doi:10.1112/plms/pdl018 UNIVERSAL FINITARY CODES WITH EXPONENTIAL TAILS (2008)
Nate Harvey, Alexander E. Holroyd, Yuval Peres, Dan Romik
In 1977, Keane and Smorodinsky showed that there exists a finitary homomorphism from any finite-alphabet Bernoulli process to any other finite-alphabet Bernoulli process of strictly lower entropy. In...
Universal finitary codes with exponential tails (2007)
Harvey, Nate, Holroyd, Alexander E., Peres, Yuval, Romik, Dan
In 1977, Keane and Smorodinsky showed that there exists a finitary homomorphism from any finite-alphabet Bernoulli process to any other finite-alphabet Bernoulli process of strictly lower entropy. In...
Universal finitary codes with exponential tails (2006)
Harvey, Nate, Holroyd, Alexander E., Peres, Yuval, Romik, Dan
In 1977, Keane and Smorodinsky showed that there exists a finitary homomorphism from any finite-alphabet Bernoulli process to any other finite-alphabet Bernoulli process of strictly lower entropy. In...
Universal finitary codes with exponential tails (2005)
Harvey, Nate, Holroyd, Alexander E., Peres, Yuval, Romik, Dan
In 1977, Keane and Smorodinsky showed that there exists a finitary homomorphism from any finite-alphabet Bernoulli process to any other finite-alphabet Bernoulli process of strictly lower entropy. In...
An invariant of finitary codes with finite expected square root coding length (2003)
Let $p$ and $q$ be probability vectors with the same entropy $h$. Denote by $B(p)$ the Bernoulli shift indexed by $\Z$ with marginal distribution $p$. Suppose that $\phi$ is a measure preserving...