Sold Out
Book Categories |
I | An overview of circle packing | 1 |
1 | A circle packing menagerie | 3 |
2 | Circle packings in the wild | 15 |
II | Rigidity : maximal packings | 33 |
3 | Preliminaries : topology, combinatorics, and geometry | 35 |
4 | Statement of the fundamental result | 51 |
5 | Bookkeeping and monodromy | 54 |
6 | Proof for combinatorial closed discs | 62 |
7 | Proof for combinatorial spheres | 72 |
8 | Proof for combinatorial open discs | 73 |
9 | Proof for combinatorial surfaces | 116 |
III | Flexibility : analytic functions | 131 |
10 | The intuitive landscape | 133 |
11 | Discrete analytic functions | 139 |
12 | Construction tools | 153 |
13 | Discrete analytic functions on the disc | 160 |
14 | Discrete entire functions | 181 |
15 | Discrete rational functions | 195 |
16 | Discrete analytic functions on Riemann surfaces | 201 |
17 | Discrete conformal structure | 217 |
18 | Random walks on circle packings | 232 |
IV | Resolution : approximation | 247 |
19 | Thurston's conjecture | 249 |
20 | Extending the Rodin-Sullivan theorem | 257 |
21 | Approximation of analytic functions | 268 |
22 | Approximation of conformal structures | 275 |
23 | Applications | 286 |
App. A | Primer on classical complex analysis | 309 |
App. B | The ring lemma | 318 |
App. C | Doyle spirals | 322 |
App. D | The Brooks parameter | 327 |
App. E | Inversive distance packings | 331 |
App. F | Graph embedding | 335 |
App. G | Square grid packings | 339 |
App. H | Schwarz and buckyballs | 343 |
App. I | CirclePack | 346 |
Login|Complaints|Blog|Games|Digital Media|Souls|Obituary|Contact Us|FAQ
CAN'T FIND WHAT YOU'RE LOOKING FOR? CLICK HERE!!! X
You must be logged in to add to WishlistX
This item is in your Wish ListX
This item is in your CollectionIntroduction to Circle Packing: The Theory of Discrete Analytic Functions
X
This Item is in Your InventoryIntroduction to Circle Packing: The Theory of Discrete Analytic Functions
X
You must be logged in to review the productsX
X
X
Add Introduction to Circle Packing: The Theory of Discrete Analytic Functions, The topic of circle packing was born of the computer age but takes its inspiration and themes from core areas of classical mathematics. A circle packing is a configuration of circles having a specified pattern of tangencies, as introduced by William Thurs, Introduction to Circle Packing: The Theory of Discrete Analytic Functions to the inventory that you are selling on WonderClubX
X
Add Introduction to Circle Packing: The Theory of Discrete Analytic Functions, The topic of circle packing was born of the computer age but takes its inspiration and themes from core areas of classical mathematics. A circle packing is a configuration of circles having a specified pattern of tangencies, as introduced by William Thurs, Introduction to Circle Packing: The Theory of Discrete Analytic Functions to your collection on WonderClub |