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Abstract
We present two families of lattice theta functions accompanying the
family of lattice theta functions studied by Montgomery in
[H.~Montgomery. Minimal theta functions. \textit{Glasgow Mathematical
Journal}, 30(1):75--85, 1988]. The studied theta functions are
generalizations of the Jacobi theta-2 and theta-4 functions. Contrary to
Montgomery's result, we show that, among lattices, the hexagonal lattice
is the unique maximizer of both families of theta functions. As an
immediate consequence, we obtain a new universal optimality result for
the hexagonal lattice among two-dimensional alternating charged lattices
and lattices shifted by the center of their unit cell.
Original language | English |
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Pages (from-to) | 307-341 |
Number of pages | 35 |
Journal | Journal d'Analyse Mathematique |
Volume | 149 |
Issue number | 1 |
Early online date | 5 Jan 2023 |
DOIs | |
Publication status | Published - Apr 2023 |
Austrian Fields of Science 2012
- 101002 Analysis
- 103019 Mathematical physics
- 101009 Geometry
Keywords
- Mathematics - Metric Geometry
- Mathematical Physics
- Mathematics - Classical Analysis and ODEs
- Mathematics - Number Theory