Leading digits and quadmath

Posted on 19 June 2013 by John — No Comments ↓

My previous post looked at a problem that requires repeatedly finding the first digit of kⁿ where k is a single digit but n may be on the order of millions or billions.

The most direct approach would be to first compute kⁿ as a very large integer, then find it’s first digit. That approach is slow, and gets slower as n increases. A faster way is to look at the fractional part of log kⁿ = n log k and see which digit it corresponds to.

If n is not terribly big, this can be done in ordinary precision. But when n is large, multiplying log k by n and taking the fractional part brings less significant digits into significance. So for very large n, you need extra precision. I first did this in Python using SymPy, then switched to C++ for more speed. There I used the quadmath library for gcc. (If n is big enough, even quadruple precision isn’t enough. An advantage to SymPy over quadmath is that the former has arbitrary precision. You could, for example, set the precision to be 10 more than the number of decimal places in n in order to retain 10 significant figures in the fractional part of n log k.)

The quadmath.h header file needs to be wrapped in an extern C declaration. Otherwise gcc will give you misleading error messages.

The 128-bit floating point type is __float128, twice as many bits as a double. The quadmath functions are usually have the same name as their standard math.h counterparts, but with a q added on the end, such as log10a and fmodq below.

Here’s code for computing the leading digit of kⁿ that illustrates using quadmath.

#include <cmath>
extern "C" {
#include <quadmath.h>
}

__float128 logs[11];

for (int i = 2; i <= 10; i++)
    logs[i] = log10q(i + 0.0);

int first_digit(int base, long long exponent)
{
    __float128 t = fmodq(exponent*logs[base], 1.0);
    for (int i = 2; i <= 10; i++)
        if (t < logs[i])
            return i-1;
}

The code always returns because t is less than 1.

Caching the values of log10q saves repeated calls to a relatively expensive function. So does using the search at the bottom rather than computing powq(10, t).

The linear search at the end is more efficient than it may seem. First, it’s only search a list of length 9. Second, because of Benford’s law, the leading digits are searched in order of decreasing frequency, i.e. most inputs will cause first_digit to return early in the search.

When you compile code using quadmath, be sure to add -lquadmath to the compile command.

Tagged with: C++, gcc
Posted in Computing

Gelfand’s question

Posted on 19 June 2013 by John — 1 Comment ↓

Gelfands’s question asks whether there is a positive integer n such that the first digits of jⁿ base 10 are all the same for j = 2, 3, 4, …, 9. (Thanks to @republicofmath for pointing out this problem.) This post will explore Gelfand’s question via probability. Read more ›

What have you been doing?

Posted on 18 June 2013 by John — 3 Comments ↓

Several people have asked me what kind of work I’ve been doing since I went out on my own earlier this year. So far I’ve done a lot of fairly small projects, though I have one large project that’s just getting started. (The larger the project and client, the longer it takes to get rolling.)

Here are some particular things I’ve been doing.

Helped a company improve their statistical software development process
Modeled the efficiency and reliability of server configurations
Analyzed marketing and sales data
Coached someone in technical professional development
Wrote an article for an online magazine
Helped a company integrate R into their software product
Reviewed the mathematical code in a video game
Researched and coded up some numerical algorithms

If something on this list sounds like something you’d like for me to do with your company, please let me know.

Posted in Business

Continuous quantum

Posted on 17 June 2013 by John — 10 Comments ↓

David Tong argues that quantum mechanics is ultimately continuous, not discrete.

In other words, integers are not inputs of the theory, as Bohr thought. They are outputs. The integers are an example of what physicists call an emergent quantity. In this view, the term “quantum mechanics” is a misnomer. Deep down, the theory is not quantum. In systems such as the hydrogen atom, the processes described by the theory mold discreteness from underlying continuity. … The building blocks of our theories are not particles but fields: continuous, fluidlike objects spread throughout space. … The objects we call fundamental particles are not fundamental. Instead they are ripples of continuous fields.

Source: The Unquantum Quantum, Scientific American, December 2012.

Tagged with: Science
Posted in Science

Mean residual time

Posted on 16 June 2013 by John — 7 Comments ↓

If something has survived this far, how much longer is it expected to survive? That’s the question answered by mean residual time.

