The hardware and bandwidth for this mirror is donated by dogado GmbH, the Webhosting and Full Service-Cloud Provider. Check out our Wordpress Tutorial.
If you wish to report a bug, or if you are interested in having us mirror your free-software or open-source project, please feel free to contact us at mirror[@]dogado.de.

quarto vignettes

pkgdown effectively uses quarto only to generate HTML and then supplies its own CSS and JS. This means that when quarto introduces new features, pkgdown may lag behind in their support. If you’re trying out something that doesn’t work (and isn’t mentioned explicitly below), please file an issue so we can look into it.

Operation

pkgdown turns your articles directory into a quarto project by temporarily adding a _quarto.yml to your articles. You can also add your own if you want to control options for all quarto articles. If you do so, and you have a mix of .qmd and .Rmd files, you’ll need to include the following yaml so that RMarkdown can continue to handle the .Rmd files:

project:
  render: ['*.qmd']

GitHub actions

Currently, you’ll need to manually install the pre-release version of Quarto in your GitHub actions. (Hopefully this will change in the future). Add the following lines to install quarto:

     - name: Set up Quarto
        uses: quarto-dev/quarto-actions/setup@v2
        with:
          version: pre-release
        env:
          GH_TOKEN: ${{ secrets.GITHUB_TOKEN }}

Limitations

Supported features

The following sections demonstrate a bunch of useful quarto features so that we can make sure that they work.

Inline formatting

Code

1 + 1
#> [1] 2
2 + 2
#> [1] 4

plot(1:3)

A plot of the numbers 1, 2, and 3

Figures

(a) A sketch of a pitbull puppy
(b) A sketch of a sharpei puppy
Figure 1: Cute puppies

Equations

$$ \frac{\partial \mathrm C}{ \partial \mathrm t } + \frac{1}{2}\sigma^{2} \mathrm S^{2} \frac{\partial^{2} \mathrm C}{\partial \mathrm C^2} + \mathrm r \mathrm S \frac{\partial \mathrm C}{\partial \mathrm S}\ = \mathrm r \mathrm C \qquad(1)$$

Cross references

See Figure 1 for two cute puppies.

Black-Scholes (Equation 1) is a mathematical model that seeks to explain the behavior of financial derivatives, most commonly options.

To do


  1. And here is the footnote.↩︎

These binaries (installable software) and packages are in development.
They may not be fully stable and should be used with caution. We make no claims about them.
Health stats visible at Monitor.