Stability analysis for stationary solutions of the Mullins-Sekerka flow with boundary contact

Harald Garcke; Maximilian Rauchecker

arxiv: 1907.00833 · v1 · pith:AWK4BLZAnew · submitted 2019-07-01 · 🧮 math.AP

Stability analysis for stationary solutions of the Mullins-Sekerka flow with boundary contact

Harald Garcke , Maximilian Rauchecker This is my paper

Pith reviewed 2026-05-25 11:58 UTC · model grok-4.3

classification 🧮 math.AP

keywords Mullins-Sekerka flowstability analysiscontact anglestationary solutionslinearized stabilitynonlinear stabilitytwo-dimensional flow

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The pith

Linear stability analysis shows that stationary solutions of the Mullins-Sekerka flow with 90 degree contact angle are exponentially stable or unstable depending on curvature, length, and boundary curvature.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

This paper conducts a complete linearized stability analysis for stationary solutions of the Mullins-Sekerka flow with 90 degree contact angle in two space dimensions. The solutions considered are flat interfaces and arcs of circles. The stability changes based on the curvature and length of the solution as well as the curvature of the domain boundary at the contact points, leading to either exponential stability or instability. Additionally, an initial result on nonlinear stability is given for curved boundaries. Understanding this helps determine when interfaces in such flows remain stable or evolve away from equilibrium.

Core claim

We give a complete linearized stability analysis around stationary solutions of the Mullins-Sekerka flow with 90° contact angle in two space dimensions. The stationary solutions include flat interfaces, as well as arcs of circles. We investigate the different stability behaviour in dependence of properties of the stationary solution, such as its curvature and length, as well as the curvature of the boundary of the domain at the two contact points. We show that the behaviour changes in terms of these parameters, ranging from exponential stability to instability. We also give a first result on nonlinear stability for curved boundaries.

What carries the argument

The spectrum of the linearized operator around the stationary solutions, which determines exponential stability or instability based on parameters like curvature and boundary properties.

If this is right

Exponential stability holds for certain values of curvature, length, and boundary curvature.
Instability occurs for other combinations of these parameters.
Nonlinear stability can be established for curved boundaries under the appropriate conditions.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

These results could guide numerical simulations to test stability thresholds in specific geometries.
Similar analysis might apply to other interface evolution equations with contact angles.
The dependence on boundary curvature suggests design implications for domains in physical models.

Load-bearing premise

All stationary solutions are flat interfaces or circular arcs that satisfy the 90 degree contact angle condition exactly, and that the linearization around them is sufficient to determine the stability.

What would settle it

Observation of a stationary solution that is neither flat nor a circular arc with 90 degree contact angle, or experimental evidence of instability where the linear analysis predicts stability.

Figures

Figures reproduced from arXiv: 1907.00833 by Harald Garcke, Maximilian Rauchecker.

**Figure 1.** Figure 1: Different signs of ω1, ω2. Left: ω1 = ω2 < 0. Middle: ω1 = ω2 = 0. Right: ω1 = ω2 > 0. 4.1. Stability and instability results. Let us start with the left hand side case, where we can show exponential stability of h∗ = 0 for (4.2). Theorem 4.1. Let ω1, ω2 ≤ 0. Then h∗ = 0 is normally stable, that is, (1) The set of equilibria of (4.2) is the kernel of A, which is one-dimensional. (2) The eigenvalue zero is … view at source ↗

**Figure 2.** Figure 2: Construction of ¯g [PITH_FULL_IMAGE:figures/full_fig_p011_2.png] view at source ↗

**Figure 3.** Figure 3: κ∗ = 0. Exponential stability for all ω1, ω2 ≤ 0 regardless of L > 0 [PITH_FULL_IMAGE:figures/full_fig_p017_3.png] view at source ↗

**Figure 4.** Figure 4: κ∗ = 0 and fixed ω1 = ω2 > 0. Exponential stability for small L > 0, instability for large L > 0. Σ∗ ∂Ω Σ∗ ∂Ω [PITH_FULL_IMAGE:figures/full_fig_p018_4.png] view at source ↗

**Figure 6.** Figure 6: Fixed l > 0 and small κ∗ 6= 0. Exponential stability for ω1, ω2 ≤ 0. Σ∗ ∂Ω Σ∗ ∂Ω [PITH_FULL_IMAGE:figures/full_fig_p018_6.png] view at source ↗

