a signature for the vectorial function.
If the optional second argument is specified, it has to be a (literal)
array of Math::Symbolic::Variable objects and valid variable names
(strings). These will then be interpreted as the list of variables for
computing the divergence.
rot
This subroutine computes the rotation of a set of three Math::Symbolic
trees representing a vectorial function.
The rotation of a vectorial function F = (f1(x1, x2, x3), f2(x1, x2,
x3), f3(x1, x2, x3)) is defined as the following vector:
( ( df3/dx2 - df2/dx3 ),
( df1/dx3 - df3/dx1 ),
( df2/dx1 - df1/dx2 ) )
Or "nabla x F" for short. Again, I have to refer to the literature for
the details on what rotation is. Please note that there have to be
exactly three function components and three coordinates because the
cross product and hence rotation is only defined in three dimensions.
As with the previously introduced subroutines div and grad, rot offers
a prototyped interface. First argument must be a (literal) array of
strings and Math::Symbolic trees which represent the vectorial
function's components. If no second argument is passed, the variables
used for computing the rotation will be inferred from the functions.
That means the function signatures will be joined to form a signature
for the vectorial function.
If the optional second argument is specified, it has to be a (literal)
array of Math::Symbolic::Variable objects and valid variable names
(strings). These will then be interpreted as the list of variables for
computing the rotation. (And please excuse my copying the last two
paragraphs from above.)
Jacobi
Jacobi() returns the Jacobi matrix of a given vectorial function. It
expects any number of arguments (strings and/or Math::Symbolic trees)
which will be interpreted as the vectorial function's components.
Variables used for computing the matrix are, by default, inferred from
the combined signature of the components. By specifying a second
literal array of variable names as (second) argument, you may override
this behaviour.
The Jacobi matrix is the vector of gradient vectors of the vectorial
function's components.
Hesse
Hesse() returns the Hesse matrix of a given scalar function. First
argument must be a string (to be parsed as a Math::Symbolic tree) or a
Math::Symbolic tree. As with Jacobi(), Hesse() optionally accepts an
array of signature variables as second argument.
The Hesse matrix is the Jacobi matrix of the gradient of a scalar
function.
TotalDifferential
This function computes the total differential of a scalar function of
multiple variables in a certain point.
First argument must be the function to derive. The second argument is
an optional (literal) array of variable names (strings) and
Math::Symbolic::Variable objects to be used for deriving. If the
argument is not specified, the functions signature will be used. The
third argument is also an optional array and denotes the set of
variable (names) to use for indicating the point for which to evaluate
the differential. It must have the same number of elements as the
second argument. If not specified the variable names used as
coordinated (the second argument) with an appended '_0' will be used as
the point's components.
DirectionalDerivative
DirectionalDerivative computes the directional derivative of a scalar
function in the direction of a specified vector. With f being the
function and X, A being vectors, it looks like this: (this is a partial
derivative)
df(X)/dA = grad(f(X)) * (A / |A|)
First argument must be the function to derive (either a string or a
valid Math::Symbolic tree). Second argument must be vector into whose
direction to derive. It is to be specified as an array of variable
names and objects. Third argument is the optional signature to be used
for computing the gradient. Please see the documentation of the grad
function for details. It's dimension must match that of the directional
vector.
TaylorPolyTwoDim
This subroutine computes the Taylor Polynomial for functions of two
variables. Please refer to the documentation of the TaylorPolynomial
function in the Math::Symbolic::MiscCalculus package for an explanation
of single dimensional Taylor Polynomials. This is the counterpart in
two dimensions.
First argument must be the function to approximate with the Taylor
Polynomial either as a string or a Math::Symbolic tree. Second and
third argument must be the names of the two coordinates. (These may
alternatively be Math::Symbolic::Variable objects.) Fourth argument
must be the degree of the Taylor Polynomial. Fifth and Sixth arguments
are optional and specify the names of the variables to introduce as the
point of approximation. These default to the names of the coordinates
with '_0' appended.
WronskyDet
WronskyDet() computes the Wronsky Determinant of a set of n functions.
First argument is required and a (literal) array of n functions. Second
argument is optional and a (literal) array of n variables or variable
names. If the second argument is omitted, the variables used for
deriving are inferred from function signatures. This requires, however,
that the function signatures have exactly one element. (And the
function this exactly one variable.)
AUTHOR
Please send feedback, bug reports, and support requests to the
Math::Symbolic support mailing list: math-symbolic-support at lists dot
sourceforge dot net. Please consider letting us know how you use
Math::Symbolic. Thank you.
If you're interested in helping with the development or extending the
module's functionality, please contact the developers' mailing list:
math-symbolic-develop at lists dot sourceforge dot net.
List of contributors:
Steffen MA~Xller, symbolic-module at steffen-mueller dot net
Stray Toaster, mwk at users dot sourceforge dot net
Oliver EbenhA~Xh
SEE ALSO
New versions of this module can be found on http://steffen-mueller.net
or CPAN. The module development takes place on Sourceforge at
http://sourceforge.net/projects/math-symbolic/
Math::Symbolic
perl v5.14.1 2011-07-26 Math::Symbolic::VectorCalculus(3)