Markov chains – simulation

August 1, 2009 by slawekk

I have to say it took me considerable effort to figure out how to use the part of Haskell’s probability library that deals with randomness and simulation. The intuition developed by programming in imperative languages is especially harmful here. Read the rest of this entry »

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Haskell in Q

July 24, 2009 by slawekk

My new job will involve coding in Q. Q is a scripting language derived from APL. It is mostly used for stuff related to trading and finance. I don’t know it yet, I’m supposed to learn it on the job, so I decided to have a look at it. Read the rest of this entry »

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Moving again

July 22, 2009 by slawekk

I have decided to move with my family to Poland. I will be describing the experience on another blog.

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IsarMathLib version 1.6.9 released

July 7, 2009 by slawekk

I have released a new version of IsarMathLib. There are about 20 new theorems and a new theory on topological groups. The theory contains some basic definitions and notation and ends with a theorem that a subgroup of a topological group is a topological group.

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Formalpedia

June 15, 2009 by slawekk

Formalpedia is an “editable online repository of code and formal math”. It is on its way to became the first formalized mathematics wiki that goes online. Read the rest of this entry »

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Markov chains

June 5, 2009 by slawekk

The approach taken in the Haskell’s probability library makes it especially convenient for modeling Markov chains.
Suppose  \{X_n\}_{n \in \mathbb{N}} is a Markov chain on a state space S. Distribution of the process \{X_n\}_{n \in \mathbb{N}} is determined by the distribution of X_0 and the numbers Pr(X_{n+1}=y | X_n = x), x,y \in S, n \in \mathbb{N}, called transition probabilities. For simplicity let’s consider only time-homogeneous Markov chains where these numbers don’t depend on n and let’s assume that the initial distribution is a point mass, i.e. X_0 = x_0 for some x_0\in S. Then we can define a function f: S \rightarrow Dist(S), where for each x \in S the value f(x) is a distribution on S defined by (f(x))(y) = Pr(X_{n+1}=y | X_n = x), x,y \in S, n \in \mathbb{N}. Here Dist(S) denotes the set of finitely supported nonnegative functions on S that sum up to 1. Conceptually, f(x) is the the distribution of the next value of the chain given the current value is x. This is exactly the kind of distribution-valued function that is the right hand side operand of the \leadsto operation from the previous post, which corresponds to the Haskell’s >>= operation in the probability monad. Read the rest of this entry »

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Probability monad

May 31, 2009 by slawekk

My favourite programming language Haskell has a nice library for doing calculations with probablility distributions, called probability.
The library was originally written by Martin Ewig and Steve Kollmansberger and then extended and packaged for convenient installation by Henning Thieleman. Its main idea for the implementation is to use the fact that “probability distributions form a monad” (from a paper by the authors of the library ). This post aims at translating this claim into standard probability notation and showing how it is used in the library. Read the rest of this entry »

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Posted in mathematics | 7 Comments »

IsarMathLib version 1.6.8 released

April 26, 2009 by slawekk

This release is  the first version of the IsarMathLib library for the new Isabelle2009. There is a little bit of new formalized mathematics as well. Read the rest of this entry »

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Isabelle 2009 released

April 22, 2009 by slawekk

The Isabelle team has released version 2009. Updating IsarMathLib to Isabelle 2009 was very easy. I only had to make a couple of corrections to proofs that used assumptions implicitly. The only more complicated change was related to renaming variables in the locale syntax. Read the rest of this entry »

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MathWiki project is hiring

March 10, 2009 by slawekk

Apparently the formalized mathematics project at Radboud University Nijmegen (NL) that I wrote about previously did get some funding after all and they are hiring two people to work on it. The PhD position is for 4 years and the postdoc position is 3 years. I hope that a usable formalized mathematics wiki will be available earlier.

The postdoc position pays a “maximum salary”  of 3755 Euro per month. Such wording immediately makes me curious what is the minimum … .

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