The semi‐Euclidean formulation, developed in constructive quantum field theory to handle boson–fermion models, is adapted to the statistical mechanics setting.Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/70058/2/JMAPAQ-17-2-200-1.pd
We derive a field theory for the two-dimensional classical dimer model by applying bosonization to L...
International audienceThe mean-field approximation is at the heart of our understanding of complex s...
Continuing the work of a previous paper, the Glimm-Jaffe-Spencer cluster expansion from constructive...
A formulation is presented for the study of semiboundedness of coupled boson‐fermion model field the...
A form of the Glimm–Jaffe–Spencer cluster expansion, adapted to the statistical mechanics setting, i...
Over the past few decades the powerful methods of statistical physics and Euclidean quantum field th...
The Glimm-Jaffe-Spencer cluster expansion from constructive quantum field theory is adapted to treat...
For most quantum mechanical systems of physical interest, central properties like the energy spectru...
Semidefinite programs can be constructed to provide a non-perturbative view of the zero-temperature ...
'Semiclassical Physics' emphasizes the close connection between the shorter classical periodic orbit...
This book is an introduction to Statistical Field Theory, an important subject of theoretical physic...
Cette thèse est consacrée à la dérivation et à l'étude de différents modèles non-linéaires en mécani...
This is a self-contained and hopefully readable account on the method of creation and annihilation o...
We formulate a general setting for the cluster expansion method and we discuss sufficient criteria f...
We prove a rigorous upper bound on the correlation energy of interacting fermions in the mean-field ...
We derive a field theory for the two-dimensional classical dimer model by applying bosonization to L...
International audienceThe mean-field approximation is at the heart of our understanding of complex s...
Continuing the work of a previous paper, the Glimm-Jaffe-Spencer cluster expansion from constructive...
A formulation is presented for the study of semiboundedness of coupled boson‐fermion model field the...
A form of the Glimm–Jaffe–Spencer cluster expansion, adapted to the statistical mechanics setting, i...
Over the past few decades the powerful methods of statistical physics and Euclidean quantum field th...
The Glimm-Jaffe-Spencer cluster expansion from constructive quantum field theory is adapted to treat...
For most quantum mechanical systems of physical interest, central properties like the energy spectru...
Semidefinite programs can be constructed to provide a non-perturbative view of the zero-temperature ...
'Semiclassical Physics' emphasizes the close connection between the shorter classical periodic orbit...
This book is an introduction to Statistical Field Theory, an important subject of theoretical physic...
Cette thèse est consacrée à la dérivation et à l'étude de différents modèles non-linéaires en mécani...
This is a self-contained and hopefully readable account on the method of creation and annihilation o...
We formulate a general setting for the cluster expansion method and we discuss sufficient criteria f...
We prove a rigorous upper bound on the correlation energy of interacting fermions in the mean-field ...
We derive a field theory for the two-dimensional classical dimer model by applying bosonization to L...
International audienceThe mean-field approximation is at the heart of our understanding of complex s...
Continuing the work of a previous paper, the Glimm-Jaffe-Spencer cluster expansion from constructive...
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