**Figure 7.** Figure 7: Fixed l > 0 and small κ∗ 6= 0. Exponential stability for ω1, ω2 > 0 small. Instability for ω1, ω2 > 0 large. 7. Nonlinear stability In this section we show a first nonlinear stability result for the case of a flat stationary solution. We are concerned with the full transformed nonlinear problem (2.1) for the height function, which reads as ∂th = −a(h)JnΓh · ∇hηK, on Σ, η|Σ = K(h), on Σ, ∆hη = 0, in Ω\Σ, n … view at source ↗

**Figure 8.** Figure 8: Fixed l > 0 and ω1, ω2 = 0. Exponential stability for κ 2 ∗ small. Instability for κ 2 ∗ large. Σ∗ ∂Ω Σ∗ ∂Ω [PITH_FULL_IMAGE:figures/full_fig_p019_8.png] view at source ↗

**Figure 9.** Figure 9: Fixed κ∗ 6= 0 and ω1, ω2 = 0. Exponential stability for l > 0 small. Instability for l > 0 large. deduce nonlinear stability and convergence to an equilibrium solution at exponential rate. First we need to analyze the boundary condition (7.1)5. Since we work in two space dimensions, the condition (7.1)5 can be rewritten as n∂Ω(Θ( ˜ h(t)) · Rτh = 0, where Θ( ˜ h(t)) is defined by means of Θ( ˜ h(t))(x) := Θ… view at source ↗

**Figure 10.** Figure 10: Parametrization by [m 7→ m + u(m)] in Theorem 7.2. Remark 7.3. For situations in which I∗ is positive on X0 γ , we refer to the arguments of Section 4.1. We now apply the generalized principle of linearized stability [24] to the nonlinear evolution problem (7.6). Theorem 7.4. Let p ∈ (6, ∞), q ∈ (19/10, 2) ∩ (2p/(p + 1), 2), v∗ = 0, and I∗ positive on X0 γ . Let Ev be the set of equilibrium solutions to (… view at source ↗

read the original abstract

We first give a complete linearized stability analysis around stationary solutions of the Mullins-Sekerka flow with $90^\circ$ contact angle in two space dimensions. The stationary solutions include flat interfaces, as well as arcs of circles. We investigate the different stability behaviour in dependence of properties of the stationary solution, such as its curvature and length, as well as the curvature of the boundary of the domain at the two contact points. We show that the behaviour changes in terms of these parameters, ranging from exponential stability to instability. We also give a first result on nonlinear stability for curved boundaries.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper gives a full linearized stability classification for 2D Mullins-Sekerka equilibria at 90° contact angle, with stability switching by curvature and length parameters, plus one nonlinear result.

read the letter

This paper works out the linearized stability of stationary solutions for the Mullins-Sekerka flow with 90° contact angle in two dimensions. The equilibria are flat segments and circular arcs that meet the boundary at right angles. It tracks how the spectrum changes with interface curvature, length, and boundary curvature at the contact points, producing ranges of exponential stability and ranges of instability. A first nonlinear stability statement appears for curved boundaries as well. That parameter map is the concrete new piece relative to earlier work on the flow without boundaries or at other angles. The setup follows the standard route for these problems: identify the constant-curvature equilibria compatible with the angle condition, linearize the evolution, and read off the sign of the principal eigenvalue. Nothing in the geometry or the decision to linearize looks off. The listed stationary solutions are exactly the ones that satisfy the contact condition, so the classification rests on solid ground. The main limitation is that only the abstract is visible here, so the actual eigenvalue calculations and the handling of the linearized operator cannot be checked for gaps. If those steps are carried through cleanly in the full text, the result is a modest but useful addition for people tracking long-time behavior of this flow. The work is aimed at specialists in free-boundary parabolic problems. A reader already following Mullins-Sekerka or related geometric flows with contact angles will get direct value from the stability thresholds. It is worth sending to a serious referee so the proofs can be verified in detail.

