纵向数据的调节效应分析

doi:10.3724/SP.J.1042.2022.02461

摘要/Abstract

摘要：

目前调节效应检验主要是基于截面数据, 本文讨论纵向(追踪)数据的调节效应分析。如果自变量X和因变量Y有纵向数据, 调节效应可分为三类：调节变量Z不随时间变化、Z随时间变化、调节变量从自变量或因变量中产生。评介了基于多层模型、多层结构方程模型、交叉滞后模型和潜变量增长模型的纵向数据的多种调节效应分析方法。调节效应的分解和潜调节结构方程法的使用是纵向数据的调节效应分析的两大特点。对基于四类模型的调节效应分析方法进行综合比较后, 总结出一个纵向数据的调节效应分析流程。随后用实际例子演示如何进行纵向数据的调节效应分析, 并给出相应的Mplus程序。随后展望了纵向数据的调节效应分析的拓展方向, 例如基于动态结构方程模型的密集追踪数据的调节效应分析。

关键词: 纵向数据, 调节效应, 多层模型, 多层结构方程模型, 交叉滞后模型, 潜变量增长模型

Abstract:

At present, the analysis of moderating effect is mainly based on cross sectional data. This article discusses how to analyze the moderating effect with longitudinal data. If the independent variable X and the dependent variable Y are longitudinal data, longitudinal moderation models can be divided into three categories according to the type of moderator: time-invariant moderator, time-variant moderator, and moderator generated from X or Y. For example, X_tj is divided into two parts, time-varying intra-individual differences $X_{t j}-\bar{X}_{\bullet} j$ and time-invariant inter-individual differences$\bar{X}_{\boldsymbol{\bullet} j}$, and then the moderating effect of $\bar{X}_{\boldsymbol{\bullet} j}$ on the relationship between $(X_{t j}-\bar{X}_{\bullet} j)$ and Y_tj can be analyzed. In that case, there will be no new moderator Z, which is characteristic of moderation research on longitudinal data in contrast to research on cross-sectional data.

Four types of longitudinal moderation analysis approaches are summarized: 1) Multilevel model (MLM); 2) Multilevel structural equation model (MSEM); 3) Cross-lagged model (CLM); 4) Latent growth model (LGM). It is found that the decomposition of the moderating effect and the use of the latent moderating structural equation (LMS) method are the two characteristics of the moderation analysis for longitudinal data. Specifically, MLM, MSEM, and CLM divide the moderating effect of longitudinal data into three parts: the time-varying intra-individual part, time-invariant inter-individual part, and the cross-level part. In addition, the moderating effect of longitudinal data can be decomposed into the moderating effect of initial level and rate of change by LGM.

In the present study, we propose a procedure to analyze longitudinal mediation analysis. The first step is to decide whether it is necessary to make a causal inference. If the aim of research is to make a causal inference, CLM should be adopted to analyze longitudinal moderation. Otherwise, proceed with the second step. The second step is to decide whether it is necessary to treat longitudinal data as multilevel data. If longitudinal data is treated as multilevel data, MSEM should be adopted to analyze longitudinal moderation, because MSEM and MLM are more suitable for describing individual differences. Otherwise, LGM should be adopted to analyze longitudinal moderation, because only an LGM can simultaneously examine the effect of some variables on change and how the change affects other variables. The third step is to decide whether MSEM converges. If MSEM converges, the result of MSEM should be reported. Otherwise, MLM should be adopted to analyze longitudinal moderation. Compared with MLM, MSEM takes sampling error into account when the group mean is calculated, but the convergence of the MSEM is more difficult. Therefore, the MSEM with sampling error taken into account is preferred. If convergence fails, MLM will be considered.

This paper exemplifies how to conduct the proposed procedure by using Mplus. Directions for future research on moderation analysis of longitudinal data are discussed, such as the moderation analysis for intensive longitudinal data based on the dynamic structural equation model.

Key words: longitudinal data, moderation effect, multilevel model, multilevel structural equation model, cross-lagged model, latent growth model

中图分类号:

B841

方杰, 温忠麟. (2022). 纵向数据的调节效应分析. 心理科学进展 , 30(11), 2461-2472.

FANG Jie, WEN Zhonglin. (2022). Moderation analysis for longitudinal data. Advances in Psychological Science, 30(11), 2461-2472.

图/表 9

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模型	潜变量调节	调节效应的分解	测量次数	做历时性因果推断	用LMS法	耗时
MLM	×	W×W、B×B和B×W调节	≥3	×	×	短
MSEM	√	W×W、B×B和B×W调节	≥3	×	√	长
CLM	√	W×W、B×B和B×W调节	≥2	√	√	长
LGM	√	初始水平调节、变化率调节等	≥3	×	√	长

模型	潜变量调节	调节效应的分解	测量次数	做历时性因果推断	用LMS法	耗时
MLM	×	W×W、B×B和B×W调节	≥3	×	×	短
MSEM	√	W×W、B×B和B×W调节	≥3	×	√	长
CLM	√	W×W、B×B和B×W调节	≥2	√	√	长
LGM	√	初始水平调节、变化率调节等	≥3	×	√	长

参数	γ₀₀	γ₀₁	γ₀₂	γ₁₀	γ₂₀	ε_tj	μ₀_j	μ₁_j
参数估计	1.545	0.445	0.009	0.196	-0.052	0.167	0.057	1.002
标准误	0.015	0.033	0.063	0.041	0.031	0.006	0.007	0.079
可靠区间下限	1.513	0.384	-0.128	0.120	-0.12	0.156	0.042	0.849
可靠区间上限	1.571	0.513	0.119	0.276	0.003	0.178	0.070	1.154

参数	γ₀₀	γ₀₁	γ₀₂	γ₁₀	γ₂₀	ε_tj	μ₀_j	μ₁_j
参数估计	1.545	0.445	0.009	0.196	-0.052	0.167	0.057	1.002
标准误	0.015	0.033	0.063	0.041	0.031	0.006	0.007	0.079
可靠区间下限	1.513	0.384	-0.128	0.120	-0.12	0.156	0.042	0.849
可靠区间上限	1.571	0.513	0.119	0.276	0.003	0.178	0.070	1.154