Semilinear cooperative elliptic systems on Rn
We study here the following semilinear cooperative elliptic system defined on IRn , n > 2 : (1 – a) −∆u = aρ(x)u + bρ(x)v + f(x, u, v) x ∈ IRn , (1 – b) −∆v = cρ(x)u + dρ(x)v + g(x, u, v) x ∈ IRn , (1 – c) u −→ 0 , v −→ 0 as |x| −→ +∞. Here a, b, c, d are constants such that b, c > 0 ; ρ, f an...
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| Published in: | Rendiconti di matematica e delle sue applicazioni (1981) Vol. 15; no. 1; pp. 89 - 108 |
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| Main Authors: | , |
| Format: | Journal Article |
| Language: | English |
| Published: |
Sapienza Università Editrice
01-01-1995
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| Subjects: | |
| Online Access: | Get full text |
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| Summary: | We study here the following semilinear cooperative elliptic system defined on IRn , n > 2 : (1 – a) −∆u = aρ(x)u + bρ(x)v + f(x, u, v) x ∈ IRn , (1 – b) −∆v = cρ(x)u + dρ(x)v + g(x, u, v) x ∈ IRn , (1 – c) u −→ 0 , v −→ 0 as |x| −→ +∞. Here a, b, c, d are constants such that b, c > 0 ; ρ, f and g are given functions; ρ is nonnegative and tends to 0 at ∞. We first establish necessary and sufficient conditions on the coefficients for having a Maximum Principle for the linear System. Then we show that these conditions ensure existence of solutions for the linear System and for the semilinear System when f and g satisfy some ”sublinear” condition. Under some additional assumption we also derive uniqueness of the solutions. Finally we show that our results can be extended to N × N systems, N > 2. |
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| ISSN: | 1120-7183 2532-3350 |