Classification and probabilistic representation of the positive solutions of a semilinear elliptic equation
We are concerned with the nonnegative solutions of $\Delta u = u^2$ in a bounded and smooth domain in $\mathbb{R}^d$. We prove that they are uniquely determined by their fine trace on the boundary as defined in [DK98a], thus answering a major open question of [Dy02]. In this title, a probabilistic f...
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| Main Author | |
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| Format | eBook Book |
| Language | English |
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Providence, R.I
American Mathematical Society
2004
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| Edition | 1 |
| Series | Memoirs of the American Mathematical Society |
| Subjects | |
| Online Access | Get full text |
| ISBN | 9780821835098 0821835092 |
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| Summary: | We are concerned with the nonnegative solutions of $\Delta u = u^2$ in a bounded and smooth domain in $\mathbb{R}^d$. We prove that they are uniquely determined by their fine trace on the boundary as defined in [DK98a], thus answering a major open question of [Dy02]. In this title, a probabilistic formula for a solution in terms of its fine trace and of the Brownian snake is also provided. A major role is played by the solutions which are dominated by a harmonic function in $D$. The latters are called moderate in Dynkin's terminology. We show that every nonnegative solution of $\Delta u = u^2$ in $D$ is the increasing limit of moderate solutions. |
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| Bibliography: | March 2004, volume 168, number 798 (third of 4 numbers). Includes bibliographical references (p. 115-117) and indexes |
| ISBN: | 9780821835098 0821835092 |