In this paper we introduce the notion of parabolic α-Riesz flow, for α ∈ (0, d), extending the notion of s-fractional heat flows to negative values of the parameter s=−α2. Then, we determine the limit behaviour of these gradient flows as α → 0+ and α → d−. To this end we provide a preliminary Γ-convergence expansion for the Riesz interaction energy functionals. Then we apply abstract stability results for uniformly λ-convex functionals which guarantee that Γ-convergence commutes with the gradient flow structure.
Parabolic α-Riesz flows and limit cases α → 0+, α → d− / De Luca, Lucia; Morini, Massimiliano; Ponsiglione, Marcello; Spadaro, Emanuele. - In: JOURNAL D'ANALYSE MATHEMATIQUE. - ISSN 0021-7670. - (2025). [10.1007/s11854-025-0400-5]
Parabolic α-Riesz flows and limit cases α → 0+, α → d−
De Luca, Lucia;Morini, Massimiliano;Ponsiglione, Marcello
;Spadaro, Emanuele
2025
Abstract
In this paper we introduce the notion of parabolic α-Riesz flow, for α ∈ (0, d), extending the notion of s-fractional heat flows to negative values of the parameter s=−α2. Then, we determine the limit behaviour of these gradient flows as α → 0+ and α → d−. To this end we provide a preliminary Γ-convergence expansion for the Riesz interaction energy functionals. Then we apply abstract stability results for uniformly λ-convex functionals which guarantee that Γ-convergence commutes with the gradient flow structure.| File | Dimensione | Formato | |
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