Add to ORKGCluster variables have recently revolutionized numerical work in certain models involving fermionic variables. This novel representation of fermionic partition functions is continuing to find new applications. After describing results from a study of a two dimensional Hubbard type model that confirm a superconducting transition in the Kosterlitz-Thouless universality class, we show how a cluster type algorithm can be devised to study the chiral limit of strongly coupled lattice gauge theories with staggered fermions
The meron cluster algorithm solves the sign problem in a class of interacting fermion lattice models...
Four-fermi models in dimensionality $2<d<4$ exhibit an ultra-violet stable renormalization group fix...
AbstractWe study the SU(3) gauge theory with Nf=12 flavors in the fundamental representation by use ...
A cluster algorithm is constructed and applied to study the chiral limit of the strongly coupled lat...
The recently developed Meron-Cluster algorithm completely solves the exponentially difficult sign pr...
A new meron cluster algorithm is constructed to study the finite temperature critical behavior of th...
It is widely believed that chiral symmetry is spontaneously broken at zero temperature in the strong...
We use a modified directed path algorithm to study the finite temperature chiral singularities of tw...
We present the details of analyzing an SU_L(2)\otimes U_R(1) chiral theory with multifermion couplin...
Journal ArticleThe topological susceptibility of the vacuum in quantum chromodynamics has been simul...
The Meron Cluster algorithm solves the sign problem in a class of interacting fermion lattice models...
Recent research shows that the partition function for a class of models involving fermions can be wr...
In this paper, we present results of numerical lattice simulations of two-flavor QED in three space-...
We revisit the strong coupling limit of the Schwinger model on the lattice using staggered fermions ...
We report new results for a frequently discussed gauge theory with twelve fermion flavors in the fun...
The meron cluster algorithm solves the sign problem in a class of interacting fermion lattice models...
Four-fermi models in dimensionality $2<d<4$ exhibit an ultra-violet stable renormalization group fix...
AbstractWe study the SU(3) gauge theory with Nf=12 flavors in the fundamental representation by use ...
A cluster algorithm is constructed and applied to study the chiral limit of the strongly coupled lat...
The recently developed Meron-Cluster algorithm completely solves the exponentially difficult sign pr...
A new meron cluster algorithm is constructed to study the finite temperature critical behavior of th...
It is widely believed that chiral symmetry is spontaneously broken at zero temperature in the strong...
We use a modified directed path algorithm to study the finite temperature chiral singularities of tw...
We present the details of analyzing an SU_L(2)\otimes U_R(1) chiral theory with multifermion couplin...
Journal ArticleThe topological susceptibility of the vacuum in quantum chromodynamics has been simul...
The Meron Cluster algorithm solves the sign problem in a class of interacting fermion lattice models...
Recent research shows that the partition function for a class of models involving fermions can be wr...
In this paper, we present results of numerical lattice simulations of two-flavor QED in three space-...
We revisit the strong coupling limit of the Schwinger model on the lattice using staggered fermions ...
We report new results for a frequently discussed gauge theory with twelve fermion flavors in the fun...
The meron cluster algorithm solves the sign problem in a class of interacting fermion lattice models...
Four-fermi models in dimensionality $2<d<4$ exhibit an ultra-violet stable renormalization group fix...
AbstractWe study the SU(3) gauge theory with Nf=12 flavors in the fundamental representation by use ...