Evaluating polynomials is not a thing I do very often. When I do, it’s for interpolation and splines; and traditionally those are done with relatively low degree polynomials—cubic at most. There are a few rather simple tricks you can use to evaluate them efficiently, and we’ll have a look at them.
Leave a Comment » | 
algorithms, C, C-plus-plus, Mathematics | Tagged: Estrin, Horner, Parallelism, Polynomial, SIMD | 
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Posted by Steven Pigeon
3 Comments | algorithms, Mathematics | Tagged: approximation, Factorial, Gosper, Mohanty, Rummens, Stirling | Permalink
Posted by Steven Pigeon
Quite a while ago, I presented a fast exponentiation algorithm that uses the binary decomposition of the exponent 
While discussing this algorithm in class, a student asked a very interesting question: what’s special about base 2? Couldn’t we use another base? Well, yes, yes we can.
2 Comments | algorithms, Mathematics | Tagged: base 2, binary, fast exponentiation, Mathematica, number theory | Permalink
Posted by Steven Pigeon
Pairing functions are fun. Last week, we had a look at the Cantor/Hopcroft and Ullman function, and this week, we’ll have a look at the Rosenberg-Strong function—and we’ll modify it a bit.
3 Comments | algorithms, data compression, Mathematics | Tagged: Cantor, Hopcroft, pairing function, Rosenberg, Rosenberg-Strong, Strong, Ullman | Permalink
Posted by Steven Pigeon
Pairing functions are used to reversibly map a pair of number onto a single number—think of a number-theoretical version of std::pair. Cantor was the first (or so I think) to propose one such function. His goal wasn’t data compression but to show that there are as many rationals as natural numbers.
Cantor’s function associates pairs (i,j) with a single number:
…but that’s not the only way of doing this. A much more fun—and spatially coherent—is the boustrophedonic pairing function.
1 Comment | algorithms, data compression, Mathematics | Tagged: boustrophedonic, Cantor, Integer, ox, pairing function, plowing, Rational | Permalink
Posted by Steven Pigeon
Last week, we’ve had a look at how to distribute maximally different colors on the RGB cube. But I also remarked that we could use some other color space, say HSV. How do we distribute colors uniformly in HSV space?
Leave a Comment » | algorithms, hacks, Mathematics | Tagged: Centered hexagonal numbers, Hexagonal numbers, HSV, Lattice, OEIS, Palette | Permalink
Posted by Steven Pigeon
In Graphics Gems [1], Paeth proposes a fast (but quite approximate) method for the rapid computation of hypotenuse,
The goal here is to get rid of the big bad 
Leave a Comment » | algorithms, hacks, Mathematics | Tagged: Archytas, Bakhshali, Hypotenuse, Paeth, Square root, Taylor Series | Permalink
Posted by Steven Pigeon
While searching for old notes—that I haven’t found anyway—I returned to an old blog entry and I thought I was kind of unsatisfactory, with be best part being swept under the carpet with a bit a faery dust, and very handwavingly.
So let’s work-out how to uniformly distribute points on a sphere in a more satisfactory fashion.
Leave a Comment » | algorithms, Mathematics, programming | Tagged: Calculus, Curve Length, pseudo-random, random, Sphere, uniform random | Permalink
Posted by Steven Pigeon
I’ve discussed algorithms for computing square roots a couple of times already, and then some. While sorting notes, I’ve came across something interesting: Archytas’ method for computing square roots.
Archytas’ method is basically the old Babylonian method, where you first set
and iterate
until desired precision is achieved (or the scribe is exhausted).
Leave a Comment » | algorithms, hacks, Mathematics | Tagged: Archytas, Newton's Method, Old Babylonian, Square root | Permalink
Posted by Steven Pigeon
A positional number system needs a base that is either greater than one, or smaller than minus one—yes, we can have a negative base for a number system. The system, however, seems to break down if the base we chose is base 1.
If the base is 1, then there are no permissible digits since the digits 
4 Comments | data compression, Mathematics | Tagged: Number system, Positional number system, unary, unary code, unary number system | Permalink
Posted by Steven Pigeon
Harder, Better, Faster, Stronger 