Quantitative uniqueness for second-order elliptic operators

Scale-free and quantitative unique continuation for infinite dimensional spectral subspaces of Schrödinger operators, Lipschitz Stable Determination of Polyhedral Conductivity Inclusions from Local Boundary Measurements, Three sphere inequality for second order elliptic equations with coefficients with jump discontinuity, Quasi-Monotonicity Formulas for Classical Obstacle Problems with Sobolev Coefficients and Applications, Strong Unique Continuation Properties of Generalized Baouendi–Grushin Operators, Sharp vanishing order of solutions to stationary Schrödinger equations on Carnot groups of arbitrary step, On quantitative uniqueness for elliptic equations, Carleman Estimates, Optimal Three Cylinder Inequality, and Unique Continuation Properties for Solutions to Parabolic Equations, Quantitative uniqueness for elliptic equations at the boundary of \(C^{1,\operatorname{Dini}}\) domains, Harmonic Analysis and Random Schrödinger Operators, Quantitative uniqueness of solutions to second order elliptic equations with singular potentials in two dimensions, Three spheres inequalities for a two-dimensional elliptic system and its application, A local asymptotic expansion for a solution of the Stokes system, Unique continuation from the edge of a crack, A unique continuation property for a class of parabolic differential inequalities in a bounded domain, Quantitative uniqueness of solutions to parabolic equations, The Unique Continuation Property of Sublinear Equations, Stability for quantitative photoacoustic tomography revisited, A quantitative strong unique continuation property of a diffusive SIS model, The expected nodal volume of non-Gaussian random band-limited functions, and their doubling index, On quantitative unique continuation properties of fractional Schrödinger equations: Doubling, vanishing order and nodal domain estimates, Quantitative unique continuation for Robin boundary value problems on C^{1,1} domains, An anisotropic monotonicity formula, with applications to some segregation problems, Unique continuation for the gradient of eigenfunctions and Wegner estimates for random divergence-type operators, Scale-free unique continuation principle for spectral projectors, eigenvalue-lifting and Wegner estimates for random Schrödinger operators, A quantitative Carleman estimate for second-order elliptic operators, Scale-free quantitative unique continuation and equidistribution estimates for solutions of elliptic differential equations, Optimal uniform bounds for competing variational elliptic systems with variable coefficients, Quantitative uniqueness for fractional heat type operators, Space-like quantitative uniqueness for parabolic operators, The Landis conjecture for variable coefficient second-order elliptic PDEs, The nodal line of the second eigenfunction of the Robin Laplacian in \(\mathbb R^2\) can be closed, Quantitative uniqueness for elliptic equations with singular lower order terms, Optimal three spheres inequality at the boundary for the Kirchhoff-Love plate's equation with Dirichlet conditions, A note on the stability of local zeta functions, Quantitative unique continuation for Neumann problems of elliptic equations with weight, Quantitative unique continuation of solutions to higher order elliptic equations with singular coefficients, Unnamed Item, Carleman Estimates for the Schrödinger Operator. Applications to Quantitative Uniqueness, New monotonicity formulas and the optimal regularity in the Signorini problem with variable coefficients, Quantitative estimates of unique continuation for parabolic equations and inverse initial-boundary value problems with unknown boundaries, Quantitative uniqueness for second order elliptic operators with strongly singular coefficients, Stable determination of an inhomogeneous inclusion by local boundary measurements, Quantitative unique continuation for a parabolic equation, Monotonicity formulas for obstacle problems with Lipschitz coefficients, Quasi-monotonicity formulas for classical obstacle problems with Sobolev coefficients and applications, Asymptotic expansions and unique continuation at Dirichlet-Neumann boundary junctions for planar elliptic equations, Lipschitz stability estimates for an inverse source problem in an elliptic equation from interior measurements, Quantitative uniqueness of solutions to second-order elliptic equations with singular lower order terms, Unique continuation inequalities for the parabolic-elliptic chemotaxis system, An elliptic adaptation of ideas of Carleman and Domar from complex analysis related to Levinson’s loglog theorem, The classical obstacle problem with Hölder continuous coefficients, On Landis’ Conjecture in the Plane, On quantitative uniqueness for parabolic equations, A conditional stability estimate for determining a cavity in an elastic material

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• New bounds for solutions of second order elliptic partial differential equations
• Unique continuation and absence of positive eigenvalues for Schrödinger operators. (With an appendix by E. M. Stein)
• Carleman inequalities for the Dirac and Laplace operators and unique continuation
• Nodal sets of eigenfunctions on Riemannian manifolds
• Three-spheres theorem for second order elliptic equations
• Nodal volumes for eigenfunctions of analytic regular elliptic problems
• A uniqueness theorem for parabolic equations
• Strong Uniqueness Theorems for Second Order Elliptic Differential Equations
• Nodal sets of solutions of elliptic and parabolic equations
• Logarithmic Convexity for Supremum Norms of Harmonic Functions
• SOME PROBLEMS OF THE QUALITATIVE THEORY OF SECOND ORDER ELLIPTIC EQUATIONS (CASE OF SEVERAL INDEPENDENT VARIABLES)