Penrose is a platform that enables people to create beautiful diagrams just by typing mathematical notation in plain text. The goal is to make it easy for non-experts to create and explore high-quality diagrams and provide deeper insight into challenging technical concepts. We aim to democratize the process of creating visual intuition.
Check out our SIGGRAPH '20 paper and video on Penrose!
You can try Penrose in your browser without any installation. For a more detailed step-by-step introduction, check out our tutorials. Or, for more reference-style information, take a look at our documentation.
Here's a simple Penrose visualization in the domain of set theory.
It's specified by the following trio of Domain, Substance, and Style programs
(with variation PlumvilleCapybara104):
-
setTheory.domain:type Set predicate Not(Prop p1) predicate Intersecting(Set s1, Set s2) predicate IsSubset(Set s1, Set s2) -
tree.substance:Set A, B, C, D, E, F, G IsSubset(B, A) IsSubset(C, A) IsSubset(D, B) IsSubset(E, B) IsSubset(F, C) IsSubset(G, C) Not(Intersecting(E, D)) Not(Intersecting(F, G)) Not(Intersecting(B, C)) AutoLabel All -
venn.style:canvas { width = 800 height = 700 } forall Set x { x.icon = Circle { strokeWidth : 0 } x.text = Equation { string : x.label fontSize : "32px" } ensure contains(x.icon, x.text) encourage sameCenter(x.text, x.icon) x.textLayering = x.text above x.icon } forall Set x; Set y where IsSubset(x, y) { ensure disjoint(y.text, x.icon, 10) ensure contains(y.icon, x.icon, 5) x.icon above y.icon } forall Set x; Set y where Not(Intersecting(x, y)) { ensure disjoint(x.icon, y.icon) } forall Set x; Set y where Intersecting(x, y) { ensure overlapping(x.icon, y.icon) ensure disjoint(y.text, x.icon) ensure disjoint(x.text, y.icon) }
See CONTRIBUTING.md.
This repository is licensed under the MIT License.