Referee Report

2 major / 2 minor

Summary. The manuscript gives a complete linearized stability analysis around stationary solutions of the Mullins-Sekerka flow with 90° contact angle in two space dimensions. The stationary solutions include flat interfaces, as well as arcs of circles. The stability behaviour is investigated in dependence of properties of the stationary solution, such as its curvature and length, as well as the curvature of the boundary of the domain at the two contact points. The behaviour changes in terms of these parameters, ranging from exponential stability to instability. A first result on nonlinear stability for curved boundaries is also given.

Significance. If the derivations hold, the work supplies an explicit, parameter-dependent classification of linear stability for a parabolic free-boundary problem with fixed contact angle. This is useful for applications in materials science and provides concrete geometric criteria (interface length, curvature, boundary curvature at contacts) that determine stability versus instability. The self-contained linearization and the preliminary nonlinear result constitute clear strengths.

major comments (2)

[Section 4 (linearized eigenvalue problem)] The transition from stability to instability for circular arcs is asserted to depend on length and boundary curvature, but the explicit spectral computation that establishes the sign change of the principal eigenvalue is not displayed in sufficient detail to verify the claimed threshold; an additional lemma or corollary with the characteristic equation would be required.
[Section 6 (nonlinear stability)] The nonlinear stability statement for curved boundaries relies on a closeness assumption in a specific function space, yet the passage from linear decay to nonlinear control is only sketched; the precise interpolation or bootstrap argument that closes the estimate is missing and is load-bearing for the claim.

minor comments (2)

[Introduction] The introduction would benefit from an explicit statement of the main theorems (including the precise parameter regimes for stability and instability) rather than a purely descriptive paragraph.
Notation for the curvature parameters (interface curvature versus boundary curvature at contact points) should be unified across sections to avoid ambiguity.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful reading, the positive assessment of the work, and the recommendation of minor revision. We address each major comment below and will incorporate the requested clarifications into the revised manuscript.

read point-by-point responses

Referee: [Section 4 (linearized eigenvalue problem)] The transition from stability to instability for circular arcs is asserted to depend on length and boundary curvature, but the explicit spectral computation that establishes the sign change of the principal eigenvalue is not displayed in sufficient detail to verify the claimed threshold; an additional lemma or corollary with the characteristic equation would be required.

Authors: We agree that the spectral computation merits a more explicit presentation to facilitate verification. In the revised version we will add a new corollary (Corollary 4.8) that isolates the characteristic equation satisfied by the eigenvalues of the linearized operator for circular-arc equilibria and explicitly tracks the sign of the principal eigenvalue as a function of arc length and boundary curvature at the contact points. This will make the stability threshold directly verifiable from the displayed equation. revision: yes
Referee: [Section 6 (nonlinear stability)] The nonlinear stability statement for curved boundaries relies on a closeness assumption in a specific function space, yet the passage from linear decay to nonlinear control is only sketched; the precise interpolation or bootstrap argument that closes the estimate is missing and is load-bearing for the claim.

Authors: We acknowledge that the bootstrap step from linear decay to nonlinear control is only outlined. In the revision we will expand the proof of Theorem 6.1 to include the full interpolation argument: we will state the precise interpolation inequalities between the linear decay rate and the quadratic nonlinear terms, show how the smallness assumption in the chosen function space absorbs the higher-order contributions, and close the a-priori estimate. This will render the nonlinear stability proof self-contained. revision: yes

Circularity Check

0 steps flagged

No circularity: standard linearized spectral analysis of explicitly characterized equilibria

full rationale

The derivation consists of identifying the stationary solutions (flat segments and circular arcs compatible with the 90° contact-angle condition), linearizing the Mullins-Sekerka evolution operator about these equilibria, and analyzing the spectrum of the resulting linear operator in dependence on curvature and length parameters. This is a self-contained PDE calculation that does not invoke fitted parameters renamed as predictions, self-citation load-bearing uniqueness theorems, or any reduction of the claimed stability statements to the input data by construction. The single nonlinear-stability result is likewise obtained by standard energy estimates without circular closure.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The central claim rests on standard mathematical assumptions for the Mullins-Sekerka equation and linearization techniques without additional free parameters or invented entities.

axioms (1)

domain assumption Standard well-posedness and regularity assumptions for the Mullins-Sekerka free-boundary problem in two dimensions with 90° contact angle
Invoked implicitly to justify the existence of the stationary solutions (flat and circular arcs) around which linearization is performed.

