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Unlocking the potential of LSTM for accurate salary prediction with MLE, Jeffreys prior, and advanced risk functions.
- Source :
-
PeerJ. Computer science [PeerJ Comput Sci] 2024 Feb 22; Vol. 10, pp. e1875. Date of Electronic Publication: 2024 Feb 22 (Print Publication: 2024). - Publication Year :
- 2024
-
Abstract
- This article aims to address the challenge of predicting the salaries of college graduates, a subject of significant practical value in the fields of human resources and career planning. Traditional prediction models often overlook diverse influencing factors and complex data distributions, limiting the accuracy and reliability of their predictions. Against this backdrop, we propose a novel prediction model that integrates maximum likelihood estimation (MLE), Jeffreys priors, Kullback-Leibler risk function, and Gaussian mixture models to optimize LSTM models in deep learning. Compared to existing research, our approach has multiple innovations: First, we successfully improve the model's predictive accuracy through the use of MLE. Second, we reduce the model's complexity and enhance its interpretability by applying Jeffreys priors. Lastly, we employ the Kullback-Leibler risk function for model selection and optimization, while the Gaussian mixture models further refine the capture of complex characteristics of salary distribution. To validate the effectiveness and robustness of our model, we conducted experiments on two different datasets. The results show significant improvements in prediction accuracy, model complexity, and risk performance. This study not only provides an efficient and reliable tool for predicting the salaries of college graduates but also offers robust theoretical and empirical foundations for future research in this field.<br />Competing Interests: The authors declare that they have no competing interests.<br /> (© 2024 Li et al.)
Details
- Language :
- English
- ISSN :
- 2376-5992
- Volume :
- 10
- Database :
- MEDLINE
- Journal :
- PeerJ. Computer science
- Publication Type :
- Academic Journal
- Accession number :
- 38435555
- Full Text :
- https://doi.org/10.7717/peerj-cs.1875