# Longtable not working with Stargazer Table

I am trying to make a table span many pages. Here is my code:

\begin{table}[!htbp] \centering
\caption{Results for Living Standard Indicators}
\label{}
\begin{tabular}{@{\extracolsep{5pt}}lccc}
\\[-1.8ex]\hline
\hline \\[-1.8ex]
& \multicolumn{3}{c}{\textit{Dependent variable:}} \\
\cline{2-4}
\\[-1.8ex] & $K_{i,t}$ & $H_{i,t}$ & $I_{i,t}$ \\
& Physical Capital & Human Capital & Institutional Capital \\
\\[-1.8ex] & (1) & (2) & (3)\\
\hline \\[-1.8ex]
$R_{i}$ & $-$0.10$^{***}$ & $-$0.05 & 0.08 \\
& (0.02) & (0.04) & (0.08) \\
& & & \\
$R_{i}$*$Y_{i,t}$^{2}$&$-$0.002 &$-$0.01$^{**}$&$-$0.01 \\ & (0.002) & (0.004) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}$& 0.13$^{*}$& 0.69$^{***}$& 0.22 \\ & (0.07) & (0.18) & (0.42) \\ & & & \\$R_{i}$*$NR_{i}$&$-$0.50$^{***}$& 0.18 &$-$0.98$^{*}$\\ & (0.09) & (0.23) & (0.56) \\ & & & \\$R_{i}$*$D_{i}$& 0.01 & 0.05 & 0.11 \\ & (0.02) & (0.04) & (0.08) \\ & & & \\$R_{i}$*$L_{i}$& 0.0004 &$-$0.05 &$-$0.23$^{***}$\\ & (0.01) & (0.03) & (0.06) \\ & & & \\$R_{i}$*$V_{i}$& 0.02$^{**}$&$-$0.06$^{*}$&$-$0.12$^{***}$\\ & (0.01) & (0.03) & (0.04) \\ & & & \\$R_{i}$*$C_{i}$& 0.03$^{**}$&$-$0.08$^{**}$&$-$0.17$^{**}$\\ & (0.01) & (0.04) & (0.07) \\ & & & \\$R_{i}$*$M_{i}$&$-$0.01 &$-$0.04$^{**}$& 0.09$^{***}$\\ & (0.01) & (0.02) & (0.03) \\ & & & \\$R_{i}$*$S_{i}$& 0.04$^{***}$& 0.23$^{***}$& 0.19$^{**}$\\ & (0.02) & (0.04) & (0.08) \\ & & & \\$R_{i}$*$Dem_{i}$& 0.05$^{***}$& 0.07$^{***}$& 0.07 \\ & (0.02) & (0.02) & (0.05) \\ & & & \\$R_{i}$*$Right_{i}$&$-$0.02 &$-$0.03 &$-$0.20$^{*}$\\ & (0.02) & (0.05) & (0.10) \\ & & & \\$R_{i}$*$Left_{i} & 0.02 & $-$0.03 & $-$0.08 \\
& (0.01) & (0.05) & (0.07) \\
& & & \\
$R_{i}$*$Y_{i,t}$*$L_{i}$ & $-$0.01 & $-$0.37$^{*}$ & $-$0.52 \\
& (0.07) & (0.19) & (0.37) \\
& & & \\
$R_{i}$*$Y_{i,t}$*$V_{i}$ & 0.001 & 0.51$^{***}$ & 0.18 \\
& (0.05) & (0.12) & (0.22) \\
& & & \\
$R_{i}$*$Y_{i,t}$*$C_{i}$ & $-$0.08 & $-$0.33$^{**}$ & $-$0.80$^{**}$ \\
& (0.06) & (0.16) & (0.36) \\
& & & \\
$R_{i}$*$Y_{i,t}$*$M_{i}$ & $-$0.01 & $-$0.17$^{**}$ & 0.14 \\
& (0.03) & (0.08) & (0.16) \\
& & & \\
$R_{i}$*$Y_{i,t}$*$S_{i}$ & $-$0.01 & $-$0.86$^{***}$ & 0.87$^{**}$ \\
& (0.08) & (0.20) & (0.42) \\
& & & \\
$R_{i}$*$Y_{i,t}$*$Dem_{i} & 0.10$^{*}$&$-$0.14 & 0.07 \\ & (0.05) & (0.09) & (0.27) \\ & & & \\$R_{i}$*$Y_{i,t}$*$Left_{i}$& 0.02 &$-$0.67$^{***}$& 0.31 \\ & (0.05) & (0.20) & (0.29) \\ & & & \\$R_{i}$*$Y_{i,t}$*$Right_{i}$& 0.15$^{*}$& 0.39 & 0.11 \\ & (0.08) & (0.24) & (0.53) \\ & & & \\$R_{i}$*$Y_{i,t}$*$D_{i}$&$-$0.29$^{***}$&$-$0.35$^{**}$& 0.59$^{*}$\\ & (0.07) & (0.16) & (0.32) \\ & & & \\$R_{i}$*$Y_{i,t}$*$NR_{i}$& 0.56 & 0.83 & 1.05 \\ & (0.39) & (1.15) & (2.35) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$L_{i}$&$-$0.002 & 0.003 &$-$0.02$^{*}$\\ & (0.002) & (0.005) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$V_{i}$&$-$0.0001 &$-$0.004$^{*}$& 0.004 \\ & (0.001) & (0.002) & (0.004) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$C_{i}$& 0.003$^{**}$& 0.01$^{*}$& 0.01$^{*}$\\ & (0.001) & (0.003) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$M_{i}$&$-$0.001 & 0.003$^{*}$&$-$0.001 \\ & (0.001) & (0.002) & (0.004) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$S_{i}$&$-$0.0005 & 0.01$^{***}$&$-$0.01$^{**}$\\ & (0.002) & (0.003) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$Dem_{i}$&$-$0.001 & 0.001 & 0.01 \\ & (0.001) & (0.002) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$D_{i}$& 0.001 & 0.01 &$-$0.01 \\ & (0.002) & (0.004) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$NR_{i}$&$-$0.01 &$-$0.004 & 0.02 \\ & (0.01) & (0.04) & (0.08) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$Left_{i}$& 0.004$^{**}$& 0.01$^{**}$& 0.02$^{***}$\\ & (0.001) & (0.005) & (0.01) \\ & & & \\$R_{i}$*$Y_{i,t}^{2}$*$Right_{i}$&$-$0.0003 &$-$0.003 & 0.01 \\ & (0.001) & (0.003) & (0.01) \\ & & & \\ Constant & 0.05$^{***}$& 0.22$^{***}$& 0.42$^{***}$\\ & (0.01) & (0.03) & (0.05) \\ & & & \\ \hline \\[-1.8ex] F Statistic & 20.67*** & 84.70*** & 39.09*** \\ Observations & 1,053 & 1,053 & 1,053 \\ R$^{2}$& 0.28 & 0.56 & 0.44 \\ Adjusted R$^{2}$& 0.25 & 0.54 & 0.42 \\ Residual Std. Error (df = 1002) & 0.08 & 0.16 & 0.26 \\ \hline \hline \\[-1.8ex] \textit{Note:} & \multicolumn{3}{r}{$^{*}$p$<$0.1;$^{**}$p$<$0.05;$^{***}$p$<$0.01} \\ \end{tabular} \end{table}  I have tried to incorporate longtable, but it does not work for me. The table was created using the stargazer package in R-Studio, and then imported into Overleaf. Has anyone run into a similar problem? Is this a stargazer limitation and if so how would I overcome this? Thanks in advance! • Welcome to TeX.SE! Aug 10, 2021 at 22:18 • If you want a longtable, remove the table environment (a longtable is not a float) and replace tabular with longtable, keeping the same preamble. Also, note that in a longtable, the caption is incorporated to the environment, and you have to define the longtable head, firsthead, foot and lastfoot. Last \centering is not necessary – it's automatic. You'll see details and examples in the documentation. Aug 10, 2021 at 23:17 • Thank you! It worked Aug 12, 2021 at 16:00 ## 1 Answer Here's an adaptation of your code that employs a longtable environment. Observe that I had to fix a number of issues with your code in addition to changing over from a table/tabular combination to a longtable. Among