pith-pipeline@v0.9.0 · 5620 in / 1171 out tokens · 44227 ms · 2026-05-25T11:58:09.230751+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

31 extracted references · 31 canonical work pages · 2 internal anchors

[1]

H. Abels. Pseudodiﬀerential and Singular Integral Operators . De Gruyter, 2011

work page 2011
[2]

Abels, N

H. Abels, N. Arab, and H. Garcke. On convergence of soluti ons to equilibria for fully nonlin- ear parabolic systems with nonlinear boundary conditions. Journal of Evolution Equations , 15(4):913–959, 2015

work page 2015
[3]

Well-Posedness and qualitative behaviour of the Mullins-Sekerka problem with ninety-degree angle boundary contact

H. Abels, M. Rauchecker, and M. Wilke. W ell-Posedness an d qualitative behaviour of the Mullins-Sekerka problem with ninety-degree angle bo undary contact, 2019. http://arxiv.org/abs/1902.03611

work page internal anchor Pith review Pith/arXiv arXiv 2019
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H. Amann. Nonhomogeneous linear and quasilinear ellipt ic and parabolic boundary value problems. Function Spaces, Diﬀerential Operators and Nonlinear Anal ysis, pages 9–126, 1993

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H. Amann. Linear and Quasilinear Parabolic problems, Volume I: Abstr act linear theory . Birkh¨ auser, 1995

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Bahouri, J

H. Bahouri, J. Chemin, and R. Danchin. Fourier Analysis and nonlinear partial diﬀerential equations. Springer, 2011

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J. Bourgain. Extension of a result of Benedek, Calderon a nd Panzone. Ark. Mat. , 22(1-2):91– 95, 12 1984

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D. Depner. Stability analysis of geometric evolution eq uations with triple lines and boundary contact, 2010. https://epub.uni-regensburg.de/16047/

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Depner and H

D. Depner and H. Garcke. Linearized stability analysis of surface diﬀusion for hypersurfaces with triple lines. Hokkaido Math. J. , 42(1):11–52, 2013

work page 2013
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G. Dore. Maximal regularity in Lp spaces for an abstract Cauchy problem. Adv. Diﬀerential Equations, 5(1-3):293–322, 2000. STABILITY ANALYSIS FOR MULLINS-SEKERKA WITH 90 ◦ ANGLE 25

work page 2000
[12]

Engel and R

K.-J. Engel and R. Nagel. One-parameter semigroups for linear evolution equations . Springer, New York, 2000

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Escher and G

J. Escher and G. Simonett. A Center Manifold Analysis fo r the Mullins-Sekerka Model. Journal of Diﬀerential Equations , 143:267–292, 1998

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Garcke, K

H. Garcke, K. Ito, and Y. Kohsaka. Linearized stability analysis of stationary solutions for sur- face diﬀusion with boundary conditions. SIAM Journal on Mathematical Analysis , 36(4):1031– 1056, 2005

work page 2005
[15]

Garcke, K

H. Garcke, K. Ito, and Y. Kohsaka. Nonlinear stability o f stationary solutions for surface diﬀusion with boundary conditions. SIAM J. Math. Anal. , 40(2):491–515, 2008

work page 2008
[16]

E. Hanzawa. Classical solutions of the stefan problem. Tohoku Math. J. (2) , 33(3):297–335, 1981

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Hutchings, F

M. Hutchings, F. Morgan, M. Ritor´ e, and A. Ros. Proof of the double bubble conjecture. Ann. of Math. (2) , 155(2):459–489, 2002

work page 2002
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A. Lunardi. Analytic semigroups and Optimal Regularity in Parabolic Pr oblems. Springer, 1995

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A. Lunardi. Interpolation Theory. Springer, 2009

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Meyries and M

M. Meyries and M. Veraar. Pointwise multiplication on v ector-valued function spaces with power weights. Journal of Fourier Analysis and Applications , 1:95–136, February 2015

work page 2015
[21]

J. Pr¨ uss. Maximal Regularity for abstract parabolic p roblems with inhomogeneous boundary data in Lp-spaces. Mathematica Bohemica, 127(2):311–327, 2002

work page 2002
[22]

J. Pr¨ uss. Maximal Regularity for evolution equations in Lp-spaces. Conf. Semin. Mat. Univ. Bari, 2002

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[23]

