We consider the solution of the torsion problem $-\Delta u=1$ in $\Omega$ and
$u=0$ on $\partial \Omega$. Serrin's celebrated symmetry theorem states that,
if the normal derivative $u_\nu$ is constant on $\partial \Omega$, then
$\Omega$ must be a ball. In a recent paper, it has been conjectured that
Serrin's theorem may be obtained {\it by stability} in the following way:
first, for the solution $u$ of the torsion problem prove the estimate $$
r_e-r_i\leq C_t\,\Bigl(\max_{\Gamma_t} u-\min_{\Gamma_t} u\Bigr) $$ for some
constant $C_t$ depending on $t$, where $r_e$ and $r_i$ are the radii of an
annulus containing $\partial\Omega$ and $\Gamma_t$ is a surface parallel to
$\partial\Omega$ at distance $t$ and sufficiently close to $\partial\Omega$;
secondly, if in addition $u_\nu$ is constant on $\partial\Omega$, show that $$
\max_{\Gamma_t} u-\min_{\Gamma_t} u=o(C_t)\ \mbox{as} \ t\to 0^+. $$ In this
paper, we analyse a simple case study and show that the scheme is successful if
the admissible domains $\Omega$ are ellipses

Ciraolo, Giulio

Magnanini, Rolando

English

arXiv

Giulio Ciraolo

Rolando Magnanini

Crossref

Kodai Mathematical Journal

A note on Serrin's overdetermined problem

We consider the solution of the torsion problem
-Delta u = N in Omega, u = 0 on partial derivative Omega,
where Omega is a bounded domain in R-N.
Serrin's celebrated symmetry theorem states that, if the normal derivative u(v) is constant on partial derivative Omega, then Omega must be a ball. In [6], it has been conjectured that Serrin's theorem may be obtained by stability in the following way: first, for the solution u of the torsion problem prove the estimate
r(e) - r(i) &lt;= Ct (max(Gamma i) u - min(Gamma i) u)
for some constant C-t depending on t, where r(e) and r(i) are the radii of an annulus containing partial derivative Omega and Gamma i is a surface parallel to partial derivative Omega at distance t and sufficiently close to partial derivative Omega; secondly, if in addition u(v) is constant on partial derivative Omega, show that
max(Gamma i) u - min(Gamma i) u = o(C-t) as t -&gt; 0(+).
The estimate constructed in [6] is not sharp enough to achieve this goal. In this paper, we analyse a simple case study and show that the scheme is successful if the admissible domains Omega are ellipses

Ciraolo G

Magnanini R

AIR Universita degli studi di Milano

A note on Serrin’s overdetermined problem

CIRAOLO, Giulio

Magnanini, R.

