Litcius/Paper detail

Stability with explicit constants of the critical points of the fractional Sobolev inequality and applications to fast diffusion

Nicola De Nitti, Tobias König

2023Journal of Functional Analysis11 citationsDOIOpen Access PDF

Abstract

We study the quantitative stability of critical points of the fractional Sobolev inequality. We show that, for a non-negative function u ∈ H ˙ s ( R N ) whose energy satisfies 1 2 S N , s N 2 s ≤ ‖ u ‖ H ˙ s ( R N ) ≤ 3 2 S N , s N 2 s , where S N , s is the optimal Sobolev constant, the bound ‖ u − U [ z , λ ] ‖ H ˙ s ( R N ) ≲ ‖ ( − Δ ) s u − u 2 s ⁎ − 1 ‖ H ˙ − s ( R N ) , holds for a suitable fractional Talenti bubble U [ z , λ ] . For functions u which are close to Talenti bubbles, we give the sharp asymptotic value of the implied constant in this inequality. As an application of this, we derive an explicit polynomial extinction rate for positive solutions to a fractional fast diffusion equation.

Topics & Concepts

MathematicsSobolev spaceConstant (computer programming)PolynomialMathematical analysisFunction (biology)Upper and lower boundsStability (learning theory)DiffusionSobolev inequalityPhysicsThermodynamicsProgramming languageEvolutionary biologyMachine learningBiologyComputer scienceNonlinear Partial Differential EquationsAdvanced Mathematical Modeling in EngineeringNonlinear Differential Equations Analysis