Optimal packing of convex polytopes using quasi-phi-functions
We study a packing problem of a given collection of convex polytopes into a rectangular container of minimal volume. Continuous rotations and translations of polytopes are allowed. In addition a given minimal allowable distances between polytopes are taking into account. We employ radical free quasi...
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| Date: | 2015 |
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| Main Authors: | , , |
| Format: | Article |
| Language: | English |
| Published: |
Інститут енергетичних машин і систем ім. А. М. Підгорного Національної академії наук України
2015
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| Subjects: | |
| Online Access: | https://journals.uran.ua/jme/article/view/46687 |
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| Journal Title: | Energy Technologies & Resource Saving |
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Energy Technologies & Resource Saving| Summary: | We study a packing problem of a given collection of convex polytopes into a rectangular container of minimal volume. Continuous rotations and translations of polytopes are allowed. In addition a given minimal allowable distances between polytopes are taking into account. We employ radical free quasi-phi-functions and adjusted quasi-phi-functions to describe placement constraints. The use of quasi-phi-functions, instead of phi-functions, allows us to simplify non-overlapping, as well as, to describe distance constraints, but there is a price to pay: now the optimization has to be performed over a larger set of parameters, including the extra variables used by our new functions. We provide an exact mathematical model of the problem as a nonlinear programming problem. We also develop an efficient solution algorithm which involves a starting point algorithm, using homothetic trasformations of geometric objects and efficient local optimization procedure, which allows us to runtime and memory). We present here a number of examples to demonstrate the efficiency of our methodology. |
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