tikz.escobar.life
The setup for tikz.escobar.life
images.yml (8865B)
1 - path: 26-nodes-diagram.tikz 2 license: "CC BY 4.0" 3 author: Pablo 4 author-url: https://pablopie.xyz 5 description: The 26-nodes diagram 6 7 - path: caleb-yau.png 8 license: "CC BY-SA 2.5" 9 author: Lunch 10 source: https://commons.wikimedia.org/wiki/File:Calabi-Yau-alternate.png 11 description: A visual representation of the Calebi-Yau manifold 12 13 - path: complex-lattice.tikz 14 license: "CC BY 4.0" 15 author: Pablo 16 author-url: https://pablopie.xyz 17 description: A complex lattice with two linearly independent periods 18 19 - path: complex-surreal-venn.tikz 20 license: "CC BY 4.0" 21 author: Pablo 22 author-url: https://pablopie.xyz 23 description: This picture represents the relationship between the real, 24 complex and surreal numbers 25 26 - path: cube.tikz 27 license: "CC BY 4.0" 28 author: Pablo 29 author-url: https://pablopie.xyz 30 description: A cube 31 32 - path: diamond.tikz 33 license: "CC BY 4.0" 34 author: Pablo 35 author-url: https://pablopie.xyz 36 description: A domond-like shape 37 38 - path: dihedral-representation-is-irreducible.tikz 39 license: "CC BY 4.0" 40 author: Pablo 41 author-url: https://pablopie.xyz 42 description: An ilustration of the proof that the natural real representation 43 of the Dihidral group is irreducible 44 45 - path: dihedral-representation.tikz 46 license: "CC BY 4.0" 47 author: Pablo 48 author-url: https://pablopie.xyz 49 description: The action of the dihedral group in the real plain 50 51 - path: elliptic-curve-group-structure.tikz 52 license: "CC BY 4.0" 53 author: Pablo 54 author-url: https://pablopie.xyz 55 description: The group structure of the points of an elliptic curve 56 57 - path: euclidian-plane.tikz 58 license: "CC BY 4.0" 59 author: Pablo 60 author-url: https://pablopie.xyz 61 description: The Cartesian plain 62 63 - path: finite-topological-plot.tikz 64 license: "CC BY 4.0" 65 author: Pablo 66 author-url: https://pablopie.xyz 67 description: A plot of the number of topological spaces of n points in 68 logarithmic scale 69 70 - path: galois-lattice-antisomorphism.tikz 71 license: "CC BY 4.0" 72 author: Pablo 73 author-url: https://pablopie.xyz 74 description: The lattice anti-isomorphism between the lattice of the 75 subgroups of the Galois group of a Galois extension and the lattice of 76 intermediary subfields of such extension. 77 78 - path: geodesic.tikz 79 license: "CC BY 4.0" 80 author: Pablo 81 author-url: https://pablopie.xyz 82 description: This picture represents the fact that geodesics locally minimize 83 distances 84 85 - path: grothendieck-riemann-roch.tikz 86 author: Alexander Grothendieck 87 author-url: https://grothendieckcircle.org/ 88 description: The commutative diagram from the Grothendieck-Riemann-Roch 89 theorem, surrounded by fire and two devils carrying forks 90 91 - path: groups-periodic-table.eps 92 author: Ivan Andrus 93 author-url: https://irandrus.wordpress.com 94 source: https://irandrus.wordpress.com/2012/06/17/the-periodic-table-of-finite-simple-groups/ 95 description: A diagram of the classification of finite simple groups in the 96 format of a periodic table 97 98 - path: hyperbolic-plane-disc.tikz 99 license: "CC BY 4.0" 100 author: Pablo 101 author-url: https://pablopie.xyz 102 description: The Poincaré disc model of the hyperbolic plane 103 104 - path: j-function.eps 105 author: Eugene Jahnke & Fritz Emde 106 description: Relief representation of the j-invariant elliptic modular 107 function 108 109 # How to license/link this? 110 - path: j-function.jpg 111 license: copyleft # Public domain 112 author: Jan Homann 113 source: https://commons.wikimedia.org/wiki/File:KleinInvariantJ.jpg 114 description: The j-invariant Klein function in the complex plane 115 116 - path: k4.tikz 117 license: "CC BY 4.0" 118 author: Pablo 119 author-url: https://pablopie.xyz 120 description: The complete graph of four vertices 121 122 - path: mobius.tikz 123 license: "CC BY 4.0" 124 author: Pablo 125 author-url: https://pablopie.xyz 126 description: The Mobius strip 127 128 - path: monster-group-character-table.eps 129 license: "CC BY 4.0" 130 author: Pablo 131 author-url: https://pablopie.xyz 132 description: The first columns of the chacter table of the monster simple 133 group in characteristic zero 134 135 - path: natural-number-line.tikz 136 license: "CC BY 4.0" 137 author: Pablo 138 author-url: https://pablopie.xyz 139 description: The natural number line 140 141 - path: ordinal-number-line.tikz 142 license: "CC BY 4.0" 143 author: Pablo 144 author-url: https://pablopie.xyz 145 description: The ordinal number line 146 147 - path: quaternion-rotation.tikz 148 license: "CC BY 4.0" 