use latexmk
All checks were successful
Build LaTeX Document / build (push) Successful in 9m54s

This commit is contained in:
lukas-heiligenbrunner 2024-09-30 16:30:34 +02:00
parent 75f5756e07
commit a5494ece51
2 changed files with 8 additions and 7 deletions

View File

@ -19,16 +19,13 @@ jobs:
- name: Install LaTeX - name: Install LaTeX
run: | run: |
sudo apt-get update sudo apt-get update
sudo apt-get install -y texlive-full biber sudo apt-get install -y texlive-full biber latexmk
# Compile the LaTeX document (first pass) # Compile the LaTeX document (first pass)
- name: Compile LaTeX (first pass) - name: Compile LaTeX (first pass)
run: | run: |
cd src cd src
pdflatex -interaction=nonstopmode -halt-on-error -file-line-error main.tex latexmk -pdf -bibtex -interaction=nonstopmode main.tex
bibtex sources
pdflatex -interaction=nonstopmode -halt-on-error -file-line-error main.tex
pdflatex -interaction=nonstopmode -halt-on-error -file-line-error main.tex
# Upload the compiled PDF as an artifact # Upload the compiled PDF as an artifact
- name: Upload PDF - name: Upload PDF

View File

@ -20,8 +20,7 @@ Each category comprises a set of defect-free training images and a test set of i
\subsection{Methods}\label{subsec:methods} \subsection{Methods}\label{subsec:methods}
\subsubsection{Dagster} \subsubsection{Few-Shot Learning}
\subsubsection{Label-Studio}
\subsubsection{Jupyter Notebook}\label{subsubsec:jupyternb} \subsubsection{Jupyter Notebook}\label{subsubsec:jupyternb}
@ -64,6 +63,11 @@ There are several different ResNet architectures, the most common are ResNet-18,
Since the dataset is relatively small and the two class classification task is relatively easy (for such a large model) the ResNet-18 architecture is used in this practical work. Since the dataset is relatively small and the two class classification task is relatively easy (for such a large model) the ResNet-18 architecture is used in this practical work.
\subsubsection{CAML}
Todo
\subsubsection{P$>$M$>$F}
Todo
\subsubsection{Softmax} \subsubsection{Softmax}
The Softmax function~\eqref{eq:softmax}\cite{liang2017soft} converts $n$ numbers of a vector into a probability distribution. The Softmax function~\eqref{eq:softmax}\cite{liang2017soft} converts $n$ numbers of a vector into a probability distribution.