Archivio istituzionale della ricerca - Università di Palermo

Florence Research

arXiv:1401.4385v1  [math.AP]  17 Jan 2014A NOTE ON SERRIN’S OVERDETERMINED PROBLEMGIULIO CIRAOLO AND ROLANDO MAGNANINIAbstract. We consider the solution of the torsion problem−∆u = 1 in Ω, u = 0 on ∂Ω.Serrin’s celebrated symmetry theorem states that, if the normal de-rivative uν is constant on ∂Ω, then Ω must be a ball. In [6], it has beenconjectured that Serrin’s theorem may be obtained by stability in thefollowing way: first, for the solution u of the torsion problem prove theestimatere − ri ≤ Ct(maxΓtu−minΓtu)for some constant Ct depending on t, where re and ri are the radii ofan annulus containing ∂Ω and Γt is a surface parallel to ∂Ω at distancet and sufficiently close to ∂Ω; secondly, if in addition uν is constant on∂Ω, show thatmaxΓtu−minΓtu = o(Ct) as t→ 0+.The estimate constructed in [6] is not sharp enough to achieve thisgoal. In this paper, we analyse a simple case study and show that thescheme is successful if the admissible domains Ω are ellipses.1. IntroductionLet Ω be a bounded domain in RN and let u be the solution of the torsionproblem(1.1) −∆u = 1 in Ω, u = 0 on ∂Ω.Serrin’s celebrated symmetry theorem [10] states that, if there exists a solu-tion of (1.1) whose (exterior) normal derivative uν is constant on ∂Ω, thatis such that(1.2) uν = c on ∂Ω,then Ω is a ball and u is radially symmetric.As is well-known, the proof of Serrin makes use of the method of movingplanes (see [10, ?]), a refinement of Alexandrov’s reflection principle [2].The aim of this note is to probe the feasibility of a new proof of Ser-rin’s symmetry theorem based on a comparison with another overdeterminedproblem for (1.1). In fact, it has been noticed that, under certain sufficientconditions on ∂Ω, if the solution of (1.1) is constant on a surface parallel to∂Ω, that is, if for some small t > 0(1.3) u = k on Γt, where Γt = {x ∈ Ω : dist(x, ∂Ω) = t},1991 Mathematics Subject Classification. Primary 35B06, 35J05, 35J61; Secondary35B35, 35B09.Key words and phrases. Serrin’s problem, Parallel surfaces, overdetermined problems,method of moving planes, stability.12 G. CIRAOLO AND R. MAGNANINIthen Ω must be a ball (see [8, 9, 6] and [11]).Condition (1.3) was first studied in [8] (see also [9] and [5] for further de-velopments), motivated by an investigation on time-invariant level surfacesof a nonlinear non-degenerate fast diffusion equation (tailored upon the heatequation), and was used to extend to nonlinear equations the symmetry re-sults obtained in [7] for the heat equation. The proof still hinges on themethod of moving planes, that can be applied in a much simplified manner,since the overdetermination in (1.3) takes place inside Ω. Under slightlydifferent assumptions and by a different proof — still based on the methodof moving planes — a similar result was obtained in [11] independently.The evident similarity between the two problems arouses a natural ques-tion: is condition (1.3) weaker or stronger than (1.2)?As pointed out in [6], (1.3) seems to be weaker than (1.2), as explained bythe following two observations: (i) as (1.3) does not imply (1.2), the lattercan be seen as the limit of a sequence of conditions of type (1.3) with k = knand t = tn and kn and tn vanishing as n → ∞; (ii) as (1.2) does not imply(1.3) either, if u satisfies (1.1)–(1.2), then the oscillation of u on a surfaceparallel to the boundary becomes smaller than usual, the closer the surfaceis to ∂Ω. More precisely, if u ∈ C1(Ω), by a Taylor expansion argument, itis easy to verify that(1.4) maxΓtu−minΓtu = o(t) as t→ 0— that becomes a O(t2) as t→∞ when u ∈ C2(Ω).This