Your search keyword '"ELLIPTIC operators"' showing total 108 results

1. On the propagation of flatness for second order hypoelliptic operators.

Author

Albano, Paolo

Subjects

*VECTOR fields, *OPERATOR functions, *EQUATIONS, *ELLIPTIC operators

Abstract

For a class of hypoelliptic operators with real-analytic coefficients, we provide a criterion ensuring a partial analyticity result. As a consequence, even when the "elliptic" strong unique continuation (i.e. a solution of the homogeneous equation which vanishes of infinite order at a point is zero near such a point) fails, a weaker form of "propagation" of zeroes still holds. [ABSTRACT FROM AUTHOR]

Published

2025

2. The Leray-Lions existence theorem under general growth conditions.

Author

Cupini, Giovanni, Marcellini, Paolo, and Mascolo, Elvira

Subjects

*EXISTENCE theorems, *DIFFERENTIAL operators, *ELLIPTIC equations, *NONLINEAR equations, *DIRICHLET problem, *ELLIPTIC operators

Abstract

We prove an existence (and regularity) result of weak solutions u ∈ W 0 1 , p (Ω) ∩ W loc 1 , q (Ω) , to a Dirichlet problem for a second order elliptic equation in divergence form, under general and p , q − growth conditions of the differential operator. This is a first attempt to extend to general growth the well known Leray-Lions existence theorem, which holds under the so-called natural growth conditions with q = p. We found a way to treat the general context with explicit dependence on (x , u) , other than on the gradient variable ξ = D u ; these aspects require particular attention due to the p , q -context, with some differences and new difficulties compared to the standard case p = q. [ABSTRACT FROM AUTHOR]

Published

2025

3. Global Sobolev regularity for nonvariational operators built with homogeneous Hörmander vector fields.

Author

Biagi, Stefano and Bramanti, Marco

Subjects

*VECTOR fields, *LIE groups, *HOMOGENEOUS spaces, *MAXIMAL functions, *SOBOLEV spaces, *ELLIPTIC operators

Abstract

We consider a class of nonvariational degenerate elliptic operators of the kind L u = ∑ i , j = 1 m a i j (x) X i X j u where { a i j (x) } i , j = 1 m is a symmetric uniformly positive matrix of bounded measurable functions defined in the whole R n (n > m), possibly discontinuous but satisfying a VMO assumption, and X 1 ,... , X m are real smooth vector fields satisfying Hörmander rank condition in the whole R n and 1-homogeneous w.r.t. a family of nonisotropic dilations. We do not assume that the vector fields are left invariant w.r.t. an underlying Lie group of translations. We prove global W X 2 , p a-priori estimates, for every p ∈ (1 , ∞) , of the kind: ‖ u ‖ W X 2 , p (R n) ≤ c { ‖ L u ‖ L p (R n) + ‖ u ‖ L p (R n) } for every u ∈ W X 2 , p (R n). We also prove higher order estimates and corresponding regularity results: if a i j ∈ W X k , ∞ (R n) , u ∈ W X 2 , p (R n) , L u ∈ W X k , p (R n) , then u ∈ W X k + 2 , p (R n) and ‖ u ‖ W X k + 2 , p (R n) ≤ c { ‖ L u ‖ W X k , p (R n) + ‖ u ‖ L p (R n) }. [ABSTRACT FROM AUTHOR]

Published

2025

4. Asymptotic behavior of the generalized principal eigenvalues of nonlocal dispersal operators and applications.

Author

Shen, Wenxian and Sun, Jian-Wen

Subjects

*ELLIPTIC operators, *SPECTRAL theory, *KERNEL functions, *EIGENVALUES, *EQUATIONS

Abstract

In this paper, we consider the principal spectral theory for the nonlocal dispersal eigenvalue problem (1) d ρ p [ ∫ Ω J ρ (x − y) u (y) d y − u (x) ] + κ ρ q [ ∫ Ω G ρ (x − y) u (y) d y − u (x) ] + a (x) u (x) = − λ u (x) , x ∈ Ω ¯ , where Ω ⊂ R N is a bounded smooth domain, J ρ (x) = ρ N J (ρ x) , G ρ (x) = ρ N G (ρ x) , the kernel functions J (x) and G (x) are nonnegative, J (x) is symmetric, the parameter ρ is positive, d , κ are positive, p , q are given constants, and a ∈ C (Ω ¯). We investigate the limiting behavior of the principal spectral point or generalized principal eigenvalue of (1) as ρ → ∞ and ρ → 0. When ρ ≫ 1 , the nonlocal dispersal operator u (⋅) ↦ d ρ p (∫ Ω J ρ (⋅ − y) u (y) d y − u (⋅)) + κ ρ q (∫ Ω G ρ (⋅ − y) u (y) d y − u (⋅)) + a (⋅) u (⋅) with ν 0 ≠ 0 behaves like the elliptic operator u (⋅) ↦ d c 0 ρ p − 2 Δ u − κ ρ q − 1 ν 0 ⋅ ∇ u + a (⋅) u (⋅) on Ω with Dirichlet boundary condition on ∂Ω, where c 0 = 1 2 N ∫ R N J (y) | y | 2 d y , ν 0 = 〈 ∫ R N G (x) x 1 d x , ∫ R N G (x) x 2 d x , ⋯ , ∫ R N G (x) x N d x 〉. The results obtained in the paper are novel when the dispersal kernel function G (x) is asymmetric. Moreover, when G is asymmetric with ν 0 ≠ 0 , and p ≥ 2 , q > p − 1 or p < 2 , q > 1 , it is seen that the limiting behavior of the generalized principal eigenvalue of (1) as ρ → ∞ is strikingly different from the limiting behavior of the principal eigenvalue of the elliptic operator u (⋅) ↦ d c 0 ρ p − 2 Δ u − κ ρ q − 1 ν 0 ⋅ ∇ u + a (⋅) u (⋅) on Ω with Dirichlet boundary condition on ∂Ω. The main results are used to study the asymptotic dynamics of nonlinear nonlocal dispersal problems. [ABSTRACT FROM AUTHOR]

Published

2024

5. Weighted non-autonomous Lq(Lp) maximal regularity for complex systems under mixed regularity in space and time.

Author

Bechtel, Sebastian

Subjects

*ELLIPTIC operators, *DIFFERENTIAL operators, *SQUARE root, *COMMUTATION (Electricity), *A priori, *COMMUTATORS (Operator theory)

