I have a PLS analysis involving two items (from 7 point Likert-type scales) with negative skewness (-1.321, -1.029) and the same two items have positive kurtosis (1.490, 1.201).
In https://www.smartpls.com/documentation/ ... s-sem-book, mention is made that the limits are +/- 1. I have heard that PLS works with values up to +/- 2.2 but can't find any formal cites.
Given that SmartPLS touts working with nonnormally distributed data, what is the limit? ... and the formal cites for that limit? If SmartPLS doesn't work with the items mentioned above, how do I transform the values?
* Log10 transformation won't work for Likert-type scores
Skewness/Kurtosis
- cringle
- SmartPLS Developer
- Posts: 818
- Joined: Tue Sep 20, 2005 9:13 am
- Real name and title: Prof. Dr. Christian M. Ringle
- Location: Hamburg (Germany)
- Contact:
Re: Skewness/Kurtosis
These descriptive statistics in SmartPLS give you the info if your data is normal or not. PLS-SEM is well-know to provide robust results when data is non-normal (as in your case). However, you may be cautious to some extent as explained in the section on distributional assumptions in this article on PLS-SEM: https://www.researchgate.net/publicatio ... n_Modeling
Best
Christian
Best
Christian
Prof. Dr. Christian M. Ringle, Hamburg University of Technology (TUHH), SmartPLS
- Literature on PLS-SEM: https://www.smartpls.com/documentation
- Google Scholar: https://scholar.google.de/citations?use ... AAAJ&hl=de
- Literature on PLS-SEM: https://www.smartpls.com/documentation
- Google Scholar: https://scholar.google.de/citations?use ... AAAJ&hl=de
Re: Skewness/Kurtosis
I'm interested in this topic, too. I have a PLS SEM model with Likert-type scales and many of my variables are negatively skewed (majority of variables have skewness and kurtosis >|1|, one has skewness>|2|). I chose PLS because of the explorative nature of my study and my main objective which is predicting and finding influences on one target variable.
Nevertheless, I wonder if the skewness is a problem in this case, as the above cited chapter and the Hair et al. (2017) book still keep saying that skewness and kurtosis below |1| are not critical - what if my data are more skewed?
Thank you in advance,
Lisa
Nevertheless, I wonder if the skewness is a problem in this case, as the above cited chapter and the Hair et al. (2017) book still keep saying that skewness and kurtosis below |1| are not critical - what if my data are more skewed?
Thank you in advance,
Lisa