Means for building of mathematical models of optimization placement problems in the interval spaces
DOI:
https://doi.org/10.15587/2312-8372.2014.34633Keywords:
geometric design, interval geometry, interval mathematical model of optimization problem of placementAbstract
The research is devoted to the development of modern design tools for building of mathematical models of geometric objects and relationships of geometric objects interval spaces and their use in constructing the interval mathematical models of optimization problems of geometric design in interval space. The result of research is the further development of interval geometry theory: three-dimensional and multi-dimensional interval metric spaces introduced new concepts formulated statements that create a new modern design tools for modeling of optimization problems of geometric design, taking into account the errors of initial data. It is building an interval surfaces. Their interval equations are involved in analytical description of the boundaries of the interval object. It is defined an interval geometric objects as mathematical models of geometric objects in Euclidean spaces. Their metric features and placement parameters have errors.
The obtained new science-based development in the theory of geometric design and geometry provide a solution of interval important applied problems of accounting errors in modeling and solving of optimization problems of geometric design. They are a significant achievement for the development of optimal geometric design.References
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