For a positive random variable X, the mean residual time for X is a function e_X(t) given by

$e_X(t) = E(X - t \mid X > t) = \int_t^\infty \frac{1 - F_X(x)}{1-F_X(t)} \, dx$

provided the expectation and integral converge. Here F(t) is the CDF, the probability that X is greater than t.

For an exponential distribution, the mean residual time is constant. For a Pareto (power law) distribution, the mean residual time is proportional to t. This has an interesting consequence, known as the Lindy effect.

Now let’s turn things around. Given function a function e(t), can we find a density function for a positive random variable with that mean residual time? Yes.

The equation above yields a differential equation for F, the CDF of the distribution.

If we differentiate both sides of

$e(t) (1 - F(t)) = \int_t^\infty 1 - F(x)\, dx$

with respect to t and rearrange, we get the first order differential equation

$F'(t) + g(t)\, F(t) = g(t)$

where

$g(t) = \frac{e'(t) + 1}{e(t)}$

The initial condition must be F(0) = 0 because we’re looking for the distribution of a positive random variable, i.e. the probability of X being less than zero must be 0. The solution is then

$F(t) = 1 - \frac{e(0)}{e(t)} \exp\left( -\int_0^t \frac{dx}{e(x)} \right)$

This means that for a desired mean residual time, you can use the equation above to create a CDF function to match. The derivative of the CDF function gives the PDF function, so differentiate both sides to get the density.

Tagged with: Differential equations, Probability and Statistics
Posted in Math

No use for old things

Posted on 15 June 2013 by John — 4 Comments ↓

From Brave New World:

“But why is [Shakespeare] prohibited?” asked the Savage. …

The Controller shrugged his shoulders. “Because it’s old; that’s the chief reason. We haven’t any use for old things here.”

“Even when they’re beautiful?”

“Particularly when they’re beautiful. Beauty’s attractive, and we don’t want people to be attracted by old things. We want them to like the new ones.”

Related: Chronological snobbery

Posted in Uncategorized

Pure math and physics

Posted on 13 June 2013 by John — 5 Comments ↓

From Paul Dirac, 1938:

Pure mathematics and physics are becoming ever more closely connected, though their methods remain different. One may describe the situation by saying that the mathematician plays a game in which he himself invents the rules while the physicist plays a game in which the rules are provided by Nature, but as time goes on it becomes increasingly evident that the rules which the mathematician finds interesting are the same as those which Nature has chosen.

Tagged with: Math, Science
Posted in Math, Science

Example of unit testing R code with testthat

Posted on 12 June 2013 by John — 3 Comments ↓

Here’s a little example of using Hadley Wickham’s testthat package for unit testing R code. You can read more about testthat here. Read more ›

Tagged with: Quality, Rstats
Posted in Software development

Singular Value Consulting, LLC

Posted on 12 June 2013 by John — 2 Comments ↓

The name of my business is Singular Value Consulting, LLC.

Math people may catch the allusion to singular value decomposition (SVD). I hope that non-math folks will interpret “singular value” to mean something like “singularly valuable.”

One way to think of an SVD is a pair of coordinate systems that give a linear transformation the simplest representation. So metaphorically, SVD is getting to the core of a problem and producing a simple solution.

For some less serious mathematical company names, see this list.

Posted in Business, Math

Computing skewness and kurtosis in one pass

Posted on 11 June 2013 by John — 5 Comments ↓

If you compute the standard deviation of a data set by directly implementing the definition, you’ll need to pass through the data twice: once to find the mean, then a second time to accumulate the squared differences from the mean. But there is an equivalent algorithm that requires only one pass and that is more accurate than the most direct method. You can find the code for implementing it here.

You can also compute the higher sample moments in one pass. I’ve extended the previous code to compute skewness and kurtosis in one pass as well.

The new code also lets you split your data, say to process it in parallel on different threads, and then combine the statistics, in the spirit of map-reduce.

Lastly, I’ve posted analogous code for simple linear regression.

Tagged with: Probability and Statistics
Posted in Software development, Statistics

A statistical problem with “nothing to hide”

Posted on 10 June 2013 by John — 29 Comments ↓

One problem with the nothing-to-hide argument is that it assumes innocent people will be exonerated certainly and effortlessly. That is, it assumes that there are no errors, or if there are, they are resolved quickly and easily.

