diff --git a/images.yml b/images.yml
@@ -1,7 +1,7 @@
- path: 26-nodes-diagram.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the 26-nodes diagram
+ description: The 26-nodes diagram
- path: caleb-yau.png
license: "CC BY-SA 2.5"
@@ -12,24 +12,23 @@
- path: complex-lattice.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents a complex lattice with two linearly
- independent periods
+ description: A complex lattice with two linearly independent periods
- path: complex-surreal-venn.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the relationshipt between the real,
+ description: This picture represents the relationship between the real,
complex and surreal numbers
- path: cube.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents a cube
+ description: A cube
- path: diamond.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents a domond-like thingy
+ description: A domond-like shape
- path: dihedral-representation-is-irreducible.tikz
license: "CC BY 4.0"
@@ -40,19 +39,17 @@
- path: dihedral-representation.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the action of the dihedral group in the
- real plain
+ description: The action of the dihedral group in the real plain
- path: elliptic-curve-group-structure.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the group structure of the points of an
- elliptic curve
+ description: The group structure of the points of an elliptic curve
- path: euclidian-plane.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the Cartesian plain
+ description: The Cartesian plain
- path: finite-topological-plot.tikz
license: "CC BY 4.0"
@@ -63,9 +60,9 @@
- path: galois-lattice-antisomorphism.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the lattice antisomorphism between the
- lattice of the subgroups of the Galois group of a Galois extension and the
- lattice of intermediary subfields of such extension.
+ description: The lattice anti-isomorphism between the lattice of the
+ subgroups of the Galois group of a Galois extension and the lattice of
+ intermediary subfields of such extension.
- path: geodesic.tikz
license: "CC BY 4.0"
@@ -74,11 +71,10 @@
distances
- path: grothendieck-riemann-roch.tikz
- license: "CC BY 4.0"
- authors: Pablo <pablo-escobar@riseup.net>
- description: "Original artwork by Alexander Grothendieck: the commutative
- diagram from the Grothendieck-Riemann-Roch theorem, surrounded by fire and
- two devils carrying forks."
+ license: unlicensed
+ authors: Alexander Grothendieck
+ description: The commutative diagram from the Grothendieck-Riemann-Roch
+ theorem, surrounded by fire and two devils carrying forks
- path: groups-periodic-table.eps
license: unlicensed
@@ -90,8 +86,7 @@
- path: hyperbolic-plane-disc.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the Poincaré disc model of the
- hyperbolic plane
+ description: The Poincaré disc model of the hyperbolic plane
- path: j-function.eps
license: proprietary
@@ -110,54 +105,54 @@
- path: k4.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the complete graph of four vertices
+ description: The complete graph of four vertices
- path: mobius.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the Mobius strip
+ description: The Mobius strip
- path: monster-group-character-table.eps
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the first columns of the chacter table
- of the monster simple group
+ description: The first columns of the chacter table of the monster simple
+ group in characteristic zero
- path: natural-number-line.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the natural number line
+ description: The natural number line
- path: ordinal-number-line.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the ordinal number line
+ description: The ordinal number line
- path: quaternion-rotation.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: "This drawing represents the correspondance between conjugation
- by pure unitary quaternions and rotations in the 3-dimensional euclidian
+ description: "This drawing represents the correspondence between conjugation
+ by pure unitary quaternions and rotations in the 3-dimensional Euclidean
space: the coordinates of a unitary quaternion p number with zero real
- cofficient induce a line through the origin in the 3-dimensional enclidian
+ coefficient induce a line through the origin in the 3-dimensional Euclidean
space, and conjugation by cos t + p sin t acts as rotation by 2 t around
this axis."
- path: real-number-line.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the real number line
+ description: The real number line
- path: real-ordinal-surreal-venn.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the relationshipt between the real,
+ description: This picture represents the relationship between the real,
ordinal and surreal numbers
- path: riemannian-metric.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture is a comparison between the euclian distance and
+ description: This picture is a comparison between the Euclidean distance and
the Riemannian distance in a 3-dimensional sphere
- path: rigid-motion-reflections.tikz
@@ -186,14 +181,14 @@
- path: sphere-quotient.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the isomorphism between the
- n-dimensional sphere and the quotient of the (n + 1)-dimensional simple
- orthogonal group by the n-dimensional simple orthogonal group
+ description: The isomorphism between the n-dimensional sphere and the
+ quotient of the (n + 1)-dimensional simple orthogonal group by the
+ n-dimensional simple orthogonal group
- path: sphere.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents a three-dimentional sphere
+ description: A 2-dimensional sphere
- path: sporadic-groups.eps
license: "CC BY-SA 3.0"
@@ -204,7 +199,8 @@
- path: square-to-circle-projection.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: TODO
+ description: "The projection from the square to the circle: we map a point in
+ the square of length √2/2 onto the unit circle by normalizing it"
- path: standard-sets-venn.tikz
license: "CC BY 4.0"
@@ -215,7 +211,7 @@
- path: stereographic-projection.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the stereographic projection
+ description: The stereographic projection
# TODO: Get the TikZ code for this somehow?
- path: surreal-number-tree.eps
@@ -227,24 +223,22 @@
- path: tangent-space.tikz
license: "CC BY 4.0"
authors: Gustavo Mezzovilla
- description: This picture represents the tangent space at a point in a smooth
- manifold
+ description: The tangent space of a smooth manifold at a point
- path: topology-mug-donut.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents a mug continuously morphing into a donut
+ description: A mug continuously morphing into a donut
- path: unit-circle-covering.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the universal convering of the unit
- circle
+ description: The universal covering of the unit circle
- path: unit-circle.tikz
license: "CC BY 4.0"
authors: Pablo <pablo-escobar@riseup.net>
- description: This picture represents the unit complex circle
+ description: The unit complex circle
- path: upper-central-projection.tikz
license: "CC BY 4.0"