Author(s)

Zuolin Wang ¹, Zhanwei Yin ¹, Wenshuo Ni ¹

Affiliation(s)

¹ Department of Shandong University of science and technology, Shandong, China

Corresponding Author

Zuolin Wang

ABSTRACT

Based on the equation of furnace temperature curve, the objective function is established by integral, and then the constraint condition is established according to the process boundary. Wavelet transform algorithm to finally, finally the optimum furnace temperature curve, can draw 185 DHS C (small temperature range 1 ~ 5), 208 DHS C (small temperature zone 6), 240 DHS C (temperature range of small 7), 252 DHS C (temperature range of small 8 ~ 9), the corresponding area of 968.24 cm2, again USES the wavelet transform algorithm, and the function such as secondary derivative method, first to second derivative of furnace temperature curve function, make the secondary derived function is obtained through origin of coordinates. Then the constraint conditions and objective function were established. Finally, when the optimal furnace temperature curve was reached, 183°C (small temperature range 1~5), 205°C (small temperature range 6), 241°C (small temperature range 7) and 253°C (small temperature range 8~9), the corresponding area was 1096.38cm2.

KEYWORDS

Nonlinear programming, Wavelet transform algorithm

CITE THIS PAPER

Zuolin Wang, Zhanwei Yin, Wenshuo Ni, Study on optimal temperature furnace curve based on wavelet transform algorithm. Computing, Performance and Communication Systems (2021) Vol. 5: 1-4. DOI: http://dx.doi.org/10.23977/cpcs.2021.51001

REFERENCES

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[3] Yu Shengwei. Matlab Mathematical Modeling Classical Case Practice [M]. Beijing: Tsinghua University Press, 2015:201-209.
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