The equivalence is proved between fermionic and scalar field theories on Riemann surfaces of arbitrary topology. The effects of global topology include a modification of the bosonic action
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
The existence of localized, approximately stationary, lumps of the classical gravitational and elect...
The theory of representations of loop groups provides a framework where one can consider Riemann sur...
The equivalence is proved between fermionic and scalar field theories on Riemann surfaces of arbitra...
We prove the equivalence between certain fermionic and bosonic theories in two spacetime dimensions....
This talk describes some work done jointly with L. Alvarez-Gaume, J.B. Bost, G. Moore, and C. Vafa [...
We extend the previous results of exact bosonization, mapping from fermionic operators to Pauli matr...
We describe an n-dimensional (n≥2) analog of the Jordan-Wigner transformation, which maps an arbitra...
We study bosons interacting with an abelian Chern-Simons field on Riemann surfaces of genus $g>0$. I...
We develop a new method for bosonizing the Fermi surface based on the formalism of the coadjoint orb...
We extend an existing Bose-Fermi equivalence formula to two-dimensional Euclidean space-times with a...
We calculate the n-point correlation functions of spin fields on an arbitrary genus Riemann surface....
The (1+1)-dimensional bosonization relations for fermionic mass terms are derived by choosing a spec...
This review is a summary of my work (partially in collaboration with Kurt Schoenhammer) on higher-di...
Bosonization is a useful technique for studying systems of interacting fermions in low dimensions. I...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
The existence of localized, approximately stationary, lumps of the classical gravitational and elect...
The theory of representations of loop groups provides a framework where one can consider Riemann sur...
The equivalence is proved between fermionic and scalar field theories on Riemann surfaces of arbitra...
We prove the equivalence between certain fermionic and bosonic theories in two spacetime dimensions....
This talk describes some work done jointly with L. Alvarez-Gaume, J.B. Bost, G. Moore, and C. Vafa [...
We extend the previous results of exact bosonization, mapping from fermionic operators to Pauli matr...
We describe an n-dimensional (n≥2) analog of the Jordan-Wigner transformation, which maps an arbitra...
We study bosons interacting with an abelian Chern-Simons field on Riemann surfaces of genus $g>0$. I...
We develop a new method for bosonizing the Fermi surface based on the formalism of the coadjoint orb...
We extend an existing Bose-Fermi equivalence formula to two-dimensional Euclidean space-times with a...
We calculate the n-point correlation functions of spin fields on an arbitrary genus Riemann surface....
The (1+1)-dimensional bosonization relations for fermionic mass terms are derived by choosing a spec...
This review is a summary of my work (partially in collaboration with Kurt Schoenhammer) on higher-di...
Bosonization is a useful technique for studying systems of interacting fermions in low dimensions. I...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
The existence of localized, approximately stationary, lumps of the classical gravitational and elect...
The theory of representations of loop groups provides a framework where one can consider Riemann sur...
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