Abstract

We show weighted non-autonomous L q (L p) maximal regularity for families of complex second-order systems in divergence form under a mixed regularity condition in space and time. To be more precise, we let p , q ∈ (1 , ∞) and we consider coefficient functions in C t β + ε with values in C x α + ε subject to the parabolic relation 2 β + α = 1. If p < d α , we can likewise deal with spatial H x α + ε , d α regularity. The starting point for this result is a weak (p , q) -solution theory with uniform constants. Further key ingredients are a commutator argument that allows us to establish higher a priori spatial regularity, operator-valued pseudo differential operators in weighted spaces, and a representation formula due to Acquistapace and Terreni. Furthermore, we show p -bounds for semigroups and square roots generated by complex elliptic systems under a minimal regularity assumption for the coefficients. [ABSTRACT FROM AUTHOR]

Published

2024

6. On semigroup maximal operators associated with divergence-form operators with complex coefficients.

Author

Carbonaro, Andrea and Dragičević, Oliver

Subjects

*ELLIPTIC operators

Abstract

Let L A = − div (A ∇) be an elliptic divergence form operator with bounded complex coefficients subject to mixed boundary conditions on an arbitrary open set Ω ⊆ R d. We prove that the maximal operator M A f = sup t > 0 ⁡ | exp ⁡ (− t L A) f | is bounded in L p (Ω) whenever A is p -elliptic in the sense of [11]. The relevance of this result is that, in general, the semigroup generated by − L A is neither contractive in L ∞ nor positive, therefore neither the Hopf–Dunford–Schwartz maximal ergodic theorem [16, Chap. VIII] nor Akcoglu's maximal ergodic theorem [2] can be used. We also show that if d ⩾ 3 and the domain of the sesquilinear form associated with L A embeds into L 2 ⁎ (Ω) with 2 ⁎ = 2 d / (d − 2) , then the range of L p -boundedness of M A improves to (r d / ((r − 1) d + 2) , r d / (d − 2)) , where r ⩾ 2 is such that A is r -elliptic. With our method we are also able to study the boundedness of the two-parameter maximal operator sup s , t > 0 ⁡ | T s A 1 T t A 2 f |. [ABSTRACT FROM AUTHOR]

Published

2024

7. Sharp estimates for the first Robin eigenvalue of nonlinear elliptic operators.

Author

Della Pietra, Francesco and Piscitelli, Gianpaolo

Subjects

*ELLIPTIC operators, *NONLINEAR operators, *EIGENVALUES, *CONVEX domains, *NONLINEAR equations, *ELLIPTIC equations

Abstract

The aim of this paper is to obtain optimal estimates for the first Robin eigenvalue of the anisotropic p -Laplace operator, namely: λ 1 (β , Ω) = min ψ ∈ W 1 , p (Ω) ∖ { 0 } ⁡ ∫ Ω F (∇ ψ) p d x + β ∫ ∂ Ω | ψ | p F (ν Ω) d H N − 1 ∫ Ω | ψ | p d x , where p ∈ ] 1 , + ∞ [ , Ω is a bounded, anisotropic mean convex domain in R N , ν Ω is its Euclidean outward normal, β is a real number, and F is a sufficiently smooth norm on R N. The estimates we found are in terms of the first eigenvalue of a one-dimensional nonlinear problem, which depends on β and on geometrical quantities associated to Ω. More precisely, we prove a lower bound of λ 1 in the case β > 0 , and a upper bound in the case β < 0. As a consequence, we prove, for β > 0 , a lower bound for λ 1 (β , Ω) in terms of the anisotropic inradius of Ω and, for β < 0 , an upper bound of λ 1 (β , Ω) in terms of β. [ABSTRACT FROM AUTHOR]

Published

2024

8. Strong unique continuation property for fourth order Baouendi-Grushin type subelliptic operators with strongly singular potential.

Author

Liu, Hairong and Yang, Xiaoping

Subjects

*ELLIPTIC equations, *ELLIPTIC operators, *DEGENERATE differential equations, *SCHRODINGER operator, *CONTINUATION methods

Abstract

In this paper, we prove the strong unique continuation property for the following fourth order degenerate elliptic equation Δ X 2 u = V u , where Δ X = Δ x + | x | 2 α Δ y (0 < α ≤ 1), with x ∈ R m , y ∈ R n , denotes the Baouendi-Grushin type subelliptic operators, and the potential V satisfies the strongly singular growth assumption | V | ≤ c 0 ρ 4 , where ρ = (| x | 2 (α + 1) + (α + 1) 2 | y | 2) 1 2 (α + 1) is the gauge norm. The main argument is to introduce an Almgren's type frequency function for the solutions, and show its monotonicity to obtain a doubling estimate based on setting up some refined Hardy-Rellich type inequalities on the gauge balls with boundary terms. [ABSTRACT FROM AUTHOR]

Published

2024

9. Generation of semigroups associated to strongly coupled elliptic operators in [formula omitted].

Author

Angiuli, Luciana, Lorenzi, Luca, and Mangino, Elisabetta M.

Subjects

*ELLIPTIC operators

Abstract

A class of vector-valued elliptic operators with unbounded coefficients, coupled up to the second-order is investigated in the Lebesgue space L p (R d ; R m) with p ∈ (1 , ∞) , providing sufficient conditions for the generation of an analytic C 0 -semigroup T (t). Under further assumptions, a characterization of the domain of the infinitesimal generator is given. [ABSTRACT FROM AUTHOR]

Published

2024

10. Energy estimate up to the boundary for stable solutions to semilinear elliptic problems.

Author

Erneta, Iñigo U.

Subjects

*ELLIPTIC operators, *SEMILINEAR elliptic equations, *EIGENVALUES

Abstract

We obtain a universal energy estimate up to the boundary for stable solutions of semilinear equations with variable coefficients. Namely, we consider solutions to − L u = f (u) , where L is a linear uniformly elliptic operator and f is C 1 , such that the linearized equation − L − f ′ (u) has nonnegative principal eigenvalue. Our main result is an estimate for the L 2 + γ norm of the gradient of stable solutions vanishing on the flat part of a half-ball, for any nonnegative and nondecreasing f. This bound only requires the elliptic coefficients to be Lipschitz. As a consequence, our estimate continues to hold in general C 1 , 1 domains if we further assume the nonlinearity f to be convex. This result is new even for the Laplacian, for which a C 3 regularity assumption on the domain was needed. [ABSTRACT FROM AUTHOR]

Published

2024

11. Uniform estimates of resolvents in homogenization theory of elliptic systems.

Author

Wang, Wei

Subjects

*SYMMETRIC operators, *SYSTEMS theory, *GREEN'S functions, *OPERATOR functions, *ASYMPTOTIC homogenization, *REAL variables, *ELLIPTIC operators

Abstract

In this paper, we study the estimates of resolvents R (λ , L ε) = (L ε − λ I) − 1 , where L ε = − div (A (x / ε) ∇) is a family of second elliptic operators with symmetric, periodic and oscillating coefficients defined on a bounded domain Ω with ε > 0. For 1 < p < ∞ , we will establish uniform L p → L p , L p → W 0 1 , p , W − 1 , p → L p and W − 1 , p → W 0 1 , p estimates by using the real variable method. Meanwhile, we use Green functions for operators L ε − λ I to study the asymptotic behavior of R (λ , L ε) and obtain convergence estimates in L p → L p , L p → W 0 1 , p norm. [ABSTRACT FROM AUTHOR]

Published

2023

12. Sharp Hessian estimates for fully nonlinear elliptic equations under relaxed convexity assumptions, oblique boundary conditions and applications.