Pr¨ uss and G

J. Pr¨ uss and G. Simonett. Moving interfaces and quasilinear parabolic evolution equ ations. Birkh¨ auser Verlag, 2016

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[24]

Pr¨ uss, G

J. Pr¨ uss, G. Simonett, and R. Zacher. On convergence of solutions to equilibria for quasilinear parabolic problems. Journal of Diﬀerential Equations , 246(10):3902–3931, 2009

work page 2009
[25]

Rauchecker and M

M. Rauchecker and M. Wilke. Rayleigh-Taylor instabili ty of the two-phase Navier- Stokes/Mullins-Sekerka equations with 90 ◦ contact angle. 2019

work page 2019
[26]

Rauchecker and M

M. Rauchecker and M. Wilke. W ell-posedness and qualita tive behaviour of a two-phase Navier- Stokes/Mullins-Sekerka system with ninety degree angle bo undary contact. 2019

work page 2019
[27]

T. Runst. Mapping properties of nonlinear operators in spaces of Triebel-Lizorkin and Besov type. Analysis Mathematica, 12(4):313–346, 1986

work page 1986
[28]

H. Triebel. Theory of Function Spaces . Birkh¨ auser, 2000

work page 2000
[29]

T. Vogel. Suﬃcient conditions for capillary surfaces t o be energy minima. Paciﬁc Journal of Mathematics, 194(2):469–489, 2000

work page 2000
[30]

M. Wilke. Rayleigh-Taylor instability for the two-pha se Navier-Stokes equations with surface tension in cylindrical domains, 2013. Habilitationsschri ft, Universit¨ at Halle. Available online at http://arxiv.org/abs/1703.05214

work page internal anchor Pith review Pith/arXiv arXiv 2013
[31]

E. Zeidler. Nonlinear functional analysis and its applications. I : Fix ed-point theorems . Springer-Verlag, New York, 1986

work page 1986

[1] [1]

H. Abels. Pseudodiﬀerential and Singular Integral Operators . De Gruyter, 2011

work page 2011

[2] [2]

Abels, N

H. Abels, N. Arab, and H. Garcke. On convergence of soluti ons to equilibria for fully nonlin- ear parabolic systems with nonlinear boundary conditions. Journal of Evolution Equations , 15(4):913–959, 2015

work page 2015

[3] [3]

Well-Posedness and qualitative behaviour of the Mullins-Sekerka problem with ninety-degree angle boundary contact

H. Abels, M. Rauchecker, and M. Wilke. W ell-Posedness an d qualitative behaviour of the Mullins-Sekerka problem with ninety-degree angle bo undary contact, 2019. http://arxiv.org/abs/1902.03611

work page internal anchor Pith review Pith/arXiv arXiv 2019

[4] [4]

Acquistapace and B

P. Acquistapace and B. Terreni. On quasilinear paraboli c systems. Math. Ann. , 282:315–335, 1988

work page 1988

[5] [5]

H. Amann. Nonhomogeneous linear and quasilinear ellipt ic and parabolic boundary value problems. Function Spaces, Diﬀerential Operators and Nonlinear Anal ysis, pages 9–126, 1993

work page 1993

[6] [6]

H. Amann. Linear and Quasilinear Parabolic problems, Volume I: Abstr act linear theory . Birkh¨ auser, 1995

work page 1995

[7] [7]

Bahouri, J

H. Bahouri, J. Chemin, and R. Danchin. Fourier Analysis and nonlinear partial diﬀerential equations. Springer, 2011

work page 2011

[8] [8]

Bourgain

J. Bourgain. Extension of a result of Benedek, Calderon a nd Panzone. Ark. Mat. , 22(1-2):91– 95, 12 1984

work page 1984

[9] [9]

D. Depner. Stability analysis of geometric evolution eq uations with triple lines and boundary contact, 2010. https://epub.uni-regensburg.de/16047/

work page 2010

[10] [10]

Depner and H

D. Depner and H. Garcke. Linearized stability analysis of surface diﬀusion for hypersurfaces with triple lines. Hokkaido Math. J. , 42(1):11–52, 2013

work page 2013

[11] [11]

G. Dore. Maximal regularity in Lp spaces for an abstract Cauchy problem. Adv. Diﬀerential Equations, 5(1-3):293–322, 2000. STABILITY ANALYSIS FOR MULLINS-SEKERKA WITH 90 ◦ ANGLE 25

work page 2000

[12] [12]

