Polynomial potential minimization on the unit circle

Abstract

In the following, we study the minimization of polynomial potentials f(t) on the unit circle, where the potentials take the form \[ f(t) = Σi=1n bi x2i, bi ∈ R. \] This form arises in the context of truncations of expansions of p -frame potentials. One approach to minimize these potentials involves rewriting the integral as a sum of integrals obtained by expanding the potential f(t) = Σi=1n ci Ti(t) in terms of Chebyshev polynomials. By replacing the inner product x, y with (θx, y) , we can reformulate the original problem as: \[ μ ∈ P(T) ∫T ∫T f( x, y ) dμ(x) dμ(y) \] as an equivalent form: \[ ∈ P([-π, π]) Σi=1n ci ∫-ππ ∫-ππ (n(x - y)) d(x) d(y) \].

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