Author

da S. Bessa, Junior, da Silva, João Vitor, Frederico, Maria N.B., and Ricarte, Gleydson C.

Subjects

*NONLINEAR equations, *ELLIPTIC equations, *ELLIPTIC operators, *VISCOSITY solutions

Abstract

We derive global W 2 , p estimates (with n ≤ p < ∞) for viscosity solutions to fully nonlinear elliptic equations under relaxed structural assumptions on the governing operator that are weaker than convexity and oblique boundary conditions as follows: { F (D 2 u , D u , u , x) = f (x) in Ω β (x) ⋅ D u (x) + γ (x) u (x) = g (x) on ∂ Ω , for f ∈ L p (Ω) and under appropriate assumptions on the data β , γ , g and Ω ⊂ R n. Our approach makes use of geometric tangential methods, which consist of importing "fine regularity estimates" from a limiting profile, i.e., the Recession operator, associated with the original second-order one via compactness and stability procedures. As a result, we pay special attention to the borderline scenario, i.e., f ∈ BMO p ⊋ L ∞. In such a setting, we prove that solutions enjoy BMO p type estimates for their second derivatives. Finally, as another application of our findings, we obtain Hessian estimates to obstacle-type problems under oblique boundary conditions and no convexity assumptions, which may have their own mathematical interest. A density result for a suitable class of viscosity solutions will also be addressed. [ABSTRACT FROM AUTHOR]

Published

2023

13. On the Dirichlet problem for second order elliptic systems in the ball.

Author

Moreno García, Arsenio, Alfonso Santiesteban, Daniel, and Abreu Blaya, Ricardo

Subjects

*DIRICHLET problem, *PARTIAL differential equations, *HOLDER spaces, *DIRAC operators, *HARMONIC maps, *CONTINUOUS functions, *ELLIPTIC operators

Abstract

In this paper we study the Dirichlet problem in the ball for the so-called inframonogenic functions, i.e. the solutions of the sandwich equation ∂ x _ f ∂ x _ = 0 , where ∂ x _ stands for the Dirac operator in R m. The main steps in deriving our results are the establishment of some interior estimates for the first order derivatives of harmonic Hölder continuous functions and the proof of certain invariance property of the higher order Lipschitz class under the action of the Poisson integral. Using Mathematica we also implement an algorithm to find explicitly the solution of such a Dirichlet problem for a much wider class of partial differential equations in the ball of R 3 with polynomial boundary data. [ABSTRACT FROM AUTHOR]

Published

2023

14. Linear parabolic equation with Dirichlet white noise boundary conditions.

Author

Goldys, Ben and Peszat, Szymon

Subjects

*WHITE noise, *LINEAR equations, *BOUNDARY value problems, *ELLIPTIC operators, *STOCHASTIC partial differential equations, *PARABOLIC operators

Abstract

We study inhomogeneous Dirichlet boundary value problems associated to a linear parabolic equation d u d t = A u with strongly elliptic operator A on bounded and unbounded domains with white noise boundary data. Our main assumption is that the heat kernel of the corresponding homogeneous problem enjoys the Gaussian type estimates taking into account the distance to the boundary. Under mild assumptions about the domain, we show that A generates a C 0 -semigroup in weighted L p -spaces where the weight is an appropriate power of the distance to the boundary. We also prove some smoothing properties and exponential stability of the semigroup. Finally, we reformulate the Cauchy-Dirichlet problem with white noise boundary data as an evolution equation in the weighted space and prove the existence of Markovian solutions and invariant measures. [ABSTRACT FROM AUTHOR]

Published

2023

15. Unique continuation and inverse problem for an anisotropic beam bending equation.

Author

Ghosh, Amrita and Ghosh, Tuhin

Subjects

*INVERSE problems, *BOUNDARY value problems, *SYMMETRIC operators, *ELLIPTIC operators, *CARLEMAN theorem, *EQUATIONS

Abstract

This article studies the unique continuation of the principal and inverse problem of a perturbed anisotropic fourth-order elliptic operator arising in elastic beam theory, where the principle part of the operator is modelled by the non-rotational symmetric operator ∑ j = 1 n D x j 4. We discuss the three-ball inequality, stability estimate, strong unique continuation principle, and finally the inverse boundary value problem of recovering the coefficients featuring the bending stiffness of the material. [ABSTRACT FROM AUTHOR]

Published

2023

16. C1,α-regularity of quasilinear equations on the Heisenberg group.

Author

Mukherjee, Shirsho

Subjects

*ELLIPTIC equations, *EQUATIONS, *ELLIPTIC operators

Abstract

In this article, we reproduce results of classical regularity theory of quasilinear elliptic equations in the divergence form, in the setting of Heisenberg Group. The considered cases encompass a very wide class of equations with isotropic growth conditions that are generalizations of the p -Laplacian and include equations with polynomial or exponential type growth. Some more general conditions have also been explored. [ABSTRACT FROM AUTHOR]

Published

2023

17. Kato square root problem for degenerate elliptic operators on bounded Lipschitz domains.

Author

Zhang, Junqiang, Yang, Dachun, and Yang, Sibei

Subjects

*ELLIPTIC operators, *SQUARE root, *DEGENERATE differential equations, *NEUMANN boundary conditions, *DEGENERATE parabolic equations, *SOBOLEV spaces