Suppose the probability of a correctly analyzing an email or phone call is not 100% but 99.99%. In other words, there’s one chance in 10,000 of an innocent message being incriminating. Imagine authorities analyzing one message each from 300,000,000 people, roughly the population of the United States. Then around 30,000 innocent people will have some ‘splaining to do. They will have to interrupt their dinner to answer questions from an agent knocking on their door, or maybe they’ll spend a few weeks in custody. If the legal system is 99.99% reliable, then three of them will go to prison.

Now suppose false positives are really rare, one in a million. If you analyze 100 messages from each person rather than just one, you’re approximately back to the scenario above.

Scientists call indiscriminately looking through large amounts of data “a fishing expedition” or “data dredging.” One way to mitigate the problem of massive false positives from data dredging is to demand a hypothesis: before you look through the data, say what you’re hoping to prove and why you think it’s plausible.

The legal analog of a plausible hypothesis is a search warrant. In statistical terms, “probable cause” is a judge’s estimation that the prior probability of a hypothesis is moderately high. Requiring scientists to have a hypothesis and requiring law enforcement to have a search warrant both dramatically reduce the number of false positives.

Tagged with: Bayesian, Privacy
Posted in Statistics

The weight of code

Posted on 10 June 2013 by John — 5 Comments ↓

From Bjorn Freeman-Benson’s talk Airplanes, Spaceships, and Missiles: Engineering Lessons from Famous Projects

Bjorn is discussing the ferrite core memory of the Apollo guidance system.

These are very, very robust memory systems. … But the problem is that they actually have weight to them. Core memory actually weighs a bunch, so when you’re writing your program for the lunar module … every line of code that you wrote had a consequence in weight. And you could measure how heavy your code was at the end of a compile line. … It’s an interesting analogy to keep in mind because in fact even today our code has weight. It doesn’t really have physical weight … Our code has psychological weight because every line of code we write has to be maintained. It has to be supported. It has to be operated.

Here’s the video. The context of the quote begins at 33:14.

Tagged with: Programming
Posted in Software development

Bottom-up exposition

Posted on 7 June 2013 by John — 4 Comments ↓

I wish more authors followed this philosophy:

The approach I have taken here is to try to move always from the particular to the general, following through the steps of the abstraction process until the abstract concept emerges naturally. … at the finish it would be quite appropriate for the reader to feel that (s)he had just arrived at the subject, rather than reached the end of the story.

From the preface here.

When books start at the most abstract point, I feel like saying to the author “Thank you for the answer, but what was the question?”

Tagged with: Books, Education, Math
Posted in Math

Orwellian vs Huxleyian

Posted on 7 June 2013 by John — 19 Comments ↓

Orwell and Huxley wrote contrasting dystopian books. In Orwell’s 1984, people are controlled by overt totalitarian power. In Huxley’s Brave New World, people are lulled into submission.

Orwellian became a common adjective:

But Huxleyian didn’t:

Neither did Huxleyan:

Orwellian gets about 55 times as many hits as Huxeyian and 104 times as many hits as Huxleyan. Apparently we are concerned about overt power, but we don’t care about a world in which people don’t care.

Posted in Uncategorized

Seven dogmas of category theory

Posted on 6 June 2013 by John — 1 Comment ↓

Joseph Goguen gave seven dogmas in his paper A Categorical Manifesto.

To each species of mathematical structure, there corresponds a category whose objects have that structure, and whose morphisms preserve it.
To any natural construction on structures of one species, yielding structures of another species, there corresponds a functor from the category of the first species to the category of the second.
To each natural translation from a construction F : A -> B to a construction G: A -> B there corresponds a natural transformation F => G.
A diagram D in a category C can be seen as a system of constraints, and then a limit of D represents all possible solutions of the system.
To any canonical construction from one species of structure to another corresponds an adjuction between the corresponding categories.
Given a species of structure, say widgets, then the result of interconnecting a system of widgets to form a super-widget corresponds to taking the colimit of the diagram of widgets in which the morphisms show how they are interconnected.
Given a species of structure C, then a species of structure obtained by “decorating” or “enriching” that of C corresponds to a comma category under C (or under a functor from C).

Although category theory is all about general patterns, it can be hard to learn what the general patterns of category theory are. The list above is the best high-level description of category theory I’ve seen.

Tagged with: Category theory, Math
Posted in Math