remark suggests the possibility that Serrin’s symmetry result maybe obtained by stability in the following way: first, for the solution u of thetorsion problem (1.1) prove the estimate(1.5) re − ri ≤ Ct(maxΓtu−minΓtu)for some constant Ct depending on t, where re and ri are the radii of anannulus containing ∂Ω; secondly, if in addition uν is constant on ∂Ω, showthatmaxΓtu−minΓtu = o(Ct) as t→ 0+.In the same spirit of (1.5), based on [1], in [6] we proved an estimate thatquantifies the radial symmetry of Ω in terms of the following quantity:(1.6) [u]Γt = supz,w∈Γtz 6=w|u(z) − u(w)||z −w|.In fact, it was proved that there exist two constants ε, Ct > 0 such that, if[u]Γt ≤ ε, then there are two concentric balls Bri and Bre such thatBri ⊂ Ω ⊂ Bre and re − ri ≤ Ct [u]Γt .(1.7)The constant Ct only depends on t, N , the regularity of ∂Ω and the diameterof Ω.The calculations in [6] imply that Ct blows-up exponentially as t tendsto 0, which is too fast for our purposes, since [u]Γt cannot vanish fasterthan t2, when (1.2) holds. The exponential dependence of Ct on t is dueto the method of proof we employed, which is based on the idea of refining3the method of moving planes from a quantitative point of view. As thatmethod is based on the maximum (or comparison) principle, its quantitativecounterpart is based on Harnack’s inequality and some quantitative versionsof Hopf’s boundary lemma. The exponential dependence of the constantinvolved in Harnack’s inequality leads to that of Ct. Recent (unpublished)calculations, based on more refined versions of Harnack’s inequality, showthat the growth rate of Ct can be improved, but they are still inadequateto achieve our goal. Approaches to stability based on the ideas contained in[3] and [4] do not seem to work for problem (1.1)-(1.3).In this note, we shall show that our scheme (i)-(ii) is successful, at leastif the admissible domains are ellipses: in this case, the deviation from radialsymmetry can be exactly computed in terms of the oscillation of u on Γt.We obtain (1.5) with Ct = O(t−1) as t→ 0+; thus, formula (1.4) yields thedesired symmetry.12. Section 2We begin by defining the three quantities that we shall exactly computelater on. Let Γ be a C1-regular closed simple plane curve and let z(s),s ∈ [0, |Γ|) be its parameterization by arc-lenght. For a function u : Γ→ R,we will consider the seminorms(2.1)|u|Γ = sup0≤s,s′≤|Γ|s 6=s′|u(z(s)) − u(z(s′))|min(|s− s′|, |Γ| − |s− s′|), [u]Γ = supz,w∈Γz 6=w|u(z) − u(w)||z −w|,and the oscillation(2.2) oscΓu = maxΓu−minΓu.We now consider an ellipseE = {z = (x, y) ∈ R2 :x2a2+y2b2< 1},with semi-axes a and b normalized by a−2 + b−2 = 1, and let(2.3) Γt = {z ∈ E : dist(z, ∂E) = t}be the curve parallel to ∂E at distance t; Γt is still regular and simple if t issmaller than the minimal radius of curvature of ∂E, that is for(2.4) 0 ≤ t <min(a3, b3)2a2b2.The solution u of (1.1) is clearly given by(2.5) u(x, y) = 1−x2a2−y2b2.Lemma 2.1. Let u be given by (2.5) and let t satisfy (2.4). Then, we have:(i) |u|Γt = |a− b|a+ ba2b2t;(ii) [u]Γt = |u|Γt;1Of course, in this very special case, there is a trivial proof of symmetry, but this isnot the point.4 G. CIRAOLO AND R. MAGNANINI(iii) oscΓtu = |a− b|a+ ba2b2( 2aba+ b− t)t.Proof. The standard parametrization of ∂E isγ(θ) = (a cos θ, b sin θ), θ ∈ [0, 2pi];thus,Γt ={γ(θ)− t Jγ′(θ)|γ′(θ)|: θ ∈ [0, 2pi)},where J is the rotation matrix (0 1−1 0),so that the outward unit normal isν(θ) = Jγ′(θ)|γ′(θ)|.