Classifying Minimum Energy States for Interacting Particles: Regular Simplices
Densities of particles on R n which interact pairwise through an attractive-repulsive power-law potential W α , β ( x ) = | x | α / α - | x | β / β have often been used to explain patterns produced by biological and physical systems. In the mildly repulsive regime α > β ≥ 2 with n ≥ 2 , we show t...
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Veröffentlicht in: | Communications in mathematical physics 2023-04, Vol.399 (2), p.577-598 |
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Format: | Artikel |
Sprache: | eng |
Schlagworte: | |
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Zusammenfassung: | Densities of particles on
R
n
which interact pairwise through an attractive-repulsive power-law potential
W
α
,
β
(
x
)
=
|
x
|
α
/
α
-
|
x
|
β
/
β
have often been used to explain patterns produced by biological and physical systems. In the mildly repulsive regime
α
>
β
≥
2
with
n
≥
2
, we show there exists a decreasing homeomorphism
α
Δ
n
from [2, 4] to itself such that: distributing the particles uniformly over the vertices of a regular unit diameter
n
-simplex minimizes the potential energy if and only if
α
≥
α
Δ
n
(
β
)
. Moreover this minimum is uniquely attained up to rigid motions when
α
>
α
Δ
n
(
β
)
. We estimate
α
Δ
n
(
β
)
above and below, and identify its limit as the dimension grows large. These results are derived from a new northeast comparison principle in the space of exponents. At the endpoint
(
α
,
β
)
=
(
4
,
2
)
of this transition curve, we characterize all minimizers by showing they lie on a sphere and share all first and second moments with the spherical shell. Suitably modified versions of these statements are also established (i) for
W
α
,
β
and corresponding energies in the case where
n
=
1
, and (ii) for the attractive-repulsive potentials
D
α
(
x
)
=
|
x
|
α
(
α
log
|
x
|
-
1
)
that arise in the limit
β
↗
α
. |
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ISSN: | 0010-3616 1432-0916 |
DOI: | 10.1007/s00220-022-04564-x |