Abstract

Let n ≥ 2 , w be a Muckenhoupt A 2 (R n) weight, Ω a bounded Lipschitz domain of R n , and L : = − w − 1 div (A ∇ ⋅) the degenerate elliptic operator on Ω with the Dirichlet or the Neumann boundary condition. In this article, the authors establish the following weighted L p estimate for the Kato square root of L : ‖ L 1 / 2 (f) ‖ L p (Ω , v w) ∼ ‖ ∇ f ‖ L p (Ω , v w) for any f ∈ W 0 1 , p (Ω , v w) when L satisfies the Dirichlet boundary condition, or, for any f ∈ W 1 , p (Ω , v w) with ∫ Ω f (x) d x = 0 when L satisfies the Neumann boundary condition, where p is in an interval including 2, v belongs to both some Muckenhoupt weight class and the reverse Hölder class with respect to w , W 0 1 , p (Ω , v w) and W 1 , p (Ω , v w) denote the weighted Sobolev spaces on Ω, and the positive equivalence constants are independent of f. As a corollary, under some additional assumptions on w , via letting v : = w − 1 , the unweighted L 2 estimate for the Kato square root of L that ‖ L 1 / 2 (f) ‖ L 2 (Ω) ∼ ‖ ∇ f ‖ L 2 (Ω) for any f ∈ W 0 1 , 2 (Ω) when L satisfies the Dirichlet boundary condition, or, for any f ∈ W 1 , 2 (Ω) with ∫ Ω f (x) d x = 0 when L satisfies the Neumann boundary condition, are obtained. Moreover, as applications of these unweighted L 2 estimates, the unweighted L 2 regularity estimates for the weak solutions of the corresponding degenerate parabolic equations in Ω with the Dirichlet or the Neumann boundary condition are also established. [ABSTRACT FROM AUTHOR]

Published

2023

18. On operator estimates in homogenization of nonlocal operators of convolution type.

Author

Piatnitski, A., Sloushch, V., Suslina, T., and Zhizhina, E.

Subjects

*SYMMETRIC operators, *ELLIPTIC operators

Abstract

The paper studies a bounded symmetric operator A ε in L 2 (R d) with (A ε u) (x) = ε − d − 2 ∫ R d a ((x − y) / ε) μ (x / ε , y / ε) (u (x) − u (y)) d y ; here ε is a small positive parameter. It is assumed that a (x) is a non-negative L 1 (R d) function such that a (− x) = a (x) and the moments M k = ∫ R d | x | k a (x) d x , k = 1 , 2 , 3 , are finite. It is also assumed that μ (x , y) is Z d -periodic both in x and y function such that μ (x , y) = μ (y , x) and 0 < μ − ⩽ μ (x , y) ⩽ μ + < ∞. Our goal is to study the limit behaviour of the resolvent (A ε + I) − 1 , as ε → 0. We show that, as ε → 0 , the operator (A ε + I) − 1 converges in the operator norm in L 2 (R d) to the resolvent (A 0 + I) − 1 of the effective operator A 0 being a second order elliptic differential operator with constant coefficients of the form A 0 = − div g 0 ∇. We then obtain sharp in order estimates of the rate of convergence. [ABSTRACT FROM AUTHOR]

Published

2023

19. Semilinear elliptic equations on rough domains.

Author

Arendt, Wolfgang and Daners, Daniel

Subjects

*SEMILINEAR elliptic equations, *ELLIPTIC operators, *BANACH lattices, *POSITIVE operators, *LATTICE theory

Abstract

The paper makes use of recent results in the theory of Banach lattices and positive operators to deal with abstract semilinear equations. The aim is to work with minimal or no regularity conditions on the boundary of the domains, where the usual arguments based on maximum principles do not apply. A key result is an application of Kato's inequality to prove a comparison theorem for eigenfunctions that only requires interior regularity and avoids the use of the Hopf boundary maximum principle. We demonstrate the theory on an abstract degenerate logistic equation by proving the existence, uniqueness and stability of non-trivial positive solutions. Examples of operators include the Dirichlet Laplacian on arbitrary bounded domains, a simplified construction of the Robin Laplacian on arbitrary domains with boundary of finite measure and general elliptic operators in divergence form. [ABSTRACT FROM AUTHOR]

Published

2023

20. Propagation of smallness and size estimate in the second order elliptic equation with discontinuous complex Lipschitz conductivity.

Author

Francini, Elisa, Vessella, Sergio, and Wang, Jenn-Nan

Subjects

*ELLIPTIC equations, *DISCONTINUOUS coefficients, *ELLIPTIC operators

Abstract

In this paper, we would like to derive three-ball inequalities and propagation of smallness for the complex second order elliptic equation with discontinuous Lipschitz coefficients. As an application of such estimates, we study the size estimate problem by one pair of Cauchy data on the boundary, that is, a pair of the Neumann and Dirichlet data of the solution on the boundary. The main ingredient in the derivation of three-ball inequalities and propagation of smallness is a local Carleman proved in our recent paper [13]. [ABSTRACT FROM AUTHOR]

Published

2023

21. Existence and multiplicity of solutions to Dirichlet problem for semilinear subelliptic equation with a free perturbation.

Author

Chen, Hua, Chen, Hong-Ge, and Yuan, Xin-Rui

Subjects

*PERTURBATION theory, *DIRICHLET problem, *MULTIPLICITY (Mathematics), *ELLIPTIC operators, *SEMILINEAR elliptic equations, *EMBEDDING theorems

Abstract

This paper is concerned with the existence and multiplicity results for the semilinear subelliptic equation with free perturbation term. By using the degenerate Rellich-Kondrachov compact embedding theorem, the precise lower bound estimate of Dirichlet eigenvalues for the finitely degenerate elliptic operator and minimax method, we obtain the existence and multiplicity of weak solutions for the problem. [ABSTRACT FROM AUTHOR]

Published

2022

22. On the Calderón problem for nonlocal Schrödinger equations with homogeneous, directionally antilocal principal symbols.

Author

Covi, Giovanni, García-Ferrero, María Ángeles, and Rüland, Angkana

Subjects

*SCHRODINGER equation, *INVERSE problems, *ELLIPTIC operators, *DIRICHLET problem, *FUNCTION spaces, *SIGNS & symbols

Abstract

In this article we consider direct and inverse problems for α -stable, elliptic nonlocal operators whose kernels are possibly only supported on cones and which satisfy the structural condition of directional antilocality as introduced by Y. Ishikawa in the 80s. We consider the Dirichlet problem for these operators on the respective "domain of dependence of the operator" and in several, adapted function spaces. This formulation allows one to avoid natural "gauges" which would else have to be considered in the study of the associated inverse problems. Exploiting the directional antilocality of these operators we complement the investigation of the direct problem with infinite data and single measurement uniqueness results for the associated inverse problems. Here, due to the only directional antilocality, new geometric conditions arise on the measurement domains. We discuss both the setting of symmetric and a particular class of non-symmetric nonlocal elliptic operators, and contrast the corresponding results for the direct and inverse problems. In particular for only "one-sided operators" new phenomena emerge both in the direct and inverse problems: For instance, it is possible to study the problem in data spaces involving local and nonlocal data, the unique continuation property may not hold in general and further restrictions on the measurement set for the inverse problem arise. [ABSTRACT FROM AUTHOR]

