Analytical Approach for Linear Programming Using Barrier and Penalty Function Methods
In order to solve the primal linear programming problems (and its dual) some methods have been used such as simplex method, geometric approach and interior points methods. None of these methods used Lagrangian function as a tool to solve the problem. This raises a question why are we not using t...
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| Main Author: | |
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| Format: | Thesis |
| Language: | English English |
| Published: |
2003
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| Subjects: | |
| Online Access: | http://psasir.upm.edu.my/id/eprint/9577/1/FSAS_2003_35.pdf http://psasir.upm.edu.my/id/eprint/9577/ |
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| Summary: | In order to solve the primal linear programming problems (and its
dual) some methods have been used such as simplex method,
geometric approach and interior points methods. None of these
methods used Lagrangian function as a tool to solve the problem.
This raises a question why are we not using this to solve the linear
programming problems. Thus, in this research we study and
analyze how the behavior and performance of barrier functions and
penalty functions methods for solving the linear programming
problems. All of these functions are in Lagrangian form.
With logarithmic barrier function methods we introduce three
types of function; that is, primal logarithmic, dual logarithmic and primal-dual logarithmic functions. There are two mam results
obtained from the logarithmic function method. First, we prove
that for every value of the barrier parameter, the logarithmic
barrier function for the problem has a unique minimizer; and then
if the sequence of the values of barrier parameters tends to zero,
then the sequence of the minimizers converges to a minimizer of
the problem. From these properties, we construct an algorithm for
solving the problem using the logarithmic barrier function
methods. Second, we give the equivalences between the interior
points set, the primal logarithmic barrier function, the dual
logarithmic barrier function, the primal-dual logarithmic barrier
function and the system of linear equations associated with these
functions. |
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