them are a replacement of all instances of $*$ with \times and a replacement of all instances of  & & & \\ with \addlinespace, a macro provided by the booktabs package. The following screenshot shows just the first few rows of the resulting table. \documentclass{article} \usepackage{longtable,booktabs} \newcommand{\vn}[1]{\mathit{#1}} \begin{document} \begin{longtable}{@{} l ccc @{}} \caption{Results for Living Standard Indicators} \label{tab:results}\\ \toprule & \multicolumn{3}{c}{Dependent variables} \\ \cmidrule(l){2-4} &$K_{i,t}$&$H_{i,t}$&$I_{i,t}$\\ & Physical Capital & Human Capital & Instit.\ Capital \\ & (1) & (2) & (3) \\ \midrule \endfirsthead \multicolumn{4}{@{}l}{Table \thetable, continued}\\ \addlinespace \toprule & \multicolumn{3}{c}{Dependent variables} \\ \cmidrule(l){2-4} &$K_{i,t}$&$H_{i,t}$&$I_{i,t}$\\ & Physical Capital & Human Capital & Instit.\ Capital \\ & (1) & (2) & (3) \\ \midrule \endhead \midrule \endfoot \bottomrule \addlinespace \multicolumn{4}{@{}l}{\textit{Note}:$^{*}\ p<0.1$;$^{**}\ p<0.05$;$^{***}\ p<0.01$} \endlastfoot$R_{i}$&$-$0.10$^{***}$&$-$0.05 & 0.08 \\ & (0.02) & (0.04) & (0.08) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}$&$-$0.002 &$-$0.01$^{**}$&$-$0.01 \\ & (0.002) & (0.004) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}$& 0.13$^{*}$& 0.69$^{***}$& 0.22 \\ & (0.07) & (0.18) & (0.42) \\ \addlinespace$R_{i}\times \vn{NR}_{i}$&$-$0.50$^{***}$& 0.18 &$-$0.98$^{*}$\\ & (0.09) & (0.23) & (0.56) \\ \addlinespace$R_{i}\times D_{i}$& 0.01 & 0.05 & 0.11 \\ & (0.02) & (0.04) & (0.08) \\ \addlinespace$R_{i}\times L_{i}$& 0.0004 &$-$0.05 &$-$0.23$^{***}$\\ & (0.01) & (0.03) & (0.06) \\ \addlinespace$R_{i}\times V_{i}$& 0.02$^{**}$&$-$0.06$^{*}$&$-$0.12$^{***}$\\ & (0.01) & (0.03) & (0.04) \\ \addlinespace$R_{i}\times C_{i}$& 0.03$^{**}$&$-$0.08$^{**}$&$-$0.17$^{**}$\\ & (0.01) & (0.04) & (0.07) \\ \addlinespace$R_{i}\times M_{i}$&$-$0.01 &$-$0.04$^{**}$& 0.09$^{***}$\\ & (0.01) & (0.02) & (0.03) \\ \addlinespace$R_{i}\times S_{i}$& 0.04$^{***}$& 0.23$^{***}$& 0.19$^{**}$\\ & (0.02) & (0.04) & (0.08) \\ \addlinespace$R_{i}\times \vn{Dem}_{i}$& 0.05$^{***}$& 0.07$^{***}$& 0.07 \\ & (0.02) & (0.02) & (0.05) \\ \addlinespace$R_{i}\times \vn{Right}_{i}$&$-$0.02 &$-$0.03 &$-$0.20$^{*}$\\ & (0.02) & (0.05) & (0.10) \\ \addlinespace$R_{i}\times \vn{Left}_{i}$& 0.02 &$-$0.03 &$-$0.08 \\ & (0.01) & (0.05) & (0.07) \\ \addlinespace$R_{i}\times Y_{i,t}\times L_{i}$&$-$0.01 &$-$0.37$^{*}$&$-$0.52 \\ & (0.07) & (0.19) & (0.37) \\ \addlinespace$R_{i}\times Y_{i,t}\times V_{i}$& 0.001 & 0.51$^{***}$& 0.18 \\ & (0.05) & (0.12) & (0.22) \\ \addlinespace$R_{i}\times Y_{i,t}\times C_{i}$&$-$0.08 &$-$0.33$^{**}$&$-$0.80$^{**}$\\ & (0.06) & (0.16) & (0.36) \\ \addlinespace$R_{i}\times Y_{i,t}\times M_{i}$&$-$0.01 &$-$0.17$^{**}$& 0.14 \\ & (0.03) & (0.08) & (0.16) \\ \addlinespace$R_{i}\times Y_{i,t}\times S_{i}$&$-$0.01 &$-$0.86$^{***}$& 0.87$^{**}$\\ & (0.08) & (0.20) & (0.42) \\ \addlinespace$R_{i}\times Y_{i,t}\times \vn{Dem}_{i}$& 0.10$^{*}$&$-$0.14 & 0.07 \\ & (0.05) & (0.09) & (0.27) \\ \addlinespace$R_{i}\times Y_{i,t}\times \vn{Left}_{i}$& 0.02 &$-$0.67$^{***}$& 0.31 \\ & (0.05) & (0.20) & (0.29) \\ \addlinespace$R_{i}\times Y_{i,t}\times \vn{Right}_{i}$& 0.15$^{*}$& 0.39 & 0.11 \\ & (0.08) & (0.24) & (0.53) \\ \addlinespace$R_{i}\times Y_{i,t}\times D_{i}$&$-$0.29$^{***}$&$-$0.35$^{**}$& 0.59$^{*}$\\ & (0.07) & (0.16) & (0.32) \\ \addlinespace$R_{i}\times Y_{i,t}\times \vn{NR}_{i}$& 0.56 & 0.83 & 1.05 \\ & (0.39) & (1.15) & (2.35) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times L_{i}$&$-$0.002 & 0.003 &$-$0.02$^{*}$\\ & (0.002) & (0.005) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times V_{i}$&$-$0.0001 &$-$0.004$^{*}$& 0.004 \\ & (0.001) & (0.002) & (0.004) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times C_{i}$& 0.003$^{**}$& 0.01$^{*}$& 0.01$^{*}$\\ & (0.001) & (0.003) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times M_{i}$&$-$0.001 & 0.003$^{*}$&$-$0.001 \\ & (0.001) & (0.002) & (0.004) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times S_{i}$&$-$0.0005 & 0.01$^{***}$&$-$0.01$^{**}$\\ & (0.002) & (0.003) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times \vn{Dem}_{i}$&$-$0.001 & 0.001 & 0.01 \\ & (0.001) & (0.002) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times D_{i}$& 0.001 & 0.01 &$-$0.01 \\ & (0.002) & (0.004) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times \vn{NR}_{i}$&$-$0.01 &$-$0.004 & 0.02 \\ & (0.01) & (0.04) & (0.08) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times \vn{Left}_{i}$& 0.004$^{**}$& 0.01$^{**}$& 0.02$^{***}$\\ & (0.001) & (0.005) & (0.01) \\ \addlinespace$R_{i}\times Y_{i,t}^{2}\times \vn{Right}_{i}$&$-$0.0003 &$-$0.003 & 0.01 \\ & (0.001) & (0.003) & (0.01) \\ \addlinespace Constant & 0.05$^{***}$& 0.22$^{***}$& 0.42$^{***}$\\ & (0.01) & (0.03) & (0.05) \\ \midrule$F$-Statistic & 20.67$^{***}$& 84.70$^{***}$& 39.09$^{***}$\\ Observations & 1,053 & 1,053 & 1,053 \\$R^{2}$& 0.28 & 0.56 & 0.44 \\ Adjusted$R^{2}$& 0.25 & 0.54 & 0.42 \\ Res.\ Std.\ Error & 0.08 & 0.16 & 0.26 \\ \quad ($\vn{df} = 1{,}002\$)
\end{longtable}
\end{document}

• Thank you! It worked Aug 12, 2021 at 16:00
• @StudentInNeed - You're most welcome. If you feel that my answer fully addressed your question, please feel free to click on the green check-mark. ;-)
– Mico
Aug 12, 2021 at 18:04