Published

2022

23. Optimal boundary regularity for viscosity solutions of fully nonlinear elliptic equations.

Author

Amaral, Marcelo and dos Prazeres, Disson

Subjects

*NONLINEAR equations, *VISCOSITY solutions, *GREEN'S functions, *ELLIPTIC operators, *ELLIPTIC equations

Abstract

We establish optimal boundary regularity results for viscosity solutions to second order fully nonlinear uniformly elliptic equations in the form F (D 2 u (x) , D u (x) , x) = f (x) in Ω. In particular, we obtain sharp estimates for borderline cases f ∈ L n (Ω) and f ∈ B M O (Ω). For source functions in B M O (Ω) , we obtain C 1 , L o g − L i p interior regularity for flat solutions of non-convex elliptic equations. As a consequence, we obtain C 1 , L o g − L i p estimates near the boundary; which again is an optimal estimate. [ABSTRACT FROM AUTHOR]

Published

2022

24. Regularity and symmetry results for nonlinear degenerate elliptic equations.

Author

Esposito, Francesco, Sciunzi, Berardino, and Trombetta, Alessandro

Subjects

*ELLIPTIC equations, *SYMMETRIC domains, *SYMMETRY, *CONVEX domains, *ELLIPTIC operators

Abstract

In this paper we prove regularity results for a class of nonlinear degenerate elliptic equations of the form − div (A (| ∇ u |) ∇ u) + B (| ∇ u |) = f (u) ; in particular, we investigate the second order regularity of the solutions. As a consequence of these results, we obtain symmetry and monotonicity properties of positive solutions for this class of degenerate problems in convex symmetric domains via a suitable adaption of the celebrated moving plane method of Alexandrov-Serrin. [ABSTRACT FROM AUTHOR]

Published

2022

25. Weighted p-Laplace approximation of linear and quasi-linear elliptic problems with measure data.

Author

Eymard, Robert, Maltese, David, and Prignet, Alain

Subjects

*ELLIPTIC operators, *LINEAR operators, *EULER method

Abstract

We approximate the solution to some linear and degenerate quasi-linear problem involving a linear elliptic operator (like the semi-discrete in time implicit Euler approximation of Richards and Stefan equations) with measure right-hand side and heterogeneous anisotropic diffusion matrix. This approximation is obtained through the addition of a weighted p -Laplace term. A well chosen diffeomorphism between R and (− 1 , 1) is used for the estimates of the approximated solution, and is involved in the above weight. We show that this approximation converges to a weak sense of the problem for general right-hand-side, and to the entropy solution in the case where the right-hand-side is in L 1. [ABSTRACT FROM AUTHOR]

Published

2022

26. A new class of double phase variable exponent problems: Existence and uniqueness.

Author

Crespo-Blanco, Ángel, Gasiński, Leszek, Harjulehto, Petteri, and Winkert, Patrick

Subjects

*SOBOLEV spaces, *SMOOTHNESS of functions, *EXPONENTS, *ELLIPTIC operators, *ELLIPTIC equations

Abstract

In this paper we introduce a new class of quasilinear elliptic equations driven by the so-called double phase operator with variable exponents. We prove certain properties of the corresponding Musielak-Orlicz Sobolev spaces (an equivalent norm, uniform convexity, Radon-Riesz property with respect to the modular) and the properties of the new double phase operator (continuity, strict monotonicity, (S +) -property). In contrast to the known constant exponent case we are able to weaken the assumptions on the data. Finally we show the existence and uniqueness of corresponding elliptic equations with right-hand sides that have gradient dependence (so-called convection terms) under very general assumptions on the data. As a result of independent interest, we also show the density of smooth functions in the new Musielak-Orlicz Sobolev space even when the domain is unbounded. [ABSTRACT FROM AUTHOR]

Published

2022

27. Lp estimates for the Caffarelli-Silvestre extension operators.

Author

Metafune, G., Negro, L., and Spina, C.

Subjects

*ELLIPTIC operators, *PARABOLIC operators, *DISCONTINUOUS coefficients

Abstract

We study elliptic and parabolic problems governed by the singular elliptic operators L = Δ x + D y y + c y D y − b y 2 in the half-space R + N + 1 = { (x , y) : x ∈ R N , y > 0 }. [ABSTRACT FROM AUTHOR]

Published

2022

28. The Neumann problem for a type of fully nonlinear complex equations.

Author

Dong, Weisong and Wei, Wei

Subjects

*NEUMANN problem, *NONLINEAR equations, *ELLIPTIC differential equations, *ELLIPTIC operators

Abstract

In this paper we study the Neumann problem for a type of fully nonlinear second order elliptic partial differential equations on domains in C n without any curvature assumptions on the domain. [ABSTRACT FROM AUTHOR]

Published

2022

29. Rotational smoothing.

Author

Caro, Pedro, Meroño, Cristóbal J., and Parissis, Ioannis

Subjects

*OPERATOR equations, *INVERSE problems, *TRANSPORT equation, *SMOOTHING (Numerical analysis), *ELLIPTIC operators

Abstract

Rotational smoothing is a phenomenon consisting in a gain of regularity by means of averaging over rotations. This phenomenon is present in operators that regularize only in certain directions, in contrast to operators regularizing in all directions. The gain of regularity is the result of rotating the directions where the corresponding operator performs the smoothing effect. In this paper we carry out a systematic study of the rotational smoothing for a class of operators that includes k -vector-space Riesz potentials in R n with k < n , and the convolution with fundamental solutions of elliptic constant-coefficient differential operators acting on k -dimensional linear subspaces. Examples of the latter type of operators are the planar Cauchy transform in R n , or a solution operator for the transport equation in R n. The analysis of rotational smoothing is motivated by the resolution of some inverse problems under low-regularity assumptions. [ABSTRACT FROM AUTHOR]

Published

2022

30. On the maximum principles and the quantitative version of the Hopf lemma for uniformly elliptic integro-differential operators.

