We extend the coupled-cluster method to correlated quantum dynamics of both closed and open systems at finite temperatures using the thermofield formalism. The approach expresses the time-dependent density matrix in an exponential ansatz and describes time-evolution along the Keldysh path contour. A distinct advantage of the approach is exact trace-preservation as a function of time, ensuring conservation of probability and particle number. Furthermore, the method avoids the computation of correlated bra-states, simplifying the computational implementation. We develop the method in a thermal quasiparticle representation, which allows seamless connection to the projection method and diagrammatic techniques of the traditional coupled-cluster ...
We recently introduced the dynamical cluster approximation (DCA), a technique that includes short-ra...
We describe the use of coupled-cluster theory as an impurity solver in dynamical mean-field theory (...
This thesis describes several topics related to finite temperature studies of strongly correlated sy...
We extend the coupled-cluster method to correlated quantum dynamics of both closed and open systems ...
We leverage the Keldysh formalism to extend our implementation of finite temperature coupled cluster...
We present a time-dependent formulation of coupled cluster theory. This theory allows for direct com...
We extend the finite-temperature Keldysh non-equilibrium coupled cluster theory (Keldysh-CC) [A. F. ...
Chain-mapping techniques in combination with the time-dependent density matrix renormalization group...
Coupled cluster theory is the one of the most accurate methods for detg. the electronic structure of...
We describe a formulation of the density matrix embedding theory at finite temperature. We present a...
Density matrix embedding theory (DMET) [Phys. Rev. Lett. 109, 186404 (2012)], introduced an approach...
Combining a computationally efficient and affordable molecular dynamics approach, based on atom-c...
We use a nonequilibrium implementation of the dynamical cluster approximation (DCA) to study the eff...
We introduce a method “DMT” for approximating density operators of 1D systems that, when combined wi...
We derive an intrinsically temperature-dependent approximation to the correlation grand potential fo...
We recently introduced the dynamical cluster approximation (DCA), a technique that includes short-ra...
We describe the use of coupled-cluster theory as an impurity solver in dynamical mean-field theory (...
This thesis describes several topics related to finite temperature studies of strongly correlated sy...
We extend the coupled-cluster method to correlated quantum dynamics of both closed and open systems ...
We leverage the Keldysh formalism to extend our implementation of finite temperature coupled cluster...
We present a time-dependent formulation of coupled cluster theory. This theory allows for direct com...
We extend the finite-temperature Keldysh non-equilibrium coupled cluster theory (Keldysh-CC) [A. F. ...
Chain-mapping techniques in combination with the time-dependent density matrix renormalization group...
Coupled cluster theory is the one of the most accurate methods for detg. the electronic structure of...
We describe a formulation of the density matrix embedding theory at finite temperature. We present a...
Density matrix embedding theory (DMET) [Phys. Rev. Lett. 109, 186404 (2012)], introduced an approach...
Combining a computationally efficient and affordable molecular dynamics approach, based on atom-c...
We use a nonequilibrium implementation of the dynamical cluster approximation (DCA) to study the eff...
We introduce a method “DMT” for approximating density operators of 1D systems that, when combined wi...
We derive an intrinsically temperature-dependent approximation to the correlation grand potential fo...
We recently introduced the dynamical cluster approximation (DCA), a technique that includes short-ra...
We describe the use of coupled-cluster theory as an impurity solver in dynamical mean-field theory (...
This thesis describes several topics related to finite temperature studies of strongly correlated sy...