Pell's equation, sum-of-squares and equilibrium measures on a compact set

We first interpret Pell's equation satisfied by Chebyshev polynomials for each degree t, as a certain Positivstellensatz, which then yields for each integer t, what we call a generalized Pell's equation, satisfied by reciprocals of Christoffel functions of "degree" 2t, associated with the equilibrium measure mu of the interval [-1,1] and the measure (1 - x(2))d mu. We next extend this point of view to arbitrary compact basic semialgebraic set S subset of R-n and obtain a generalized Pell's equation (by analogy with the interval [-1,1]). Under some conditions, for each t the equation is satisfied by reciprocals of Christoffel functions of "degree" 2t associated with (i) the equilibriummeasure mu of S and (ii), measures gd mu for an appropriate set of generators g of S. These equations depend on the particular choice of generators that define the set S. In addition to the interval [-1,1], we show that for t = 1, 2, 3, the equations are indeed also satisfied for the equilibrium measures of the 2D-simplex, the 2D-Euclidean unit ball and unit box. Interestingly, this view point connects orthogonal polynomials, Christoffel functions and equilibrium measures on one side, with sum-of-squares, convex optimization and certificates of positivity in real algebraic geometry on another side.