Green's functions of fermions are described by matrix-valued Herglotz-Nevanlinna functions. Since analytic continuation is fundamentally an ill-posed problem, the causal space described by the matrix-valued Herglotz-Nevanlinna structure can be instrumental in improving the accuracy and in enhancing the robustness with respect to noise. We demonstrate a three-pronged procedure for robust analytic continuation called PES: (1) Projection of data to the causal space. (2) Estimation of pole locations. (3) Semidefinite relaxation within the causal space. We compare the performance of PES with the recently developed Nevanlinna and Carath\'{e}odory continuation methods and find that PES is more robust in the presence of noise and does not require t...
We analyze a family of generalized energy densities in integrable quantum field theories in the pres...
Leaver's method has been the standard for computing the quasinormal mode (QNM) frequencies for a Ker...
Two analysis techniques, the generalized eigenvalue method (GEM) or Prony's (or related) method (PM)...
We report multipronged progress on the stochastic averaging approach to numerical analytic continuat...
Often one has data at points inside the holomorphy domain of a Green’s function, or of an Amplitude ...
HonorsInterdisciplinary PhysicsUniversity of Michiganhttp://deepblue.lib.umich.edu/bitstream/2027.42...
Analytic continuation is an essential step in extracting information about the dynamical properties ...
Honors (Bachelor's)PhysicsUniversity of Michiganhttp://deepblue.lib.umich.edu/bitstream/2027.42/1206...
Analytic continuation maps imaginary-time Green's functions obtained by various theoretical/numerica...
We describe a procedure for alleviating the fermion sign problem in which phase fluctuations are exp...
The analytic continuations (ACs) of the double variable Horn $H_1$ and $H_5$ functions have been der...
The hierarchical equations of motion (HEOM), derived from the exact Feynman-Vernon path integral, is...
Elucidating a connection with nonlinear Fourier analysis, we extend a well known algorithm in quantu...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
The term analytic continuation emerges in many branches of Mathematics, Physics, and, more generally...
We analyze a family of generalized energy densities in integrable quantum field theories in the pres...
Leaver's method has been the standard for computing the quasinormal mode (QNM) frequencies for a Ker...
Two analysis techniques, the generalized eigenvalue method (GEM) or Prony's (or related) method (PM)...
We report multipronged progress on the stochastic averaging approach to numerical analytic continuat...
Often one has data at points inside the holomorphy domain of a Green’s function, or of an Amplitude ...
HonorsInterdisciplinary PhysicsUniversity of Michiganhttp://deepblue.lib.umich.edu/bitstream/2027.42...
Analytic continuation is an essential step in extracting information about the dynamical properties ...
Honors (Bachelor's)PhysicsUniversity of Michiganhttp://deepblue.lib.umich.edu/bitstream/2027.42/1206...
Analytic continuation maps imaginary-time Green's functions obtained by various theoretical/numerica...
We describe a procedure for alleviating the fermion sign problem in which phase fluctuations are exp...
The analytic continuations (ACs) of the double variable Horn $H_1$ and $H_5$ functions have been der...
The hierarchical equations of motion (HEOM), derived from the exact Feynman-Vernon path integral, is...
Elucidating a connection with nonlinear Fourier analysis, we extend a well known algorithm in quantu...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
The term analytic continuation emerges in many branches of Mathematics, Physics, and, more generally...
We analyze a family of generalized energy densities in integrable quantum field theories in the pres...
Leaver's method has been the standard for computing the quasinormal mode (QNM) frequencies for a Ker...
Two analysis techniques, the generalized eigenvalue method (GEM) or Prony's (or related) method (PM)...