Author

Klimsiak, Tomasz and Komorowski, Tomasz

Subjects

*ELLIPTIC operators, *MAXIMUM principles (Mathematics), *DIRECTIONAL derivatives, *EIGENFUNCTIONS

Abstract

In the present paper we prove estimates on subsolutions of the equation − A v + c (x) v = 0 , x ∈ D , where D ⊂ R d is a domain (i.e. an open and connected set) and A is an integro-differential operator of the Waldenfels type, whose differential part satisfies the uniform ellipticity condition on compact sets. In general, the coefficients of the operator need not be continuous but only bounded and Borel measurable. Some of our results may be considered "quantitative" versions of the Hopf lemma, as they provide the lower bound on the outward normal directional derivative at the maximum point of a subsolution in terms of its value at the point. We shall also show lower bounds on the subsolution around its maximum point by the principal eigenfunction associated with A and the domain. Additional results, among them the weak and strong maximum principles, the weak Harnack inequality are also proven. [ABSTRACT FROM AUTHOR]

Published

2021

31. Global analytic hypoellipticity for a class of evolution operators on [formula omitted].

Author

Kirilov, Alexandre, Paleari, Ricardo, and de Moraes, Wagner A.A.

Subjects

*FOURIER series, *EVOLUTION equations, *DIOPHANTINE approximation, *ELLIPTIC operators

Abstract

In this paper, we present necessary and sufficient conditions to have global analytic hypoellipticity for a class of first-order operators defined on T 1 × S 3. In the case of real-valued coefficients, we prove that an operator in this class is conjugated to a constant-coefficient operator satisfying a Diophantine condition, and that such conjugation preserves the global analytic hypoellipticity. In the case where the imaginary part of the coefficients is non-zero, we show that the operator is globally analytic hypoelliptic if the Nirenberg-Treves condition (P) holds, in addition to an analytic Diophantine condition. [ABSTRACT FROM AUTHOR]

Published

2021

32. On the planar Choquard equation with indefinite potential and critical exponential growth.

Author

Qin, Dongdong and Tang, Xianhua

Subjects

*DIOPHANTINE equations, *ELLIPTIC operators, *REACTION-diffusion equations

Abstract

In the present paper, we study the following planar Choquard equation: { − Δ u + V (x) u = (I α ⁎ F (u)) f (u) , x ∈ R 2 , u ∈ H 1 (R 2) , where V (x) is an 1-periodic function, I α : R 2 → R is the Riesz potential and f (t) behaves like ± e β t 2 as t → ± ∞. A direct approach is developed in this paper to deal with the problems with both critical exponential growth and strongly indefinite features when 0 lies in a gap of the spectrum of the operator − △ + V. In particular, we find nontrivial solutions for the above equation with critical exponential growth, and establish the existence of ground states and geometrically distinct solutions for the equation when the nonlinearity has subcritical exponential growth. Our results complement and generalize the known ones in the literature concerning the positive potential V to the general sign-changing case, such as, the results of de Figueiredo-Miyagaki-Ruf (1995) [16] , of Alves-Cassani-Tarsi-Yang (2016) [4] , of Ackermann (2004) [1] , and of Alves-Germano (2018) [5]. [ABSTRACT FROM AUTHOR]

Published

2021

33. Perturbations of planar quasilinear differential systems.

Author

Itakura, Kenta, Onitsuka, Masakazu, and Tanaka, Satoshi

Subjects

*ELLIPTIC differential equations, *ELLIPTIC operators, *JACOBIAN matrices, *LINEAR systems

Abstract

The quasilinear differential system x ′ = a x + b | y | p ⁎ − 2 y + k (t , x , y) , y ′ = c | x | p − 2 x + d y + l (t , x , y) is considered, where a , b , c and d are real constants with b 2 + c 2 > 0 , p and p ⁎ are positive numbers with (1 / p) + (1 / p ⁎) = 1 , and k and l are continuous for t ≥ t 0 and small x 2 + y 2. When p = 2 , this system is reduced to the linear perturbed system. It is shown that the behavior of solutions near the origin (0 , 0) is very similar to the behavior of solutions to the unperturbed system, that is, the system with k ≡ l ≡ 0 , near (0 , 0) , provided k and l are small in some sense. It is emphasized that this system can not be linearized at (0 , 0) when p ≠ 2 , because the Jacobian matrix can not be defined at (0 , 0). Our result will be applicable to study radial solutions of the quasilinear elliptic equation with the differential operator r − (γ − 1) (r α | u ′ | β − a u ′) ′ , which includes p -Laplacian and k -Hessian. [ABSTRACT FROM AUTHOR]

Published

2021

34. Tent space well-posedness for parabolic Cauchy problems with rough coefficients.

Author

Zatoń, Wiktoria

Subjects

*CAUCHY problem, *HOLDER spaces, *ELLIPTIC operators, *ROLE theory, *SPACE

Abstract

We study the well-posedness of Cauchy problems on the upper half space R + n + 1 associated to higher order systems ∂ t u = (− 1) m + 1 div m A ∇ m u with bounded measurable and uniformly elliptic coefficients. We address initial data lying in L p (1 < p < ∞) and BMO (p = ∞) spaces and work with weak solutions. Our main result is the identification of a new well-posedness class, given for p ∈ (1 , ∞ ] by distributions satisfying ∇ m u ∈ T m p , 2 , where T m p , 2 is a parabolic version of the tent space of Coifman–Meyer–Stein. In the range p ∈ [ 2 , ∞ ] , this holds without any further constraints on the operator and for p = ∞ it provides a Carleson measure characterization of BMO with non-autonomous operators. We also prove higher order L p well-posedness, previously only known for the case m = 1. The uniform L p boundedness of propagators of energy solutions plays an important role in the well-posedness theory and we discover that such bounds hold for p close to 2. This is a consequence of local weak solutions being locally Hölder continuous with values in spatial L l o c p for some p > 2 , what is also new for the case m > 1. [ABSTRACT FROM AUTHOR]

Published

2020

35. Large sets at infinity and Maximum Principle on unbounded domains for a class of sub-elliptic operators.

Author

Biagi, Stefano and Lanconelli, Ermanno

Subjects

*INFINITY (Mathematics), *LIE groups, *SUBHARMONIC functions, *ELLIPTIC operators

Abstract

Maximum Principles on unbounded domains play a crucial rôle in several problems related to linear second-order PDEs of elliptic and parabolic type. In this paper we consider a class of sub-elliptic operators L in R N and we establish some criteria for an unbounded open set to be a Maximum Principle set for L. We extend some classical results related to the Laplacian (by Deny, Hayman and Kennedy) and to the sub-Laplacians on stratified Lie groups (by Bonfiglioli and the second-named author). [ABSTRACT FROM AUTHOR]

Published

2020

36. Liouville-type results in exterior domains for radial solutions of fully nonlinear equations.

Author

Galise, Giulio, Iacopetti, Alessandro, and Leoni, Fabiana

Subjects

*NONLINEAR equations, *DIRICHLET problem, *CRITICAL exponents, *ELLIPTIC operators

Abstract

We give necessary and sufficient conditions for the existence of positive radial solutions for a class of fully nonlinear uniformly elliptic equations posed in the complement of a ball in R N , and equipped with homogeneous Dirichlet boundary conditions. [ABSTRACT FROM AUTHOR]

Published

2020

37. An eigenvalue problem for the anisotropic Φ-Laplacian.

Author

Alberico, A., di Blasio, G., and Feo, F.

