=head1 NAME LinearProgramming.pl =head1 SYNPOSIS Macros related to the simplex method for Linear Programming. lp_pivot_element() - find the pivot element from a tableau lp_solve() - pivot until done lp_current_value() - given a tableau, find the value of a requested variable lp_display() - display a tableau lp_display_mm() - display a tableau while in math mode lp_pivot() - perform one pivot on a tableau Matrix display makes use of macros from PGmatrixmacros.pl, so it must be included too. =head1 DESCRIPTION These are macros for dealing with simplex tableau for linear programming problems. The tableau is a reference to an array of arrays, which looks like, [[1,2,3], [4,5,6]]. The entries can be real numbers or Fractions. Tableaus are expected to be legal for the simplex method, such as [[0, 3, -4, 5, 1, 0, 0, 28], [0, 2, 0, 1, 0, 1, 0, 11], [0, 1, 2, 3, 0, 0, 1, 3], [1, -1, 2, -3, 0, 0, 0, 0]] or something similar which arises after pivoting. =cut =head2 lp_pivot Take a tableau, the row and column number, and perform one pivot operation. The tableau can be any matrix in the form reference to array of arrays, such as [[1,2,3],[4,5,6]]. Row and column numbers start at 0. An optional 4th argument can be specified to indicate that the matrix has entries of type Fraction (and then all entries should be of type Fraction). $m = [[1,2,3],[4,5,6]]; lp_pivot($m, 0,2); This function is destructive - it changes the values of its matrix rather than making a copy, and also returns the matrix, so $m = lp_pivot([[1,2,3],[4,5,6]], 0, 2); will have the same result as the example above. =cut # perform a pivot operation # lp_pivot([[1,2,3],...,[4,5,6]], row, col, fractionmode) # row and col indecies start at 0 sub lp_pivot { my $a_ref = shift; my $row = shift; my $col = shift; my $fracmode = shift; $fracmode = 0 unless defined($fracmode); my @matrows = @{$a_ref}; if(($fracmode and $matrows[$row][$col]->scalar() == 0) or $matrows[$row][$col] == 0) { warn "Pivoting a matrix on a zero element"; return($a_ref); } my ($j, $k, $hld); $hld = $matrows[$row][$col]; for $j (1..scalar(@{$matrows[0]})) { $matrows[$row][$j-1] = $fracmode ? $matrows[$row][$j-1]->divBy($hld) : $matrows[$row][$j-1]/$hld; } for $k (1..scalar(@matrows)) { if($k-1 != $row) { $hld = $matrows[$k-1][$col]; for $j (1..scalar(@{$matrows[0]})) { $matrows[$k-1][$j-1] = $fracmode ? $matrows[$k-1][$j-1]->minus($matrows[$row][$j-1]->times($hld)) : $matrows[$k-1][$j-1] - $matrows[$row][$j-1]*$hld; } } } return($a_ref); } =head2 lp_pivot_element Take a simplex tableau, and determine which element is the next pivot element based on the algorithm in Mizrahi and Sullivan's Finite Mathematics, section 4.2. The tableau must represent a point in the region of feasibility for a LP problem. Otherwise, it can be any matrix in the form reference to array of arrays, such as [[1,2,3],[4,5,6]]. An optional 2nd argument can be specified to indicate that the matrix has entries of type Fraction (and then all entries should be of type Fraction). It returns a pair [row, col], with the count starting at 0. If there is no legal pivot column (final tableau), it returns [-1,-1]. If there is a column, but no pivot element (unbounded problem), it returns [-1, col]. =cut # Find pivot column for standard part sub lp_pivot_element { my $a_ref = shift; my $fracmode = shift; $fracmode = 0 unless defined($fracmode); my @m = @{$a_ref}; my $nrows = scalar(@m)-1; # really 1 less my $ncols = scalar(@{$m[0]}) -1; # really 1 less # looking for minimum value my $minv = $fracmode ? $m[$nrows][0]->scalar() : $m[$nrows][0]; my $pcol=0; my $j; for $j (1..($ncols-1)) { if(($fracmode and $m[$nrows][$j]->scalar()<$minv) or $m[$nrows][$j]<$minv) { $minv = $fracmode ? $m[$nrows][$j]->scalar() :$m[$nrows][$j]; $pcol = $j; } } return (-1, -1) if ($minv>=0); # This means we are done # Now find the pivot row my $prow=-1; for $j (0..($nrows-1)) { if($fracmode ? ($m[$j][$pcol]->scalar() >0) : ($m[$j][$pcol]>0)) { # found a candidate if($prow == -1) { $prow = $j; } else { # Test to see if this is an improvement if($fracmode ? ($m[$prow][$ncols]->scalar())/($m[$prow][$pcol]->scalar()) > ($m[$j][$ncols]->scalar()/$m[$j][$pcol]->scalar()) : ($m[$prow][$ncols]/$m[$prow][$pcol] > $m[$j][$ncols]/$m[$j][$pcol])) { $prow = $j; } } } } return ($prow, $pcol); } =head2 lp_solve Take a tableau, and perform simplex method pivoting until done. The tableau can be any matrix in the form reference to array of arrays, such as [[1,2,3],[4,5,6]], which represents a linear programming tableau at a feasible point. Options are specified in