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Linearized stability implies asymptotic stability for radially symmetric equilibria of
p
-Laplacian boundary value problems in the unit ball in ℝ
N
Bryan Patrick Rynne
Mathematics
School of Mathematical & Computer Sciences
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peer-review
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Dive into the research topics of 'Linearized stability implies asymptotic stability for radially symmetric equilibria of
p
-Laplacian boundary value problems in the unit ball in ℝ
N
'. Together they form a unique fingerprint.
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INIS
asymptotic solutions
100%
solutions
100%
units
100%
stability
100%
laplacian
100%
boundary-value problems
100%
equilibrium
100%
symmetry
100%
bifurcation
50%
instability
33%
eigenvalues
33%
origin
16%
hypothesis
16%
curves
16%
equations
16%
Mathematics
Boundary Value Problems
100%
Asymptotic Stability
100%
Unit Ball
100%
Linearized Stability
100%
Laplace Operator
100%
Trivial Solution
75%
Principal Eigenvalue
50%
Bifurcation Point
50%
Semilinear
25%
Nontrivial Solution
25%
Parabolic
25%
Initial-Boundary Value Problem
25%
Partial Derivative
25%
Equilibrium Solution
25%