(i) The mean value theorem then tells us that(2.6)|u(z(s)) − u(z(s′))|min(|s − s′|, |Γt| − |s− s′|)= |〈Du(z(σ)), z′(σ)〉|,for some σ ∈ [0, |Γt|]. Since Γt is parallel to ∂E, we havez′(σ) =γ′(θ(σ))|γ′(θ(σ))|,where θ(σ) is such thatz(σ) = γ(θ(σ))− t ν(θ).By (2.5), we have that|〈Du(z(σ)), z′(σ)〉| = 2|〈Az(σ), z′(σ)〉| with A =(a−2 00 b−2),and hence|〈Du(z(σ)), z′(σ)〉| = 2∣∣∣〈Aγ(θ), γ′(θ)〉|γ′(θ)|− t〈AJ γ′(θ), γ′(θ)〉|γ′(θ)|2∣∣∣,with θ = θ(σ).Straightforward computations give:γ′(θ) = (−a sin θ, b cos θ), |γ′(θ)| =√a2 sin2 θ + b2 cos2 θ,〈Aγ(θ), γ′(θ)〉 = 0, 〈AJγ′(θ), γ′(θ)〉 =|a2 − b2|absin θ cos θ.Therefore,|〈Du(z(σ)) · z′(σ)〉| =|a2 − b2|ab2| tan θ|a2 tan2 θ + b2t;this expression achieves its maximum if | tan θ| = b/a, that gives:max0≤σ≤|Γt||〈Du(z(σ)), z′(σ)〉| = |a−2 − b−2| t.¿From (2.6) we conclude.5(ii) By a symmetry argument, we can always assume that [u]Γt is attainedfor points z and w (that may possibly coincide) in the first quadrant of thecartesian plane.Now, suppose that the value [u]Γt is attained for two points z, w ∈ Γtwith z 6= w. Let s→ z(s) ∈ Γt be a parametrization by arclength of Γt suchthat z(0) = z and let ω = z′(0) be the tangent unit vector to Γt at z. Thefunction defined byf(s) =u(z(s))− u(w)|z(s)− w|has a relative maximum at s = 0 and hence f ′(0) = 0; thus,〈Du(z), ω〉|z − w|=u(z) − u(w)|z − w|〈z − w,ω〉|z − w|2.Therefore, since 〈z − w,ω〉 6= 0, we have that[u]Γt =〈Du(z), ω〉〈z − w,ω〉|z − w|,that gives a contradiction, since the right-hand side increases with z if theangle between z − w and ω decreases.As a consequence, we infer that[u]Γt = limn→∞u(zn)− u(wn)|zn − wn|where zn, wn ∈ Γt and |zn − wn| → 0.Thus, by compactness, we can find a point z ∈ Γt such that[u]Γt = 〈Du(z), ω〉,where ω is the tangent unit vector to Γt at z.It is clear now that [u]Γt = |u|Γt .(iii) If (2.4) holds, the maximum and minimum of u on Γt are attainedat the points on Γt whose projections on ∂E respectively maximize andminimize |Du| on ∂E. Thus, (iii) follows at once.In fact, for a point z = γ(θ)− t ν(θ) on Γt, calculations give thatu(z) = 1− 〈Aγ(θ), γ(θ)〉 + 2t 〈Aγ(θ), ν(θ)〉 − t2〈Aν(θ), ν(θ)〉 =2t 〈Aγ(θ), ν(θ)〉 − t2〈Aν(θ), ν(θ)〉,where〈Aγ(θ), ν(θ)〉 =1ab√b2 cos2 θ + a2 sin2 θ ;〈Aν(θ), ν(θ)〉 =1a2b2b4 cos2 θ + a4 sin2 θb2 cos2 θ + a2 sin2 θ,so that, by the substitution ξ =√b2 cos2 θ + a2 sin2 θ, we obtain thatu(z) =2tabξ +t2ξ2− (a−2 + b−2) t2.Since (2.4) holds, this function is respectively maximal or minimal whenξ = min(a, b) or max(a, b). Therefore, for an ellipse E, [6][Theorem 1.1] can be stated as follows,together with two analogues.6 G. CIRAOLO AND R. MAGNANINITheorem 2.2. Let u be the solution of (1.1) in an ellipse E of semi-axes aand b. Let Γt be the curve (2.3) parallel to ∂E at distance t satisfying (2.4).Then, there are two concentric balls Bri and Bre such that Bri ⊂ E ⊂ Breandre − ri =1ta2b2a+ b|u|Γt ; re − ri =1ta2b2a+ b[u]Γt ;re − ri =1ta2b2a+ boscΓtu.Proof. The largest ball contained in E and the smallest ball containing E arecentered at the origin and have radii min(a, b) and max(a, b), respectively;hence, re− ri = |a− b| and the desired formulas follow from Lemma 2.1. Now, we turn to Serrin problem (1.1)-(1.2). The following lemma holdsfor quite general domains in general dimension .Lemma 2.3. Let Ω ⊂ RN be a bounded domain with boundary of class C2and let u ∈ C1(Ω) ∩ C2(Ω) be a solution of (1.1) satisfying (1.2).ThenoscΓtu = o(t) as t→ 0+.If, in addition, u ∈ C2(Ω), then[u]Γt and |u|Γt = o(t) as t→ 0+.Proof. Let z and z′ ∈ Γt points at which u attains its maximum and min-imum, respectively (for notational semplicity, we do not indicate their de-pendence on t). If t is sufficiently small, they have unique projections, say γand γ′, on ∂Ω, so that we can write that z = γ− t ν(γ) and z = γ′− t ν(γ′).Since both u and uν are constant on ∂Ω, Taylor’s formula gives:u(z)− u(z′) =∫ t0[〈Du(γ′ − τ ν(γ′)), ν(γ′)〉 − 〈Du(γ − τ ν(γ)), ν(γ)〉] dτ.By the (uniform) continuity of the first derivatives of u (and the normals),the right-hand side of the last identity is a o(t) as t→ 0+.We shall prove the second part of the theorem only for the semi-norm[u]Γt , since that for |u|Γt runs similarly.Let s and s′ ∈ [0, |Γt|] attain the first supremum in (2.1); we apply (2.6)and obtain that|u(z(s)) − u(z(s′))|min(|s − s′|, |Γt| − |s− s′|)= |〈Du(z(σ)), z′(σ)〉|,for some σ ∈ [0, |Γt|). Let γ ∈ ∂Ω be the projection of the point z = z(σ)on ∂Ω, that is z = γ − t ν(γ).Since ∂Ω and Γt are parallel, the tangent unit vector τ(γ) to the curveσ 7→ γ(σ) ∈ ∂Ω at γ equals the tangent unit vector τ(z) to the curveσ 7→ z(σ) ∈ Γt at z; the same occurs for the corresponding normal unitvectors ν(γ) and ν(z).It is clear that 〈Du(γ), τ(γ)〉 = 0 and, since u ∈ C2(Ω), by differentiating(1.2), we also have that 〈D2u(γ) ν(γ), τ(γ)〉 = 0; thus, by Taylor’s formula,7we obtain that〈Du(z(σ)), z′(σ)〉 = 〈Du(γ), τ(γ)〉 − t 〈D2u(γ) ν(γ), τ(γ)〉 +R(s, s′, t) =R(s, s′, t).Since the second derivatives of u are uniformly continuous on Ω, we concludethat the remainder term R(s, s′, t) is a o(t) as t→ 0+. Theorem 2.4. Let E be an ellipse of semi-axes a and b and assume thatin E there exists a solution u of (1.1) satisfying (1.2).Then a = b, that is E is a ball and u is radially symmetric.Proof. Theorem 2.2 and Lemma 2.3 in any case yield that|a− b| = o(1) as t→ 0+,which implies the assertion. References[1] A. Aftalion, J. Busca, W. Reichel, Approximate radial symmetry for overdeter-mined boundary value problems, Adv. Diff. Eq. 4 no. 6 (1999), 907–932.[2] A. D. Aleksandrov, Uniqueness theorems for surfaces in the large V, VestnikLeningrad Univ. 13, no. 19 (1958), 5–8. (English translation: Amer. Math. Soc.Translations, Ser. 2, 21 (1962), 412–415.)[3] B. Brandolini, C. Nitsch, P. Salani, C. Trombetti, On the stability of the Serrinproblem, J. Diff. Equations vol. 245, Issue 6 (2008), 1566–1583.[4] B. Brandolini, C. Nitsch, P. Salani, C. Trombetti, Stability of radial symmetryfor a Monge-Ampe´re overdetermined problem, Annali Mat. Pura e Appl. (4) 188no. 3 (2009), 445–453.[5] G. Ciraolo, R. Magnanini, S. Sakaguchi, Symmetry of solutions of elliptic andparabolic equations with a level surface parallel to the boundary. To appear inJ. Eur. Math. Soc. (JEMS). ArXiv: 1203.5295.[6] G. Ciraolo, R. Magnanini, S. Sakaguchi, Solutions of elliptic equations with alevel surface parallel to the boundary: stability of the radial configuration. Toappear in J. Analyse Math. arXiv:1307.1257.[7] R. Magnanini, S. Sakaguchi, Matzoh ball soup: heat conductors with a station-ary isothermic surface, Ann.of Math. 156 (2002), 931–946.[8] R. Magnanini, S. Sakaguchi, Nonlinear diffusion with a bounded stationary levelsurface, Ann. Inst. H. Poincare´ Anal. Non Line´aire, 27 (2010), pp. 937-952.[9] R. Magnanini, S. Sakaguchi, Matzoh ball soup revisited: the boundary regularityissue, Math. Meth. Appl. Sci. 36 (2013), 2023-2032.[10] J. Serrin, A symmetry problem in potential theory, Arch. Rational Mech. Anal.43 (1971), 304–318.[11] H. Shahgholian, Diversifications of Serrin’s and related symmetry problems,Comp. Var. Elliptic Eq., 57 (2012), 653–665.Dipartimento di Matematica e Informatica, Universita` di Palermo, Via Archi-rafi 34, 90123, Italy.E-mail address: g.ciraolo@math.unipa.itURL: http://www.math.unipa.it/~g.ciraolo/Dipartimento di Matematica ed Informatica “U. Dini”, Universita` di Firenze,viale Morgagni 67/A, 50134 Firenze, Italy.E-mail address: magnanin@math.unifi.itURL: http://web.math.unifi.it/users/magnanin

A note on Serrin's overdetermined problem

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