get_fixed_rowsum_integer_matrix: Determine the division points on the hyperplane
In rmoo: Multi-Objective Optimization in R
View source: R/get_fixed_rowsum_integer_matrix.R
get_fixed_rowsum_integer_matrix R Documentation
Determine the division points on the hyperplane
Description
Implementation of the recursive function in Generation of Reference points of
Das and Dennis..
Usage
get_fixed_rowsum_integer_matrix(m, h)
Arguments
m, h
Number of reference points 'h' in M-objective problems
Details
The implemented Reference Point Generation is based on the Das and Dennis's
systematic approach that places points on a normalized hyper-plane which is
equally inclined to all objective axes and has an intercept of one on each
axis.
Value
A matrix with the reference points uniformly distributed.
Author(s)
Francisco Benitez
benitezfj94@gmail.com
References
K. Deb and H. Jain, 'An Evolutionary Many-Objective Optimization
Algorithm Using Reference-Point-Based Nondominated Sorting Approach, Part I:
Solving Problems With Box Constraints,' in IEEE Transactions on Evolutionary
Computation, vol. 18, no. 4, pp. 577-601, Aug. 2014,
doi: 10.1109/TEVC.2013.2281535.
Das, Indraneel & Dennis, J.. (2000). Normal-Boundary Intersection: A New
Method for Generating the Pareto Surface in Nonlinear Multicriteria
Optimization Problems. SIAM Journal on Optimization. 8.
10.1137/S1052623496307510.
See Also
non_dominated_fronts() and generate_reference_points()
rmoo documentation built on Sept. 24, 2022, 9:05 a.m.
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View source: R/get_fixed_rowsum_integer_matrix.R
| get_fixed_rowsum_integer_matrix | R Documentation |
Determine the division points on the hyperplane
Description
Implementation of the recursive function in Generation of Reference points of Das and Dennis..
Usage
get_fixed_rowsum_integer_matrix(m, h)
Arguments
m, h |
Number of reference points 'h' in M-objective problems |
Details
The implemented Reference Point Generation is based on the Das and Dennis's systematic approach that places points on a normalized hyper-plane which is equally inclined to all objective axes and has an intercept of one on each axis.
Value
A matrix with the reference points uniformly distributed.
Author(s)
Francisco Benitez benitezfj94@gmail.com
References
K. Deb and H. Jain, 'An Evolutionary Many-Objective Optimization Algorithm Using Reference-Point-Based Nondominated Sorting Approach, Part I: Solving Problems With Box Constraints,' in IEEE Transactions on Evolutionary Computation, vol. 18, no. 4, pp. 577-601, Aug. 2014, doi: 10.1109/TEVC.2013.2281535.
Das, Indraneel & Dennis, J.. (2000). Normal-Boundary Intersection: A New Method for Generating the Pareto Surface in Nonlinear Multicriteria Optimization Problems. SIAM Journal on Optimization. 8. 10.1137/S1052623496307510.
See Also
non_dominated_fronts() and generate_reference_points()
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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