Subjects

*ELLIPTIC operators, *SOBOLEV spaces, *FUNCTIONALS, *EQUATIONS

Abstract

We study an eigenvalue problem involving a fully anisotropic elliptic differential operator in arbitrary Orlicz-Sobolev spaces. The relevant equations are associated with constrained minimization problems for integral functionals depending on the gradient of competing functions through general anisotropic N -functions. In particular, the latter need neither be radial, nor have a polynomial growth, and are not even assumed to satisfy the so called Δ 2 -condition. The resulting analysis requires the development of some new aspects of the theory of anisotropic Orlicz-Sobolev spaces. [ABSTRACT FROM AUTHOR]

Published

2020

38. On a weighted Trudinger-Moser inequality in [formula omitted].

Author

Abreu, Emerson and Fernandes, Leandro G.

Subjects

*ELLIPTIC operators, *SOBOLEV spaces, *MATHEMATICAL equivalence

Abstract

We establish the Trudinger-Moser inequality on weighted Sobolev spaces in the whole space, and for a class of quasilinear elliptic operators in radial form of the type L u : = − r − θ (r α | u ′ (r) | β u ′ (r)) ′ , where θ , β ≥ 0 and α > 0 , are constants satisfying some existence conditions. It is worth emphasizing that these operators generalize the p -Laplacian and k -Hessian operators in the radial case. Our results involve fractional dimensions, a new weighted Pólya-Szegö principle, and a boundness value for the optimal constant in a Gagliardo-Nirenberg type inequality. [ABSTRACT FROM AUTHOR]

Published

2020

39. A short proof of Boundary Harnack Principle.

Author

De Silva, D. and Savin, O.

Subjects

*ELLIPTIC equations, *EVIDENCE, *ELLIPTIC operators

Abstract

We give a direct analytic proof of the classical Boundary Harnack Principle for solutions to linear uniformly elliptic equations in either divergence or non-divergence form. [ABSTRACT FROM AUTHOR]

Published

2020

40. Well-posedness of the EPDiff equation with a pseudo-differential inertia operator.

Author

Bauer, M., Bruveris, M., Cismas, E., Escher, J., and Kolev, B.

Subjects

*PSEUDODIFFERENTIAL operators, *DIFFEOMORPHISMS, *ELLIPTIC operators, *COMPACT groups, *MATHEMATICAL physics, *EQUATIONS, *COMMUTATION (Electricity)

Abstract

In this article we study the class of right-invariant, fractional order Sobolev-type metrics on groups of diffeomorphisms of a compact manifold M. Our main result concerns well-posedness properties for the corresponding Euler-Arnold equations, also called the EPDiff equations, which are of importance in mathematical physics and in the field of shape analysis and template registration. Depending on the order of the metric, we will prove both local and global well-posedness results for these equations. As a result of our analysis we will also obtain new commutator estimates for elliptic pseudo-differential operators. [ABSTRACT FROM AUTHOR]

Published

2020

41. Propagation of smallness for an elliptic PDE with piecewise Lipschitz coefficients.

Author

Cârstea, Cătălin I. and Wang, Jenn-Nan

Subjects

*ELLIPTIC differential equations, *ELLIPTIC equations, *ELLIPTIC operators

Abstract

In this paper we derive a propagation of smallness result for a scalar second elliptic equation in divergence form whose leading order coefficients are Lipschitz continuous on two sides of a C 2 hypersurface that crosses the domain, but may have jumps across this hypersurface. Our propagation of smallness result is in the most general form regarding the locations of domains, which may intersect the interface of discontinuity. At the end, we also list some consequences of the propagation of smallness result, including stability results for the associated Cauchy problem, a propagation of smallness result from sets of positive measure, and a quantitative Runge approximation property. [ABSTRACT FROM AUTHOR]

Published

2020

42. Sampling and equidistribution theorems for elliptic second order operators, lifting of eigenvalues, and applications.

Author

Tautenhahn, Martin and Veselić, Ivan

Subjects

*SAMPLING theorem, *PARTIAL differential operators, *ELLIPTIC operators, *RANDOM operators, *EIGENFUNCTIONS, *SCHRODINGER operator

Abstract

We consider elliptic second order partial differential operators with Lipschitz continuous leading order coefficients on finite cubes and the whole Euclidean space. We prove quantitative sampling and equidistribution theorems for eigenfunctions. The estimates are scale-free, in the sense that for a sequence of growing cubes we obtain uniform estimates. These results are applied to prove lifting of eigenvalues as well as the infimum of the essential spectrum, and an uncertainty relation (aka spectral inequality) for short energy interval spectral projectors. Several applications including random operators are discussed. In the proof we have to overcome several challenges posed by the variable coefficients of the leading term. [ABSTRACT FROM AUTHOR]

Published

2020

43. Global regularity of second order twisted differential operators.

Author

Buzano, Ernesto and Oliaro, Alessandro

Subjects

*DIFFERENTIAL operators, *PARTIAL differential operators, *POLYNOMIAL operators, *ELLIPTIC operators

Abstract

In this paper we characterize global regularity in the sense of Shubin of twisted partial differential operators of second order in dimension 2. These operators form a class containing the twisted Laplacian, and in bi-unique correspondence with second order ordinary differential operators with polynomial coefficients and symbol of degree 2. This correspondence is established by a transformation of Wigner type. In this way the global regularity of twisted partial differential operators turns out to be equivalent to global regularity and injectivity of the corresponding ordinary differential operators, which can be completely characterized in terms of the asymptotic behavior of the Weyl symbol. In conclusion we observe that we have obtained a new class of globally regular partial differential operators which is disjoint from the class of hypo-elliptic operators in the sense of Shubin. [ABSTRACT FROM AUTHOR]

Published

2020

44. Liouville type result and long time behavior for Fisher-KPP equation with sign-changing and decaying potentials.

Author

Kim, Seonghak and Vo, Hoang-Hung

Subjects

*SEMILINEAR elliptic equations, *ELLIPTIC operators, *EQUATIONS, *EVOLUTION equations, *VECTOR fields, *ELLIPTIC equations, *BLOWING up (Algebraic geometry), *SPECTRAL theory

