Aggregation-diffusion to constrained interaction: Minimizers & gradient flows in the slow diffusion limit

Abstract: Inspired by recent work on minimizers and gradient flows of constrained interaction energies, we prove that these energies arise as the slow diffusion limit of well-known aggregation-diffusion energies. We show that minimizers of aggregation-diffusion energies converge to a minimizer of the constrained interaction energy and gradient flows converge to a gradient flow. Our results apply to a range of interaction potentials, including singular attractive and repulsive-attractive power-law potentials. In the proc… Show more

“…Finally, provided that sufficient a priori estimates hold along the flow, gradient flows of the regularized energies converge to the solution of the aggregation diffusion equation with initial data ρ 0 as ε → 0 and d 2 (ρ N 0 , ρ 0 ) → 0. More recently, Craig and Topaloglu have demonstrates numerically that this method also provides a robust approach for simulating aggregation diffusion equations, by sending the diffusion exponent m → +∞ as the regularization and the discretization of the initial data are refined [82].…”

“…We begin in section 5.1 by describing the details of our numerical implementation, which include various refinements over previous works, such as regridding to reduce the number of particles required for convergence [55,82]. In section 5.2, we provide several numerical examples of the slow diffusion limit and properties of the constrained aggregation equation, particularly critical mass behavior relating to open problems in geometric shape optimization [34,82,91]. In section 5.3, we give numerical examples illustrating the relationship between singular limits and metastability behavior, both as aggregation becomes localized and as diffusion vanishes.…”

“…On the other hand, if the interaction potential is a repulsive-attractive power-law potential (2) for A ≥ 2 − d, Carrillo and Wang prove a global-in-time L ∞ bound for all m ≥ 1, under the assumption that solutions exist locally in time [70]. General well-posedness results were recently obtained by Craig and Topaloglu, without any assumptions on the specific structure of the attractive and repulsive parts of the interaction potential [82]. In particular, under weak regularity assumptions on the interaction potential, which roughly correspond to being no more singular than the Newtonian potential, they prove that solutions of aggregation diffusion equations exist and provide sufficient conditions for global in time uniqueness.…”

“…More recently, Craig and Topaloglu [82] proved that minimizers and gradient flows of E m do converge to minimizers and gradient flows of E ∞ in the m → ∞ limit for a general class of interaction potentials W , including both attractive and repulsive-attractive power-law potentials with singularity up to and including the Newtonian potential. This work was largely inspired by the following related question in geometric shape optimization: can we characterize set-valued or patch minimizers E ∞ , i.e.…”

“…In the fluids community, it is well known that this relationship (25) between the interparticle distance and the regularization needs to hold globally in time for the numerical simulation to agree well with exact solutions. In previous work on aggregation and aggregation diffusion equations [55,79,82], this was accomplished by taking the spatial discretization h very small. In the present work, we accomplish this by using the formula for the approximate density (24) to re-initialize our particle approximation (20) whenever the maximum interparticle distance exceeds 1.5h.…”

Aggregation-Diffusion Equations: Dynamics, Asymptotics, and Singular Limits

“…Finally, provided that sufficient a priori estimates hold along the flow, gradient flows of the regularized energies converge to the solution of the aggregation diffusion equation with initial data ρ 0 as ε → 0 and d 2 (ρ N 0 , ρ 0 ) → 0. More recently, Craig and Topaloglu have demonstrates numerically that this method also provides a robust approach for simulating aggregation diffusion equations, by sending the diffusion exponent m → +∞ as the regularization and the discretization of the initial data are refined [82].…”

“…We begin in section 5.1 by describing the details of our numerical implementation, which include various refinements over previous works, such as regridding to reduce the number of particles required for convergence [55,82]. In section 5.2, we provide several numerical examples of the slow diffusion limit and properties of the constrained aggregation equation, particularly critical mass behavior relating to open problems in geometric shape optimization [34,82,91]. In section 5.3, we give numerical examples illustrating the relationship between singular limits and metastability behavior, both as aggregation becomes localized and as diffusion vanishes.…”

“…On the other hand, if the interaction potential is a repulsive-attractive power-law potential (2) for A ≥ 2 − d, Carrillo and Wang prove a global-in-time L ∞ bound for all m ≥ 1, under the assumption that solutions exist locally in time [70]. General well-posedness results were recently obtained by Craig and Topaloglu, without any assumptions on the specific structure of the attractive and repulsive parts of the interaction potential [82]. In particular, under weak regularity assumptions on the interaction potential, which roughly correspond to being no more singular than the Newtonian potential, they prove that solutions of aggregation diffusion equations exist and provide sufficient conditions for global in time uniqueness.…”

“…More recently, Craig and Topaloglu [82] proved that minimizers and gradient flows of E m do converge to minimizers and gradient flows of E ∞ in the m → ∞ limit for a general class of interaction potentials W , including both attractive and repulsive-attractive power-law potentials with singularity up to and including the Newtonian potential. This work was largely inspired by the following related question in geometric shape optimization: can we characterize set-valued or patch minimizers E ∞ , i.e.…”

“…In the fluids community, it is well known that this relationship (25) between the interparticle distance and the regularization needs to hold globally in time for the numerical simulation to agree well with exact solutions. In previous work on aggregation and aggregation diffusion equations [55,79,82], this was accomplished by taking the spatial discretization h very small. In the present work, we accomplish this by using the formula for the approximate density (24) to re-initialize our particle approximation (20) whenever the maximum interparticle distance exceeds 1.5h.…”

Aggregation-Diffusion Equations: Dynamics, Asymptotics, and Singular Limits

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