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Lack of Sphere Packing of Graphs via Non-Linear Potential Theory

It is shown that there is no quasi-sphere packing of the lattice grid Z^{d+1} or a co-compact hyperbolic lattice of H^{d+1} or the 3-regular tree \times Z, in R^d, for all d. A similar result is proved for some other graphs too. Rather than using a direct geometrical approach, the main tools we are using are from non-linear potential theory.

preprint2010arXivOpen access
Itai BenjaminiOded Schramm
math.COmath.MG
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Itai BenjaminiOded Schramm

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