Bernoulli Free Boundary Problem for the Infinity Laplacian

Abstract: We study the interior Bernoulli free boundary problem for the infinity Laplacian. Our results cover existence, uniqueness, and characterization of solutions (above a threshold representing the "infinity Bernoulli constant"), their regularity, and their relationship with the solutions to the interior Bernoulli problem for the p-Laplacian.

“…Before giving the proofs of Propositions 9 and 10, we need to recall a result from our paper [9] about the Bernoulli problem (4) on convex domains (therein, also the more general case of non-convex domains is considered). We first resume a few preliminary definitions.…”

“…Indeed, if (P ) Λ admits an infinity harmonic solution, it agrees necessarily with w r Λ because its positivity set is uniquely determined by (9). To see that w r Λ is actually a solution of (P ) Λ , we observe that it has the same positivity set as v r Λ , and a Lipschitz constant not larger than v r Λ (because w r Λ has the AML property mentioned in the Introduction).…”

“…The variational p-Bernoulli constant Λ p considered by Kawohl and Daners in [10] agrees with the infimum of positive λ such that problem (14) (with Λ = 1) admits a non-constant solution. In the limit as p → +∞, Λ p does not converge to Λ ∞ (in fact, in [9] we proved that lim p→+∞ Λ p = 1/R Ω ), and this is precisely the reason why, as mentioned in Remark 7, Theorem 6 cannot be obtained by passing to the limit as p → +∞ in the isoperimetric inequality proved by Daners-Kawohl in [10]. In view of Theorem 11, one should not be surprised by the missed convergence of Λ p to Λ ∞ .…”

“…For a more precise description of the applied side, including several references, see [13,Section 2]. In our recent paper [9], we have studied the existence and uniqueness of solutions to the following 'Bernoulli problem for the ∞-laplacian'…”

“…This formula is obtained with the help of the Brunn-Minkowski inequality, and allows to compute explicitly the value of Λ Ω,∞ , at least for simple geometries. In particular, if we compare Λ Ω,∞ with the '∞-Bernoulli constant', defined in [9] by λ Ω,∞ := inf{λ > 0 : (4) admits a non-constant solution} , it turns out that Λ Ω,∞ ≥ λ Ω,∞ ; the computation on balls reveals that the inequality can be strict. Still using its geometric characterization, we prove that Λ Ω,∞ satisfies an isoperimetric inequality, namely that it is minimal on balls under a volume constraint (see Theorem 6).…”

On the supremal version of the Alt–Caffarelli minimization problem

“…Before giving the proofs of Propositions 9 and 10, we need to recall a result from our paper [9] about the Bernoulli problem (4) on convex domains (therein, also the more general case of non-convex domains is considered). We first resume a few preliminary definitions.…”

“…Indeed, if (P ) Λ admits an infinity harmonic solution, it agrees necessarily with w r Λ because its positivity set is uniquely determined by (9). To see that w r Λ is actually a solution of (P ) Λ , we observe that it has the same positivity set as v r Λ , and a Lipschitz constant not larger than v r Λ (because w r Λ has the AML property mentioned in the Introduction).…”

“…The variational p-Bernoulli constant Λ p considered by Kawohl and Daners in [10] agrees with the infimum of positive λ such that problem (14) (with Λ = 1) admits a non-constant solution. In the limit as p → +∞, Λ p does not converge to Λ ∞ (in fact, in [9] we proved that lim p→+∞ Λ p = 1/R Ω ), and this is precisely the reason why, as mentioned in Remark 7, Theorem 6 cannot be obtained by passing to the limit as p → +∞ in the isoperimetric inequality proved by Daners-Kawohl in [10]. In view of Theorem 11, one should not be surprised by the missed convergence of Λ p to Λ ∞ .…”

“…For a more precise description of the applied side, including several references, see [13,Section 2]. In our recent paper [9], we have studied the existence and uniqueness of solutions to the following 'Bernoulli problem for the ∞-laplacian'…”

“…This formula is obtained with the help of the Brunn-Minkowski inequality, and allows to compute explicitly the value of Λ Ω,∞ , at least for simple geometries. In particular, if we compare Λ Ω,∞ with the '∞-Bernoulli constant', defined in [9] by λ Ω,∞ := inf{λ > 0 : (4) admits a non-constant solution} , it turns out that Λ Ω,∞ ≥ λ Ω,∞ ; the computation on balls reveals that the inequality can be strict. Still using its geometric characterization, we prove that Λ Ω,∞ satisfies an isoperimetric inequality, namely that it is minimal on balls under a volume constraint (see Theorem 6).…”

On the supremal version of the Alt–Caffarelli minimization problem

Solenoidal extensions in domains with obstacles: explicit bounds and applications to Navier–Stokes equations

Infinity Laplacian equations with singular absorptions