Von Neumann's elephant is a problem in recreational mathematics, consisting of constructing a planar curve in the shape of an elephant from only four fixed parameters. It originated from a discussion between physicists John von Neumann and Enrico Fermi.
In a 2004 article in the journal Nature, Freeman Dyson recounts his meeting with Fermi in 1953. Fermi evokes his friend von Neumann who, when asking him how many arbitrary parameters he used for his calculations, replied, "With four parameters I can fit an elephant, and with five I can make him wiggle his trunk." By this he meant that the Fermi simulations relied on too many input parameters, presupposing an overfitting phenomenon.[1]
Solving the problem (defining four complex numbers to draw an elephantine shape) subsequently became an active research subject of recreational mathematics. A 1975 attempt through least-squares function approximation required dozens of terms.[2] An approximation using four parameters was found by three physicists in 2010.[3]
The construction is based on complex Fourier analysis.
The curve found in 2010 is parameterized by:
\left\lbrace \begin{array}{lcccccc} x(t)&=&-60\cos(t)&+30\sin(t)&-8\sin(2t)&+10\sin(3t)\ y(t)&=&50\sin(t)&+18\sin(2t)&-12\cos(3t)&+14\cos(5t) \end{array} \right.
The four fixed parameters used are complex, with affixes,,, .The affix point is added to make the eye of the elephant and this value serves as a parameter for the movement of the "trunk".[3]