A metric of mutual energy and unlikely intersections for dynamical systems
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🧮 math.NT
math.DS
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energymetricdynamicalintersectionsmutualsystemsunlikelyadelic
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We introduce a metric of mutual energy for adelic measures associated to the Arakelov-Zhang pairing. Using this metric and potential theoretic techniques involving discrete approximations to energy integrals, we prove an effective bound on a problem of Baker and DeMarco on unlikely intersections of dynamical systems, specifically, for the set of complex parameters $c$ for which $z=0$ and $1$ are both preperiodic under iteration of $f_c(z)=z^2 + c$.
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