{overleaf skabelonsgalleri}LaTeX templates — Recent

This is a generic template for a law review article. It is modeled after the Word law review article template that Eugene Volokh created. This template, in addition to converting the coding from Word to LaTeX, adds some features. It includes the option of having multiple authors, using a table of contents, and including an abstract. The code indicates how to modify the template for an article with multiple authors and how to remove the table of contents, the abstract, or both. While there have been a few attempts to create a package that will automatically format citations using the Bluebook style, they have not gone very far or been very successful. So, you are left on your own. I have given examples in the text of how to use LaTeX codes to achieve the Bluebook style, which may help guide you. These should help you with most of the typesetting styles you need, and you can use the Bluebook to determine the particular requirements for a cite.

An Unofficial TAMU ISEN Poster Template based on uchicago-poster

A1 size poster template

An unofficial poster template for Michigan State University. This project is a fork of Tao Li's NYU template, which is a fork of Anish Athalye's Gemini poster theme.

山中 卓 (大阪大学 大学院理学研究科 物理学専攻)先生が作成された科研費LaTeXを、坂東 慶太 (名古屋学院大学) が了承を得てテンプレート登録しています。 詳細はこちら↓をご確認ください。 http://osksn2.hep.sci.osaka-u.ac.jp/~taku/kakenhiLaTeX/

Exam form template for Nanyang Technological University's School of Electrical & Electronic Engineering (21 Aug 2006). The \marks macro was renamed to \Qmarks in this template on Overleaf for correct compilation in recent LaTeX distributions. Downloaded from https://ntulearn.ntu.edu.sg/bbcswebdav/users/ekvling/Public/latex/index.html

One of the acceptable templates for writing a physics comps paper at Carleton College. This template is part of an internal wiki page for students at Carleton College.

LaTeX template for EECE Undergraduates at University of Pretoria

This is the template for DAM (discrete and argumentative mathematics). We prove theorem $2.1$ using the method of proof by way of contradiction. This theorem states that for any set $A$, that in fact the empty set is a subset of $A$, that is $\emptyset \subset A$.