Provided by: libmath-symbolic-perl_0.612-1_all bug

NAME

       Math::Symbolic::Compiler - Compile Math::Symbolic trees to Perl code

SYNOPSIS

         use Math::Symbolic::Compiler;

         # A tree to compile
         my $tree = Math::Symbolic->parse_from_string('a^2 + b * c * 2');

         # The Math::Symbolic::Variable 'a' will be evaluated to $_[1], etc.
         my $vars = [qw(b a c)];

         my ($closure, $code, $trees) =
           Math::Symbolic::Compiler->compile($tree, $vars);

         print $closure->(2, 3, 5); # (b, a, c)
         # prints 29 (= 3^2 + 2 * 5 * 2)

         # or:
         ($closure, $trees) =
           Math::Symbolic::Compiler->compile_to_sub($tree, $vars);

         ($code, $trees) = Math::Symbolic::Compiler->compile_to_code($tree, $vars);

DESCRIPTION

       This module allows one to compile Math::Symbolic trees to Perl code and/or anonymous
       subroutines whose arguments will be positionally mapped to the variables of the compiled
       Math::Symbolic tree.

       The reason you'd want to do this is that evaluating a Math::Symbolic tree to its numeric
       value is extremely slow. So is compiling, but once you've done all necessary symbolic
       calculations, you can take advantage of the speed gain of invoking a closure instead of
       evaluating a tree.

   UNCOMPILED LEFTOVER TREES
       Not all, however, is well in the land of compiled Math::Symbolic trees.  There may
       occasionally be trees that cannot be compiled (such as a derivative) which need to be
       included into the code as trees. These trees will be returned in a referenced array by the
       compile*() methods. The closures will have access to the required trees as a special
       variable '@_TREES inside the closure's scope, so you need not worry about them in that
       case. But if you plan to use the generated code itself, you need to supply an array named
       @_TREES that contains the trees as returned by the compile*() methods in the scope of the
       eval() you evaluate the code with.

       Note that you give away all performance benefits compiling the tree might have if the
       closure contains uncompiled trees. You can tell there are any by checking the length of
       the referenced array that contains the trees. If it's 0, then there are no trees left to
       worry about.

   AVOIDING LEFTOVER TREES
       In most cases, this is pretty simple. Just apply all derivatives in the tree to make sure
       that there are none left in the tree. As of version 0.130, there is no operator except
       derivatives that cannot be compiled. There may, however, be some operators you cannot get
       rid of this easily some time in the future.  If you have problems getting a tree to
       compile, try using the means of simplification provided by Math::Symbolic::* to get a
       simpler tree for compilation.

   EXPORT
       None by default, but you may choose to import the compile(), compile_to_sub(), and
       compile_to_code() subroutines to your namespace using the standard Exporter semantics
       including the ':all' tag.

SUBROUTINES

   ($code, $trees) = compile_to_code($tree, $vars)
       The compile_to_code() class method takes one mandatory argument which is the
       Math::Symbolic tree to be compiled. Second argument is optional and an array reference to
       an array of variable mappings.  See "VARIABLE PASSING STYLES" for details on how this
       works.

       compile_to_code() returns a string and an array reference. The string contains the
       compiled Perl code that uses the values stored in @_ as described in the section on
       positional variable passing. It also accesses a special variable @_TREES if there were any
       sub-trees (inside the tree that has been compiled) that were impossible to compile. The
       array reference returned by this method contains any of the aforementioned trees that
       failed to compile.

       If there are any such trees that did not compile, you may put them into the @_TREES
       variable in scope of the eval() that evaluates the compiled code in the same order that
       they were returned by this method. If you do that, the code will run and determine the
       value of the tree at run-time. Needless to say, that is slow.

   ($sub, $trees) = compile_to_sub($tree, $vars)
       The compile_to_sub() class method takes one mandatory argument which is the Math::Symbolic
       tree to be compiled. Second argument is optional and an array reference to an array of
       variable mappings.  See "VARIABLE PASSING STYLES" for details on how this works.

       compile_to_sub() returns a list of two elements, the first being the compiled anonymous
       subroutine. For details on the second element, please refer to the docs on the
       compile_to_code() subroutine.

   ($sub, $code, $trees) = compile($tree, $vars)
       The compile() class method takes one mandatory argument which is the Math::Symbolic tree
       to be compiled. Second argument is optional and an array reference to an array of variable
       mappings.  See "POSITIONAL VARIABLE PASSING" for details on how this works.

       compile() returns a list of three elements, the first being the compiled anonymous
       subroutine, the second being the compiled code. For details on the second and third
       elements, please refer to the docs on the compile_to_code() subroutine.

   VARIABLE PASSING STYLES
       Currently, the Math::Symbolic compiler only supports compiling to subs with positional
       variable passing. At some point, the user should be able to choose between positional- and
       named variable passing styles. The difference is best explained by an example:

         # positional:
         $sub->(4, 5, 1);

         # named: (NOT IMPLEMENTED!)
         $sub->(a => 5, b => 4, x => 1);

       With positional variable passing, the subroutine statically maps its arguments to its
       internal variables. The way the subroutine does that has been fixed at compile-time. It is
       determined by the second argument to the various compile_* functions found in this
       package. This second argument is expected to be a reference to an array of variable names.
       The order of the variable names determines which parameter of the compiled sub will be
       assigned to the variable. Example:

         my ($sub) =
           Math::Symbolic::Compiler->compile_to_sub($tree, [qw/c a b/]);

         # First argument will be mapped to c, second to a, and third to b
         # All others will be ignored.
         $sub->(4, 5, 6, 7);

         # Variable mapping: a = 5, b = 6, c = 4

       One important note remains: if any (or all) variables in the tree are unaccounted for,
       they will be lexicographically sorted and appended to the variable mapping in that order.
       That means if you don't map variables yourself, they will be sorted lexicographically.

       Thanks to Henrik Edlund's input, it's possible to pass a hash reference as second argument
       to the compile* functions instead of an array reference.  The order of the mapped
       variables is then determined by their associated value, which should be an integer
       starting with 0. Example:

         Math::Symbolic::Compiler->compile_to_sub($tree, {b => 2, a => 1, c => 0});

       Would result in the order c, a, b.

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 MXller, symbolic-module at steffen-mueller dot net
         Stray Toaster, mwk at users dot sourceforge dot net
         Oliver EbenhXh

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