June 22, 2013

Logical games

He was an avid crossword solver, so he hated chess: far too many black squares.

June 12, 2013

The smoke of gunpowder is transformed into the mist of history

Bookhaven discusses a 1972 article by Joseph Brodsky in the New York Times: "A Writer Is a Lonely Traveler, And No One Is His Helper".

June 9, 2013

Evolution des tarifs de téléphonie mobile en France

Dans cette période de baisse du prix des abonnements pour les mobiles il est instructif de regarder leur évolution sur plusieurs années:

Il s'agit des prix les plus bas pour un forfait de deux heures. Données retrouvées sur la Wayback Machine.

Giverny

In Claude Monet's garden. More photos.


Today's article in the NY Times about Giverny.

June 2, 2013

Bayesian thermodynamics, measurements and the arrow of time

Cosma Shalizi tries to prove that Bayesian Statistical Mechanics implies a decreasing entropy, and hence a reversed arrow of time. I cannot follow all the formalism, but the gist of it seems to be as follows:
  1. Performing a measurement on the system reduces its entropy (paragraph above Eq. (2)).
  2.  This contradicts the fact that "in reality, thermodynamic entropy is monotonically
    non-decreasing".
  3. Hence, one cannot identify thermodynamic entropy with subjective uncertainty.
  4.  Fortunately, since otherwise the theory has some absurd consequences: "watching a pot closely enough [would] keep it from boiling."
He does not address an obvious objection: a system that we keep on measuring is not closed, so point 2. does not apply. To put it differently, Shalizi's observer (or is it the concept of observer he imputes to Bayesian statistics?) is a version of Maxwell's demon (this has already been discussed, see for instance: 1, 2).

We can then accept that measurements reduce the entropy of the observed system. Can we quantify this reduction for current experimental techniques? Is it proportional to the amount of information effectively obtained?