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Integral Representations and Liouville Theorems for Solutions of Periodic Elliptic Equations

✍ Scribed by Peter Kuchment; Yehuda Pinchover

Publisher
Elsevier Science
Year
2001
Tongue
English
Weight
288 KB
Volume
181
Category
Article
ISSN
0022-1236

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✦ Synopsis

The paper contains integral representations for certain classes of exponentially growing solutions of second order periodic elliptic equations. These representations are the analogs of those previously obtained by S. Agmon, S. Helgason, and other authors for solutions of the Helmholtz equation. When one restricts the class of solutions further, requiring their growth to be polynomial, one arrives to Liouville type theorems, which describe the structure and dimension of the spaces of such solutions. The Liouville type theorems previously proved by M. Avellaneda and F.-H. Lin and J. Moser and M. Struwe for periodic second order elliptic equations in divergence form are significantly extended. Relations of these theorems with the analytic structure of the Fermi and Bloch surfaces are explained.

πŸ“œ SIMILAR VOLUMES

Integral theorems for eigenfunctions of
Integral theorems for eigenfunctions of second-order elliptic differential operators
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HILBERT space L,(D) where the coefficients always fulfil the following conditions. ## i) ii) a@), q(z) E Cl(l2) and real-valued, a&) = a@), x E D, ( 7) Denoting the domain of the FRIEDRICHS extension A by D(A) we have W ) r H A . 5 mR"). 1) W#W) is the completion of Com(Rn) in the norm Ilullw&BT8