Time estimates for the Cauchy problem for a third-order hyperbolic equation
2003 ◽
Vol 2003
(17)
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pp. 1073-1081
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Keyword(s):
A classical solution is considered for the Cauchy problem:(utt−Δu)t+utt−αΔu=f(x,t),x∈ℝ3,t>0;u(x,0)=f0(x),ut(x,0)=f1(x), andutt(x)=f2(x),x∈ℝ3, whereα=const,0<α<1. The above equation governs the propagation of time-dependent acoustic waves in a relaxing medium. A classical solution of this problem is obtained in the form of convolutions of the right-hand side and the initial data with the fundamental solution of the equation. Sharp time estimates are deduced for the solution in question which show polynomial growth for small times and exponential decay for large time whenf=0. They also show the time evolution of the solution whenf≠0.
2017 ◽
pp. 303-317
Keyword(s):
2016 ◽
Vol 36
(5)
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pp. 1419-1432
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1998 ◽
Vol 34
(3)
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pp. 249-270
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2012 ◽
Vol 17
(5)
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pp. 630-641
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Keyword(s):
2011 ◽
Vol 21
(05)
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pp. 1007-1025
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Keyword(s):
2018 ◽
Vol 62
(4)
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pp. 391-397
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Keyword(s):