149 author: Pablo 150 author-url: https://pablopie.xyz 151 description: "This drawing represents the correspondence between conjugation 152 by pure unitary quaternions and rotations in the 3-dimensional Euclidean 153 space: the coordinates of a unitary quaternion p number with zero real 154 coefficient induce a line through the origin in the 3-dimensional Euclidean 155 space, and conjugation by cos t + p sin t acts as rotation by 2 t around 156 this axis." 157 158 - path: real-number-line.tikz 159 license: "CC BY 4.0" 160 author: Pablo 161 author-url: https://pablopie.xyz 162 description: The real number line 163 164 - path: real-ordinal-surreal-venn.tikz 165 license: "CC BY 4.0" 166 author: Pablo 167 author-url: https://pablopie.xyz 168 description: This picture represents the relationship between the real, 169 ordinal and surreal numbers 170 171 - path: riemannian-metric.tikz 172 license: "CC BY 4.0" 173 author: Pablo 174 author-url: https://pablopie.xyz 175 description: This picture is a comparison between the Euclidean distance and 176 the Riemannian distance in a 3-dimensional sphere 177 178 - path: rigid-motion-reflections.tikz 179 license: "CC BY 4.0" 180 author: Pablo 181 author-url: https://pablopie.xyz 182 description: This picture represents the fact that reflections are rigid 183 motions 184 185 - path: rigid-motion-rotation.tikz 186 license: "CC BY 4.0" 187 author: Pablo 188 author-url: https://pablopie.xyz 189 description: This picture represents the fact that rotations are rigid 190 motions 191 192 - path: smooth-function.tikz 193 license: "CC BY 4.0" 194 author: Pablo 195 author-url: https://pablopie.xyz 196 description: This picture represents the definition of a smooth map between 197 manifolds 198 199 - path: smooth-manifold.tikz 200 license: "CC BY 4.0" 201 author: Pablo 202 author-url: https://pablopie.xyz 203 description: This picture represents the definition of a smooth manifold 204 205 - path: sphere-quotient.tikz 206 license: "CC BY 4.0" 207 author: Pablo 208 author-url: https://pablopie.xyz 209 description: The isomorphism between the n-dimensional sphere and the 210 quotient of the (n + 1)-dimensional simple orthogonal group by the 211 n-dimensional simple orthogonal group 212 213 - path: sphere.tikz 214 license: "CC BY 4.0" 215 author: Pablo 216 author-url: https://pablopie.xyz 217 description: A 2-dimensional sphere 218 219 - path: sporadic-groups.eps 220 license: "CC BY-SA 3.0" 221 author: Drschawrz 222 source: https://en.wikipedia.org/wiki/File:SporadicGroups.svg 223 description: All the Sporadic groups in their subquotient relationship 224 225 - path: square-to-circle-projection.tikz 226 license: "CC BY 4.0" 227 author: Pablo 228 author-url: https://pablopie.xyz 229 description: "The projection from the square to the circle: we map a point in 230 the square of length √2/2 onto the unit circle by normalizing it" 231 232 - path: standard-sets-venn.tikz 233 license: "CC BY 4.0" 234 author: Pablo 235 author-url: https://pablopie.xyz 236 description: This diagram represents the relationship between standard number 237 sets 238 239 - path: stereographic-projection.tikz 240 license: "CC BY 4.0" 241 author: Pablo 242 author-url: https://pablopie.xyz 243 description: The stereographic projection 244 245 # TODO: Get the TikZ code for this somehow? 246 - path: surreal-number-tree.eps 247 license: "CC BY-SA 3.0" 248 author: Lukáš Lánský 249 source: https://en.wikipedia.org/wiki/File:Surreal_number_tree.svg 250 description: Visualization of the surreal number tree 251 252 - path: tangent-space.tikz 253 license: "CC BY 4.0" 254 author: Gustavo Mezzovilla 255 description: The tangent space of a smooth manifold at a point 256 257 - path: topology-mug-donut.tikz 258 license: "CC BY 4.0" 259 author: Pablo 260 author-url: https://pablopie.xyz 261 description: A mug continuously morphing into a donut 262 263 - path: unit-circle-covering.tikz 264 license: "CC BY 4.0" 265 author: Pablo 266 author-url: https://pablopie.xyz 267 description: The universal covering of the unit circle 268 269 - path: unit-circle.tikz 270 license: "CC BY 4.0" 271 author: Pablo 272 author-url: https://pablopie.xyz 273 description: The unit complex circle 274 275 - path: upper-central-projection.tikz 276 license: "CC BY 4.0" 277 author: Pablo 278 author-url: https://pablopie.xyz 279 description: "A graphical depiction of the central projection between the 280 upper semi-sphere and the Euclidean plane: we map each point in the upper 281 half of the sphere to the projection of this point in the tangent plane at 282 the north pole by drawing a line between this point and the center of the 283 sphere and then taking the intersection of this line with the plane."