Abstract

This paper concerns the Liouville type result for the general semilinear elliptic equation (S) a i j (x) ∂ i j u (x) + K q i (x) ∂ i u (x) + f (x , u (x)) = 0 a.e. in R N , where f is of the KPP-monostable nonlinearity, as a continuation of the previous works of the second author [31,32]. The novelty of this work is that we allow f s (x , 0) to be sign-changing and to decay fast up to a Hardy potential near infinity. First, we introduce a weighted generalized principal eigenvalue and use it to characterize the Liouville type result for Eq. (S) that was proposed by H. Berestycki. Secondly, if (a i j) is the identity matrix and q is a compactly supported divergence-free vector field, we find a condition that Eq. (S) admits no positive solution for K > K ⋆ , where K ⋆ is a certain positive threshold. To achieve this, we derive some new techniques, thanks to the recent results on the principal spectral theory for elliptic operators [14] , to overcome some fundamental difficulties arising from the lack of compactness in the domain. This extends a nice result of Berestycki-Hamel-Nadirashvili [5] on the limit of eigenvalues with large drift to the case without periodic condition. Lastly, the well-posedness and long time behavior of the evolution equation corresponding to (S) are further investigated. The main tool of our work is based on the maximum principle for elliptic and parabolic equations however it is far from being obvious to see if the comparison principle for (S) holds or not. [ABSTRACT FROM AUTHOR]

Published

2020

45. Very weak solutions to hypoelliptic wave equations.

Author

Ruzhansky, Michael and Yessirkegenov, Nurgissa

Subjects

*LIE groups, *ELLIPTIC operators, *WAVE equation, *CAUCHY problem, *EQUATIONS

Abstract

In this paper we study the Cauchy problem for the wave equations for hypoelliptic homogeneous left-invariant operators on graded Lie groups when the time-dependent non-negative propagation speed is regular, Hölder, and distributional. For Hölder coefficients we derive the well-posedness in the spaces of ultradistributions associated to Rockland operators on graded groups. In the case when the propagation speed is a distribution, we employ the notion of "very weak solutions" to the Cauchy problem, that was already successfully used in similar contexts in [12] and [20]. We show that the Cauchy problem for the wave equation with the distributional coefficient has a unique "very weak solution" in an appropriate sense, which coincides with classical or distributional solutions when the latter exist. Examples include the time dependent wave equation for the sub-Laplacian on the Heisenberg group or on general stratified Lie groups, or p -evolution equations for higher order operators on R n or on groups, the results already being new in all these cases. [ABSTRACT FROM AUTHOR]

Published

2020

46. Wave packet dynamics in slowly modulated photonic graphene.

Author

Xie, Peng and Zhu, Yi

Subjects

*HONEYCOMB structures, *ELLIPTIC operators, *DIRAC equation, *WAVE packets, *ELECTROMAGNETIC waves

Abstract

Mathematical analysis on electromagnetic waves in photonic graphene, a photonic topological material which has a honeycomb structure, is one of the most important current research topics. By modulating the honeycomb structure, numerous topological phenomena have been observed recently. The electromagnetic waves in such media are generally described by the 2-dimensional wave equation. It has been shown that the corresponding elliptic operator with a honeycomb material weight has Dirac points in its dispersion surfaces. In this paper, we study the time evolution of the wave packets spectrally concentrated at such Dirac points in a modulated honeycomb material weight. We prove that such wave packet dynamics is governed by the Dirac equation with a varying mass in a large but finite time. Our analysis provides mathematical insights to those topological phenomena in photonic graphene. [ABSTRACT FROM AUTHOR]

Published

2019

47. Endpoint uniform Sobolev inequalities for elliptic operators with applications.

Author

Huang, Shanlin and Zheng, Quan

Subjects

*ELLIPTIC operators, *SOBOLEV spaces, *SPECTRAL theory

Abstract

In this paper, we obtain sharp restricted weak-type uniform Sobolev inequalities for a class of elliptic operators P (D). In particular, we improve a recent result of Sikora, Yan and Yao [24] to the endpoint case. The sharpness is proved by constructing explicit counterexamples. As applications, we establish Stein-Tomas type inequalities for H = P (D) + V with certain class of potentials V. [ABSTRACT FROM AUTHOR]

Published

2019

48. Dirichlet-to-Neumann and elliptic operators on C1+κ-domains: Poisson and Gaussian bounds.

Author

ter Elst, A.F.M. and Ouhabaz, E.M.

Subjects

*ELLIPTIC functions, *ELLIPTIC operators, *COMMUTATORS (Operator theory), *GREEN'S functions, *KERNEL functions, *COMMUTATION (Electricity)

Abstract

We prove Poisson upper bounds for the heat kernel of the Dirichlet-to-Neumann operator with variable Hölder coefficients when the underlying domain is bounded and has a C 1 + κ -boundary for some κ > 0. We also prove a number of other results such as gradient estimates for heat kernels and Green functions G of elliptic operators with possibly complex-valued coefficients. We establish Hölder continuity of ∇ x ∇ y G up to the boundary. These results are used to prove L p -estimates for commutators of Dirichlet-to-Neumann operators on the boundary of C 1 + κ -domains. Such estimates are the keystone in our approach for the Poisson bounds. [ABSTRACT FROM AUTHOR]

Published

2019

49. A critical elliptic problem involving fractional Laplacian operator in domains with shrinking holes.

Author

Long, Wei, Yan, Shusen, and Yang, Jianfu

Subjects

*LAPLACIAN operator, *ELLIPTIC operators, *VOLCANOES

Abstract

Let Ω ε be a bounded domain in R N with small holes. In this paper, we study the existence of solutions for the following problem { (− Δ) s u = u 2 s ⁎ − 1 , u > 0 , in Ω ε , u = 0 , in R N ∖ Ω ε , where 0 < s < 1 and 2 s ⁎ = 2 N N − 2 s. We construct solutions which blow up like a volcano near the center of each hole in Ω ε [ABSTRACT FROM AUTHOR]

Published

2019

50. Calderón–Zygmund estimates in generalized Orlicz spaces.

Author

Hästö, Peter and Ok, Jihoon

Subjects

*ORLICZ spaces, *ESTIMATES, *GENERALIZED spaces, *ELLIPTIC equations, *THEORY of distributions (Functional analysis), *LINEAR equations, *ELLIPTIC operators

Abstract

We establish the W 2 , φ (⋅) -solvability of the linear elliptic equations in non-divergence form under a suitable, essentially minimal, condition of the generalized Orlicz function φ (⋅) = φ (x , t) , by deriving Calderón–Zygmund type estimates. The class of generalized Orlicz spaces we consider here contains as special cases classical Lebesgue and Orlicz spaces, as well as non-standard growth cases like variable exponent and double phase growth. [ABSTRACT FROM AUTHOR]

Published

2019