<oai_dc:dc xmlns:oai_dc="http://www.openarchives.org/OAI/2.0/oai_dc/" xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xsi:schemaLocation="http://www.openarchives.org/OAI/2.0/oai_dc/ http://www.openarchives.org/OAI/2.0/oai_dc.xsd">
<dc:title>Boundedness of global solutions for a supercritical semilinear heat equation and its application</dc:title>
<dc:creator>Noriko Mizoguchi</dc:creator>
<dc:subject>35K20</dc:subject><dc:subject>35K55</dc:subject><dc:subject>58K57</dc:subject><dc:subject>supercritical nonlinearity</dc:subject><dc:subject>global solution</dc:subject><dc:subject>type II blowup</dc:subject>
<dc:description>We consider a Cauchy problem and a Cauchy-Dirichlet problem in a ball in $\R^N$ for a semilinear heat equation \[ u_t=\Delta u+u^p \] with radially symmetric nonnegative initial data. Let \[ p&gt;\frac{N-2\sqrt{N-1}}{N-4-2\sqrt{N-1}}\quad\mbox{and}\quad N\geq11. \] It is proved that if $u$ is a global solution of the Cauchy problem with initial data satisfying a condition near infinity, then there exists a positive constant $C$ such that $|u(t)|_{\infty}\leq C$ for all $t\geq0$. The uniform boundedness of solutions for the Cauchy-Dirichlet problem in a ball is also given. The result is used to show the existence of a solution for the Cauchy-Dirichlet problem in a ball which exhibits the type II blowup.</dc:description>
<dc:publisher>Indiana University Mathematics Journal</dc:publisher>
<dc:date>2005</dc:date>
<dc:type>text</dc:type>
<dc:format>pdf</dc:format>
<dc:identifier>10.1512/iumj.2005.54.2694</dc:identifier>
<dc:source>10.1512/iumj.2005.54.2694</dc:source>
<dc:language>en</dc:language>
<dc:relation>Indiana Univ. Math. J. 54 (2005) 1047 - 1060</dc:relation>
<dc:coverage>state-of-the-art mathematics</dc:coverage>
<dc:rights>http://iumj.org/access/</dc:rights>
</oai_dc:dc>