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MPC
2010
Springer

Designing an Algorithmic Proof of the Two-Squares Theorem

14 years 4 months ago
Designing an Algorithmic Proof of the Two-Squares Theorem
We show a new and constructive proof of the two-squares theorem, based on a somewhat unusual, but very effective, way of rewriting the so-called extended Euclid’s algorithm. Rather than simply verifying the result — as it is usually done in the mathematical community — we use Euclid’s algorithm as an interface to investigate which numbers can be written as sums of two positive squares. The precise formulation of the problem as an algorithmic problem is the key, since it allows us to use algorithmic techniques and to avoid guessing. The notion of invariance, in particular, plays a central role in our development: it is used initially to observe that Euclid’s algorithm can actually be used to represent a given number as a sum of two positive squares, and then it is used throughout the argument to prove other relevant properties. We also show how the use of program inversion techniques can make mathematical arguments more precise.
João F. Ferreira
Added 20 Jul 2010
Updated 20 Jul 2010
Type Conference
Year 2010
Where MPC
Authors João F. Ferreira
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