On Riemannian manifolds with negative sectional curvature, we study finite time blow-up and global existence of solutions to semilinear parabolic equations, where the power nonlinearity is multiplied by a time-dependent positive function h(t). We show that depending on the behavior at infinity of h, either every solution blows up in finite time, or a global solution exists, if the initial datum is small enough. In particular, if h≡1 we have global existence for small initial data, whereas for h(t)=eαt a Fujita-type phenomenon appears for certain values of α>0. A key role will be played by the infimum of the L2-spectrum of the operator -δ on M.
Blow-up of solutions to semilinear parabolic equations on Riemannian manifolds with negative sectional curvature / F. Punzo. - In: JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS. - ISSN 0022-247X. - 387:2(2012), pp. 815-827.
Blow-up of solutions to semilinear parabolic equations on Riemannian manifolds with negative sectional curvature
F. Punzo
2012
Abstract
On Riemannian manifolds with negative sectional curvature, we study finite time blow-up and global existence of solutions to semilinear parabolic equations, where the power nonlinearity is multiplied by a time-dependent positive function h(t). We show that depending on the behavior at infinity of h, either every solution blows up in finite time, or a global solution exists, if the initial datum is small enough. In particular, if h≡1 we have global existence for small initial data, whereas for h(t)=eαt a Fujita-type phenomenon appears for certain values of α>0. A key role will be played by the infimum of the L2-spectrum of the operator -δ on M.
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