There is a constant for ellipses (http://www.physicsmathforums.com/showthread.php?t=107), as Pi is a constant for circles, such that the relationship of every structural part, to one another, for any ellipse, is constant.

This relationship of the structural parts of an ellipse is the crux, with relativity, of Triquametric motion (http://www.physicsmathforums.com/showthread.php?t=101) that underlies the motion of all phenomena. And, which logically rationalizes the enigmas of standard paradigms, including number theory, to reconcile with observation.

There is a structural part (such as the perigee, minor diameter, etc.) of every ellipse that is a constant; and which, has an integer value. It is this constant that establishes a "Proof of One," (http://www.physicsmathforums.com/showthread.php?t=165) which was sought by Kurt Gödel (http://www.usna.edu/Users/math/meh/godel.html).

This constant is such that, for every elliptical shape, all structural parts are the same simple algebraic relationship to one another . . . regardless of any given size for any given part.

That is: for example; every focal length, for any ellipse, has the same relationship to the minor diameter when a particular part is set to the Elliptical Constant (http://www.physicsmathforums.com/showthread.php?t=107).

Such a constant has particular significance for the natural scale of numbers; and, directly affects the enigmas of number theory, SR, GR, and ST.

Maybe even MDT??? :)