Author
Listed:
- Maria Qurban
- Mohammed M. A. Almazah
- Hafiza Mamona Nazir
- Ijaz Hussain
- Muhammad Ismail
- Faud S. Al-Duais
- Sana Amjad
- Mohammed N. Murshed
- Firdous Khan
Abstract
The production data of mineral resources are noisy, nonstationary, and nonlinear. Therefore, some techniques are required to address the problem of nonstationarity and complexity of noises in it. In this paper, two hybrid models (EMD-CEEMDAN-EBT-MM and WA-CEEMDAN-EBT-MM) flourish to improve mineral production prediction. First, we use empirical mode decomposition (EMD) and wavelet analysis (WA) to denoise the data. Second, ensemble empirical mode decomposition (EEMD) and complete ensemble empirical mode decomposition (CEEMDAN) are used for the decomposition of nonstationary data into intrinsic mode function (IMF). Then, empirical Bayesian threshold (EBT) is applied on noise dominant IMFs to consolidate noises, which are further used as input in the data-driven model. Next, other noise-free IMFs are used in the stochastic model as input for the prediction of minerals. At last, the predicted IMFs are ensemble for final prediction. The proposed strategy is exemplified using Pakistan's four major mineral resources. To measure the prediction performance of all the models, three methods, that is, mean relative error, mean square error, and mean absolute percentage error, are used. Our proposed framework WA-CEEMDAN-EBT-MM has shown improvement with minimum mean absolute percentage error value compared to other existing models in prediction accuracy for all four minerals. Therefore, our proposed strategy can predict the noisy and nonstationary time-series data with an efficient mechanism. Hence, it will be helpful to the policymakers for making policies and planning in mineral resource management.
Suggested Citation
Maria Qurban & Mohammed M. A. Almazah & Hafiza Mamona Nazir & Ijaz Hussain & Muhammad Ismail & Faud S. Al-Duais & Sana Amjad & Mohammed N. Murshed & Firdous Khan, 2022.
"Improvement towards Prediction Accuracy of Principle Mineral Resources Using Threshold,"
Mathematical Problems in Engineering, Hindawi, vol. 2022, pages 1-18, March.
Handle:
RePEc:hin:jnlmpe:5991311
DOI: 10.1155/2022/5991311
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