key/value pairs. pivot_limit=> 10 (limit the number of pivots to at most 10 - default is 100) fraction_mode=> 1 (entries are of type Fraction - defaults to 0, i.e., false) This function is destructive - it changes the values of its matrix rather than making a copy. It returns a triple of the final tableau, an endcode indicating the type of result, and the number of pivots used. The endcodes are 1 for success, 0 for unbounded. Example: $m = [[0, 3, -4, 5, 1, 0, 0, 28], [0, 2, 0, 1, 0, 1, 0, 11], [0, 1, 2, 3, 0, 0, 1, 3], [1, -1, 2, -3, 0, 0, 0, 0]]; ($m, $endcode, $pivcount) = lp_solve($m, pivot_limit=>200); =cut # Solve a linear programming problem # lp_solve([[1,2,3],[4,5,6]]) # It returns a triple of the final tableau, a code to say if we # succeeded, and the number of pivots sub lp_solve { my $a_ref_orig = shift; my %opts = @_; set_default_options(\%opts, '_filter_name' => 'lp_solve', 'pivot_limit' => 100, 'fraction_mode' => 0, 'allow_unknown_options'=> 0); my ($pcol, $prow); my $a_ref; # First we clone the matrix so that it isn't modified in place for $prow (1..scalar(@{$a_ref_orig})) { for $pcol (1..scalar(@{$a_ref_orig->[0]})) { $a_ref->[$prow-1][$pcol-1] = $a_ref_orig->[$prow-1][$pcol-1]; } } my $piv_count = 0; my $piv_limit = $opts{'pivot_limit'}; # Just in case of cycling or bugs my $fracmode = $opts{'fraction_mode'}; # First do alternate pivoting # Now do regular pivots do { ($prow, $pcol) = lp_pivot_element($a_ref, $fracmode); if($prow>=0) { $a_ref = lp_pivot($a_ref, $prow, $pcol, $fracmode); $piv_count++; } } until($prow<0 or $piv_count>=$piv_limit); # code is 1 for success, 0 for unbounded my $endcode = 1; $endcode = 0 if ($pcol>=0); return($a_ref, $endcode, $piv_count); } =head2 lp_current_value Takes a simplex tableau and returns the value of a particular variable. Variables are associated to column numbers which are indexed starting with 0. So, usually this means that the objective function is 0, x_1 is 1, and so on. This can be used for slack variables too (assuming you know what columns they are in). =cut # Get the current value of a variable from a tableau # The variable is specified by column number, with 0 for P, 1 for x_1, # and so on sub lp_current_value { my $col = shift; my $aref = shift; my $fractionmode = 0; $fractionmode =1 if(ref($aref->[0][0]) eq 'Fraction'); # Count how many ones there are. If we hit non-zero/non-one, force count # to fail my ($cnt,$row,$save) = (0,'',0); for $row (@{$aref}) { if($fractionmode) { if($row->[$col]->scalar() != 0) { $cnt += ($row->[$col]->scalar() == 1) ? 1 : 2; $save = $row; } } else { if($row->[$col] != 0) { $cnt += ($row->[$col] == 1) ? 1 : 2; $save = $row; } } } if($cnt != 1) { return ($fractionmode ? new Fraction(0) : 0); } $cnt = scalar(@{$save}); return $save->[$cnt-1]; } =head2 lp_display_mm Display a simplex tableau while in math mode. $m = [[0, 3, -4, 5, 1, 0, 0, 28], [0, 2, 0, 1, 0, 1, 0, 11], [0, 1, 2, 3, 0, 0, 1, 3], [1, -1, 2, -3, 0, 0, 0, 0]]; \[ \{ lp_display_mm($m) \} \] Accepts the same optional arguments as lp_display (see below), and produces nicer looking results. However, it cannot have answer rules in the tableau (lp_display can have them for fill in the blank tableaus). =cut # Display a tableau in math mode sub lp_display_mm { lp_display(@_, force_tex=>1); } # Make a copy of a tableau sub lp_clone { my $a1_ref = shift; my $a_ref = []; # make a copy to modify my $nrows = scalar(@{$a1_ref})-1; # really 1 less my ($j, $k); for $j (0..$nrows) { if($a1_ref->[$j] eq 'hline') { $a_ref->[$j] = 'hline'; } else { for $k (0..(scalar(@{$a1_ref->[$j]}) -1)) { $a_ref->[$j][$k] = $a1_ref->[$j][$k]; } } } return($a_ref); } =head2 lp_display Display a simplex tableau while not in math mode. $m = [[0, 3, -4, 5, 1, 0, 0, 28], [0, 2, 0, 1, 0, 1, 0, 11], [0, 1, 2, 3, 0, 0, 1, 3], [1, -1, 2, -3, 0, 0, 0, 0]]; \{ lp_display($m)\} Takes the same optional arguments as display_matrix. The default for column alignment as "augmentation line" before the last column. It also adds a horizontal line before the last row if it is not already specified. =cut # Display a tableau sub lp_display { my $a1_ref = shift; my %opts = @_; my $nrows = scalar(@{$a1_ref})-1; # really 1 less my $ncols = scalar(@{$a1_ref->[0]}) -1; # really 1 less if(not defined($opts{'align'})) { my $align = "r" x $ncols; $align .= "|r"; $opts{'align'} = $align; } my $a_ref = lp_clone($a1_ref); if($a_ref->[$nrows-1] ne 'hline') { $a_ref->[$nrows+1] = $a_ref->[$nrows]; $a_ref->[$nrows] = 'hline'; } display_matrix($a_ref, %opts); } # return 1 so that this file can be included with require 1