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This article is cited in 12 scientific papers (total in 12 papers)
Non-existence of global solutions for higher-order evolution inequalities in unbounded cone-like domains
G. G. Laptev Steklov Mathematical Institute, Russian Academy of Sciences
Abstract:
We use the test function method developed by Mitidieri and Pohozaev to get a priori estimates and non-existence results for semi-linear “higher-order evolution inequalities” in unbounded cone-like domains. As a model we consider the problem in a cone K with the positive initial-boundary conditions
$$
\frac{\partial^ku}{\partial t^k}-\Delta u\ge|u|^q, \quad k=1,2,\dots; \quad u_{|\partial K\times[0,\infty)}\ge0, \quad \frac{\partial^{k-1}u}{\partial t^{k-1}}\biggl|_{t=0}\ge0,
$$
where $\Delta$ denotes the Laplace operator.
Key words and phrases:
Blow-up, partial differential inequalities, non-existence cone, cone-like domain.
Received: April 10, 2002
Citation:
G. G. Laptev, “Non-existence of global solutions for higher-order evolution inequalities in unbounded cone-like domains”, Mosc. Math. J., 3:1 (2003), 63–84
Linking options:
https://www.mathnet.ru/eng/mmj76 https://www.mathnet.ru/eng/mmj/v3/i1/p63
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