We improve a recently developed expansion technique for calculating real-frequency spectral functions of any one-dimensional model with short-range interactions, by postprocessing computed Chebyshev moments with linear prediction. This can be achieved at virtually no cost, and in sharp contrast to existing methods based on the dampening of the moments, improves the spectral resolution rather than lowering it. We validate the method for the exactly solvable resonating level model and the single impurity Anderson model. It is capable of resolving sharp Kondo resonances, as well as peaks within the Hubbard bands when employed as an impurity solver for dynamical mean-field theory. Our method works at zero temperature and allows for arbitrary di...
We derive an exact mapping from the action of nonequilibrium dynamical mean-field theory (DMFT) to a...
We present an impurity solver based on adaptively truncated Hilbert spaces. The solver is particular...
Density matrix embedding theory (DMET) [Phys. Rev. Lett. 109, 186404 (2012)], introduced an approach...
We improve a recently developed expansion technique for calculating real-frequency spectral function...
International audienceWe compute the spectral functions for the two-site dynamical cluster theory an...
We show that recursively generated Chebyshev expansions offer numerically efficient representations ...
20 pages, 12 figuresWe compute the spectral functions for the two-site dynamical cluster theory and ...
We propose to calculate spectral functions of quantum impurity models using the time evolving block ...
This thesis is concerned with two main topics: first, the advancement of the density matrix renormal...
We present a unified framework for renormalization group methods, including Wilson's numerical renor...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
We extend a previously proposed rotation and truncation scheme to optimize quantum Anderson impurity...
The focus of this thesis is set on the calculation of spectral functions for low-dimensional quantum...
We present a new impurity solver for dynamical mean-field theory based on imaginary-time evolution o...
The development of polynomial cost solvers for correlated quantum impurity models, with controllable...
We derive an exact mapping from the action of nonequilibrium dynamical mean-field theory (DMFT) to a...
We present an impurity solver based on adaptively truncated Hilbert spaces. The solver is particular...
Density matrix embedding theory (DMET) [Phys. Rev. Lett. 109, 186404 (2012)], introduced an approach...
We improve a recently developed expansion technique for calculating real-frequency spectral function...
International audienceWe compute the spectral functions for the two-site dynamical cluster theory an...
We show that recursively generated Chebyshev expansions offer numerically efficient representations ...
20 pages, 12 figuresWe compute the spectral functions for the two-site dynamical cluster theory and ...
We propose to calculate spectral functions of quantum impurity models using the time evolving block ...
This thesis is concerned with two main topics: first, the advancement of the density matrix renormal...
We present a unified framework for renormalization group methods, including Wilson's numerical renor...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
We extend a previously proposed rotation and truncation scheme to optimize quantum Anderson impurity...
The focus of this thesis is set on the calculation of spectral functions for low-dimensional quantum...
We present a new impurity solver for dynamical mean-field theory based on imaginary-time evolution o...
The development of polynomial cost solvers for correlated quantum impurity models, with controllable...
We derive an exact mapping from the action of nonequilibrium dynamical mean-field theory (DMFT) to a...
We present an impurity solver based on adaptively truncated Hilbert spaces. The solver is particular...
Density matrix embedding theory (DMET) [Phys. Rev. Lett. 109, 186404 (2012)], introduced an approach...