
Recent Posts
Tags
 CayleyHamilton Theorem
 characters
 Chinese remainder theorem
 Compression
 Diophantine approximation
 Dirichlet's theorem
 Dirichlet's approximation theorem
 Dirichlet's unit theorem
 Domino
 Dynamics
 eigenvalues
 Entropy
 Euclid
 Fourier transform
 gaussian integers
 Generic Matrix
 Geometry
 Geometry of numbers
 Homogeneous spaces
 Hyperbolic space
 isoperimetric inequality
 Klein group
 lattice
 Lattices
 Linearity testing
 mediant
 Minkowski's Theorem
 mobius
 Number Theory
 Peg Solitaire
 Pell's equations
 planar geometry
 poinare disk
 prime numbers
 Pythagoras
 radar
 random walk
 self similar sets
 shortest vector problem
 Sierpinski carpet
 Sierpinski triangle
 SL_2(Z)
 stochastic matrices
 Weak Law of Large Numbers
Archives
Tag Archives: Klein group
The Peg Solitaire and its unbeatable games
In the previous post we considered a simple domino game where we needed to cover a board with dominos. We wanted to find a way such that if a board couldn’t be covered, then we could prove it easily, and … Continue reading
Unwinnable domino games and game invariants
Sudoku is a simple game that was invented more than a century ago, but only started to get famous about 20 years ago, and suddenly it started appearing in the game sections of many papers, you could buy booklets full … Continue reading