On the vanishing of Green's function, desingularization and Carleman's method

Cites Work

Unnamed Item
Quantitative uniqueness for elliptic equations with singular lower order terms
Regularity of weak solutions of elliptic and parabolic equations with some critical or supercritical potentials
The Schrödinger operator on the energy space: Boundedness and compactness criteria
Unique continuation for Schrödinger operators in dimension three or less
Schrödinger operators and unique continuation. Towards an optimal result
Some weighted norm inequalities concerning the Schrödinger operators
Unique continuation and absence of positive eigenvalues for Schrödinger operators. (With an appendix by E. M. Stein)
$L^ p$-theory of Schrödinger semigroups. II
Heat kernel bounds and desingularizing weights.
Sharp kernel estimates for elliptic operators with second-order discontinuous coefficients
Global heat kernel bounds via desingularizing weights
Heat kernel estimates of fractional Schrödinger operators with negative Hardy potential
Factorization and estimates of Dirichlet heat kernels for non-local operators with critical killings
Kernel estimates for elliptic operators with second-order discontinuous coefficients
Quantitative unique continuation principle for Schrödinger operators with singular potentials
Growth properties of solutions of the reduced wave equation with a variable coefficient
SMOOTHNESS OF GENERALIZED SOLUTIONS OF THE EQUATION $ \hat Hu=f$ AND ESSENTIAL SELFADJOINTNESS OF THE OPERATOR $ \hat H=-\sum_{i,j}\nabla_i a_{ij}\nabla_j+V$ WITH MEASURABLE COEFFICIENTS
Schrödinger operators with l l/2w(Rl) -potentials
Heat kernel of fractional Laplacian with Hardy drift via desingularizing weights
Quantitative uniqueness of solutions to second-order elliptic equations with singular lower order terms
Fractional Laplacian with Hardy potential
Fractional Kolmogorov operator and desingularizing weights

This page was built for publication: On the vanishing of Green's function, desingularization and Carleman's method