Sharp heat kernel estimates for relativistic stable processes in open sets

Gradient estimates of \(q\)-harmonic functions of fractional Schrödinger operator, \(L^p\)-Kato class measures for symmetric Markov processes under heat kernel estimates, On fractional tempered stable processes and their governing differential equations, Estimates of Dirichlet heat kernels for subordinate Brownian motions, Off-diagonal heat kernel asymptotics of pseudodifferential operators on closed manifolds and subordinate Brownian motion, Two-sided Dirichlet heat kernel estimates of symmetric stable processes on horn-shaped regions, Small-time sharp bounds for kernels of convolution semigroups, Some properties of non-linear fractional stochastic heat equations on bounded domains, Dirichlet heat kernel estimates for \(\Delta ^{\alpha /2} + \delta ^{\beta /2}\), On estimates of transition density for subordinate Brownian motions with Gaussian components in \(C^{1,1}\)-open sets, An \(L_p\)-theory for a class of non-local elliptic equations related to nonsymmetric measurable kernels, A method of rotations for Lévy multipliers, Heat kernel asymptotics of the subordinator and subordinate Brownian motion, On some properties of a class of fractional stochastic heat equations, Carleman type inequalities for fractional relativistic operators, Free fields associated with the relativistic operator \({-(m-\sqrt{m^{2}-\delta})}\), Relativistic stable operators with critical potentials, Factorization and estimates of Dirichlet heat kernels for non-local operators with critical killings, Global heat kernel estimate for relativistic stable processes in exterior open sets, Global solutions and blowing-up solutions for a nonautonomous and nonlocal in space reaction-diffusion system with Dirichlet boundary conditions, Parabolic Littlewood-Paley inequality for \(\phi(-{\Delta})\)-type operators and applications to stochastic integro-differential equations, Trace estimates for relativistic stable processes, Global heat kernel estimates for relativistic stable processes in half-space-like open sets, Spatial asymptotics at infinity for heat kernels of integro-differential operators, Global heat kernel estimates for symmetric Markov processes dominated by stable-like processes in exterior \(C^{1,\eta}\) open sets, Non-linear noise excitation for some space-time fractional stochastic equations in bounded domains, Global Dirichlet heat kernel estimates for symmetric Lévy processes in half-space, Precise asymptotic approximations for kernels corresponding to Lévy processes, On a class of Calderón-Zygmund operators arising from projections of martingale transforms, Green function estimates for relativistic stable processes in half-space-like open sets, An \(L_q (L_p)\)-theory for diffusion equations with space-time nonlocal operators, Heat kernel estimates for the Dirichlet fractional Laplacian, Dirichlet heat kernel estimates for stable processes with singular drift in unbounded \(C^{1,1}\) open sets, Two-sided estimates for the transition densities of symmetric Markov processes dominated by stable-like processes in \(C^{1, \eta}\) open sets, Multi-scaling limits for relativistic diffusion equations with random initial data, Stability of Dirichlet heat kernel estimates for non-local operators under Feynman-Kac perturbation, ONE-DIMENSIONAL QUASI-RELATIVISTIC PARTICLE IN THE BOX, Estimates of Dirichlet heat kernels for unimodal Lévy processes with low intensity of small jumps, Dirichlet heat kernel estimates for rotationally symmetric Lévy processes, Pointwise eigenfunction estimates and intrinsic ultracontractivity-type properties of Feynman-Kac semigroups for a class of Lévy processes

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• Green function estimates for relativistic stable processes in half-space-like open sets
• Global heat kernel estimates for fractional Laplacians in unbounded open sets
• Relativistic Schrödinger operators: Asymptotic behavior of the eigenfunctions
• On heat kernel estimates and parabolic Harnack inequality for jump processes on metric measure spaces
• Two-sided heat kernel estimates for censored stable-like processes
• Boundary Harnack principle for \(p\)-harmonic functions in smooth Euclidean domains
• Generalized 3G theorem and application to relativistic stable process on non-smooth open sets
• Hartree-Fock theory for pseudorelativistic atoms
• Estimates of Green functions for some perturbations of fractional Laplacian
• Weighted Poincaré inequality and heat kernel estimates for finite range jump processes
• Estimates of tempered stable densities
• Heat kernel estimates for the Dirichlet fractional Laplacian
• Symmetric jump processes and their heat kernel estimates
• Relativistic stability of matter. I
• Spectral analysis of pseudodifferential operators
• Spectral theory of the operator \((p^2+m^2)^{1/2}-Ze^2/r\)
• The stability and instability of relativistic matter
• Estimates on Green functions and Poisson kernels for symmetric stable processes
• Drift transforms and Green function estimates for discontinuous processes
• Estimates of Green function for relativistic \(\alpha\)-stable process
• Conditional gauge theorem for non-local Feynman-Kac transforms
• Heat kernel estimates for the fractional Laplacian with Dirichlet conditions
• Two-sided optimal bounds for Green functions of half-spaces for relativistic \(\alpha\)-stable process
• Heat kernel estimates for jump processes of mixed types on metric measure spaces
• Stability of relativistic matter with magnetic fields for nuclear charges up to the critical value
• Relative Fatou's theorem for (\(-\Delta)^{\alpha/2}\)-harmonic functions in bounded \(\kappa\)-fat open sets
• Two-sided eigenvalue estimates for subordinate processes in domains
• Heat kernel estimates for stable-like processes on \(d\)-sets.
• Continuity of eigenvalues of subordinate processes in domains
• Hardy-Lieb-Thirring inequalities for fractional Schrödinger operators
• Global heat kernel estimates for symmetric jump processes
• Some Theorems on Stable Processes
• Bessel potentials, hitting distributions and Green functions
• Intrinsic ultracontractivity of the Feynman-Kac semigroup for relativistic stable processes
• The large-Z Behavior of pseudorelativistic atoms
• Non-local Dirichlet forms and symmetric jump processes
• The boundary Harnack principle for the fractional Laplacian
• From Brownian Motion to Schrödinger’s Equation