{"title":"Time Series Analysis — Analysis and Prediction of Monthly Mean Temperature in Baotou City","authors":"L. Gong","doi":"10.56397/ist.2023.07.05","DOIUrl":null,"url":null,"abstract":"This paper analyzes the monthly average temperature of Baotou City from January 1, 1973, to December 31, 2022. The data comes from the R language worldmet dataset, with 600 data. Observing the time series chart shows the data have obvious periodicity and seasonality, and there is no trend. The order ARIMA(1,0,1) s determined by observing the ACF and PACF diagrams, but since there is a trend term of AR, a difference is added to get P=1, D =1, Q=1. By comparing the AIC, BIC and σ^2 values of ARIMA(1,0,1) and ARIMA(1,0,1) , the residual analysis diagrams are observed. The residual analysis diagrams are not very different, which reflects that the residual is white noise. The AIC, BIC and σ^2 values of the former are all smaller than those of the latter, so the time series model is determined as ARIMA(1,0,1) , and the expression is, . Where represents the predicted value at time point t, and represent the original observed value at time point t-1 and t-12, respectively, and and represent the residual term at time point t-1 and t-12, respectively. The model takes into account the seasonality and trend of meteorological data and can fit the data well and make future temperature predictions. After residual analysis and model selection, the prediction effect of this model is good, the error is small, and it can provide a certain reference value. However, there may be shortcomings such as seasonal effects on forecast accuracy, which raises the need to improve models and study more meteorological data features. In general, meteorological data prediction based on time series analysis is an important research field, and more in-depth research and exploration are needed in the future to improve the prediction accuracy and provide better support for decision-making in the field of meteorology and climate.","PeriodicalId":20688,"journal":{"name":"Proceedings of The 6th International Conference on Innovation in Science and Technology","volume":null,"pages":null},"PeriodicalIF":0.0000,"publicationDate":"2023-07-01","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Proceedings of The 6th International Conference on Innovation in Science and Technology","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.56397/ist.2023.07.05","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 0
Abstract
This paper analyzes the monthly average temperature of Baotou City from January 1, 1973, to December 31, 2022. The data comes from the R language worldmet dataset, with 600 data. Observing the time series chart shows the data have obvious periodicity and seasonality, and there is no trend. The order ARIMA(1,0,1) s determined by observing the ACF and PACF diagrams, but since there is a trend term of AR, a difference is added to get P=1, D =1, Q=1. By comparing the AIC, BIC and σ^2 values of ARIMA(1,0,1) and ARIMA(1,0,1) , the residual analysis diagrams are observed. The residual analysis diagrams are not very different, which reflects that the residual is white noise. The AIC, BIC and σ^2 values of the former are all smaller than those of the latter, so the time series model is determined as ARIMA(1,0,1) , and the expression is, . Where represents the predicted value at time point t, and represent the original observed value at time point t-1 and t-12, respectively, and and represent the residual term at time point t-1 and t-12, respectively. The model takes into account the seasonality and trend of meteorological data and can fit the data well and make future temperature predictions. After residual analysis and model selection, the prediction effect of this model is good, the error is small, and it can provide a certain reference value. However, there may be shortcomings such as seasonal effects on forecast accuracy, which raises the need to improve models and study more meteorological data features. In general, meteorological data prediction based on time series analysis is an important research field, and more in-depth research and exploration are needed in the future to improve the prediction accuracy and provide better support for decision-making in the field of meteorology and climate.
本文分析了包头市1973年1月1日至2022年12月31日的月平均气温。数据来自R语言worldmet数据集,包含600个数据。观察时间序列图,数据具有明显的周期性和季节性,不存在趋势。顺序ARIMA(1,0,1)是通过观察ACF和PACF图确定的,但由于存在AR的趋势项,因此添加一个差值以得到P=1, D =1, Q=1。通过比较ARIMA(1,0,1)和ARIMA(1,0,1)的AIC、BIC和σ^2值,得到残差分析图。残差分析图相差不大,反映残差为白噪声。前者的AIC、BIC和σ^2值均小于后者,因此确定时间序列模型为ARIMA(1,0,1),表达式为,。式中为时间点t的预测值,和分别为时间点t-1和t-12的原始观测值,和分别为时间点t-1和t-12的残差项。该模型考虑了气象资料的季节性和趋势,能很好地拟合气象资料,并能对未来气温进行预测。经过残差分析和模型选择,该模型预测效果好,误差小,可以提供一定的参考价值。然而,也可能存在诸如季节影响预报精度等缺点,这就提出了改进模式和研究更多气象数据特征的需要。总的来说,基于时间序列分析的气象数据预测是一个重要的研究领域,未来需要进行更深入的研究和探索,以提高预测精度,更好地为气象气候领域的决策提供支持。