A Ginzburg–Landau Type Energy with Weight and with Convex Potential Near Zero
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In this paper, we study the asymptotic behavior of minimizing solutions of a Ginzburg–Landau type functional with a positive weight and with convex potential near 0 and we estimate the energy in this case. We also generalize a lower bound for the energy of unit vector field given initially by Brezis–Merle–Rivière.
2019 ◽
Vol 28
(12)
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pp. 1950071
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2008 ◽
Vol 84
(2)
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pp. 155-162
1986 ◽
Vol 61
(1)
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pp. 177-192
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2012 ◽
Vol 370
(1965)
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pp. 1730-1739
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