Russian Journal of General Chemistry.
Vol. 90.
2020.
P. 1869-1877
Blow-up and global solubility in the classical sense of the Cauchy problem for a formally hyperbolic equation with a non-coercive source
We consider an abstract Cauchy problem with non-linear operator coefficients and prove the existence of a unique non-extendable classical solution. Under certain sufficient close-to-necessary conditions, we obtain finite-time blow-up conditions and upper and lower bounds for the blow-up time. Moreover, under certain sufficient close-to-necessary conditions, we obtain a result on the existence of a global-in-time solution independently of the size of the initial functions. © 2020 Russian Academy of Sciences (DoM) and London Mathematical Society.
Authors
Korpusov M.O.
1,
2
Journal
Publisher
Institute of Physics Publishing
Number of issue
5
Language
English
Pages
930-959
Status
Published
Link
DOI
Volume
84
Year
2020
Organizations
- 1 Moscow State University, Russian Federation
- 2 People's Friendship University of Russia, Moscow, Russian Federation
Keywords
Blow-up; Bounds for the blow-up time; Local solubility; Non-linear capacity; Non-linear Sobolev-type equations
Date of creation
20.04.2021
Date of change
20.04.2021
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