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A gömböc is a $3$-dimensional convex body (having uniform density) which has exactly one stable and one instable equilbrium position (see https://en.wikipedia.org/wiki/G%C3%B6mb%C3%B6c). Such a convex body keeps its properties under tiny perturbations. There exists thus a gömböc given by algebraic equations. What is the simplest (small degree and small coefficients) polynomial $P(x,y,z)\in\mathbb R^3$ such that $P(x,y,z)\leq 0$ defines a gömböc?

Added after Stopple's remarks (1 2): Existence of an algebraic gömböc is not obvious. I should have asked first for existence.

Two other questions concerning these objects are:

Is the set of all (algebraic) gömböcs connected?

Are there any gömböcs in dimension $>3$? (There are none in dimension $2$, every $2$-dimensional convex set has at least $4$ equilibrium points.)

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    $\begingroup$ Where you claim "Such a convex body keeps its properties under tiny perturbations", the wikipedia page actually seems to say the opposite: "The shape of those bodies is very sensitive to small variation." So why should there be any algebraic solutions? $\endgroup$
    – Stopple
    Commented Apr 6, 2011 at 18:56
  • $\begingroup$ Thank you, Anton. Concerning Stopple's comment, I do not see any contradiction: tiny can be very tiny! $\endgroup$ Commented Apr 6, 2011 at 19:06
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    $\begingroup$ I don't mean to sound argumentative, but I don't see why there are algebraic solutions. Neither wikipedia, nor the Math Intelligencer article wikipedia references, refer to any. $\endgroup$
    – Stopple
    Commented Apr 6, 2011 at 23:11
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    $\begingroup$ Semi-algebraic sets, are, however, doable, as I remark in my answer. $\endgroup$ Commented Apr 7, 2011 at 6:28
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    $\begingroup$ After reflexion, I think algebraic gömböcs exist if there exist gömböcs whose two equilibrium positions correspond to points are sufficiently differentiable with strictly positive scalar curvature, then one can find algebraic surfaces which match such gömböcs up to sufficiently high order (I guess order 2 should be enough) and which are close enough elsewhere. I have the impression that the gömböcs given in the proof by Domokos and Varkonyi satisfy these conditions (they are very tiny perturbations of spheres). The problem of convexity is however left and has also to be solved. $\endgroup$ Commented Apr 7, 2011 at 9:03

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Aside from the last question, about high-dimensional gömböcs, these questions are certain to all be open, and are also totally inaccessible via the methods of Domokos and Várkonyi (who invented the gömböc and proved that it satisfied the constraints of Arnold's conjecture). For reference, here is their paper Static Equilibria of Rigid Bodies: Dice, Pebbles, and the Poincaré–Hopf Theorem (DOI 10.1007/s00332-005-0691-8). To address Stopple's comment the paper uses throughout the stability of the desired properties (being a gömböc) under small perturbations, so there are semi-algebraic gömböcs (albeit likely very complicated ones, whose geometry is unlikely to be in any way revealing).

I went to a talk a couple years ago by Domokos and Várkonyi, where they described their methods and listed some of their conjectures. As I understood it at the time, they found the gömböc (and certain other shapes with the same equilibrium properties, albeit with much less deviation from a sphere) essentially by guessing a form for the solution, and then doing a search by computer within the limited parameter space this guess gave them. Certainly the first two questions you ask (about algebraicity of gömböcs and connectivity of the space of algebraic gömböcs) are inaccessible via this method. Indeed, Domokos and Várkonyi do not even have reasonable conjectures as to the minimal number of faces in a polyhedral gömböc, as I recall; their best candidate has many thousands of faces.

I will sketch what I believe to be an answer to your last question, which I'd say is the most interesting of the three you ask (why are algebraic gömböcs better than, say, piecewise smooth gömböcs?).

High-Dimensional Gömböcs Exist

The idea is to take proceed by induction; take an $n$-dimensional gömböc and revolve it around the axis connecting its two equilibria. It's not hard to convince yourself that this is a gömböc; I'll be a bit more explicit, albeit still a bit sketchy.

Let $G$ be a gömböc and $L$ the line passing through the two equilibria of $G$—say $G$ is good if for $x\in L$, the cross-section of $G$ perpendicular to $L$ at $x$ contains $x$, or is empty; note that Domokos and Várkonyi's gömböc is good (in fact it is easy to see that any gömböc is good, but I don't feel like proving this). I claim that if a good gömböc exists in dimension $n$, a good gömböc exists in dimension $n+1$, which suffices by induction. Indeed, place an $n$-dimensional gömböc $G^n$ in $\mathbb{R}^{n+1}$, and let $L$ be the line passing through the two equilibria (called $S$ and $U$, for stable and unstable). Let $G^{n+1}$ be the body formed by revolving $G^n$ about $L$. Then $G^{n+1}$ clearly is convex (by goodness of $G^n$) and has a stable equilibrium at $S$ and an unstable equilibrium at $U$. We must check that it has no other equilibria. But this is clear; indeed, any point on the surface of $G^{n+1}$ other than $S$ or $U$ belongs to some rotated copy of $G^n$, in which it is not an equilibrium point; thus it is not an equilibrium point of $G^{n+1}$. Goodness of $G^{n+1}$ is clear.

Note that there is an interesting question asked in the Domokos/Várkonyi paper, which they answer in dimension 3; namely which configurations of stable and unstable equilibria are permissible among convex homogenous solids? They show that given some convex homogenous solid, they can make small local modifications to add points of equilibria, without affecting other equilibria. It seems to me that their methods generalize to $k$ dimensions straightforwardly, so by producing a high-dimensional gömböc we have also shown that we may have as many stable and unstable equilibrium points as we desire, as long as there is one of each.

Unfortunately Domokos and Várkonyi have not addressed a slightly more subtle question; namely, there are various types of unstable equilibria (e.g. saddles) which may be classified as follows: consider the vector field on a (smooth) gömböc whose value at a point is the force exerted on the gömböc when it is resting on that point; equilibria are points where the vector field vanishes. Then the signature of the derivative of this vector field gives a reasonable classification of equilibria, assuming they are isolated. It would be interesting to know what are the permissible configurations of these slightly more refined equilibria.

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