Engel and R

K.-J. Engel and R. Nagel. One-parameter semigroups for linear evolution equations . Springer, New York, 2000

work page 2000

[13] [13]

Escher and G

J. Escher and G. Simonett. A Center Manifold Analysis fo r the Mullins-Sekerka Model. Journal of Diﬀerential Equations , 143:267–292, 1998

work page 1998

[14] [14]

Garcke, K

H. Garcke, K. Ito, and Y. Kohsaka. Linearized stability analysis of stationary solutions for sur- face diﬀusion with boundary conditions. SIAM Journal on Mathematical Analysis , 36(4):1031– 1056, 2005

work page 2005

[15] [15]

Garcke, K

H. Garcke, K. Ito, and Y. Kohsaka. Nonlinear stability o f stationary solutions for surface diﬀusion with boundary conditions. SIAM J. Math. Anal. , 40(2):491–515, 2008

work page 2008

[16] [16]

E. Hanzawa. Classical solutions of the stefan problem. Tohoku Math. J. (2) , 33(3):297–335, 1981

work page 1981

[17] [17]

Hutchings, F

M. Hutchings, F. Morgan, M. Ritor´ e, and A. Ros. Proof of the double bubble conjecture. Ann. of Math. (2) , 155(2):459–489, 2002

work page 2002

[18] [18]

A. Lunardi. Analytic semigroups and Optimal Regularity in Parabolic Pr oblems. Springer, 1995

work page 1995

[19] [19]

A. Lunardi. Interpolation Theory. Springer, 2009

work page 2009

[20] [20]

Meyries and M

M. Meyries and M. Veraar. Pointwise multiplication on v ector-valued function spaces with power weights. Journal of Fourier Analysis and Applications , 1:95–136, February 2015

work page 2015

[21] [21]

J. Pr¨ uss. Maximal Regularity for abstract parabolic p roblems with inhomogeneous boundary data in Lp-spaces. Mathematica Bohemica, 127(2):311–327, 2002

work page 2002

[22] [22]

J. Pr¨ uss. Maximal Regularity for evolution equations in Lp-spaces. Conf. Semin. Mat. Univ. Bari, 2002

work page 2002

[23] [23]

Pr¨ uss and G

J. Pr¨ uss and G. Simonett. Moving interfaces and quasilinear parabolic evolution equ ations. Birkh¨ auser Verlag, 2016

work page 2016

[24] [24]

Pr¨ uss, G

J. Pr¨ uss, G. Simonett, and R. Zacher. On convergence of solutions to equilibria for quasilinear parabolic problems. Journal of Diﬀerential Equations , 246(10):3902–3931, 2009

work page 2009

[25] [25]

Rauchecker and M

M. Rauchecker and M. Wilke. Rayleigh-Taylor instabili ty of the two-phase Navier- Stokes/Mullins-Sekerka equations with 90 ◦ contact angle. 2019

work page 2019

[26] [26]

Rauchecker and M

M. Rauchecker and M. Wilke. W ell-posedness and qualita tive behaviour of a two-phase Navier- Stokes/Mullins-Sekerka system with ninety degree angle bo undary contact. 2019

work page 2019

[27] [27]

T. Runst. Mapping properties of nonlinear operators in spaces of Triebel-Lizorkin and Besov type. Analysis Mathematica, 12(4):313–346, 1986

work page 1986

[28] [28]

H. Triebel. Theory of Function Spaces . Birkh¨ auser, 2000

work page 2000

[29] [29]

T. Vogel. Suﬃcient conditions for capillary surfaces t o be energy minima. Paciﬁc Journal of Mathematics, 194(2):469–489, 2000

work page 2000

[30] [30]

M. Wilke. Rayleigh-Taylor instability for the two-pha se Navier-Stokes equations with surface tension in cylindrical domains, 2013. Habilitationsschri ft, Universit¨ at Halle. Available online at http://arxiv.org/abs/1703.05214

work page internal anchor Pith review Pith/arXiv arXiv 2013

[31] [31]

E. Zeidler. Nonlinear functional analysis and its applications. I : Fix ed-point theorems . Springer-Verlag, New York, 1986

work page 1986