The new algorithm of the finite lattice method is applied to generate the high-temperature expansion series of the simple cubic Ising model to $\beta^{50}$ for the free energy, to $\beta^{32}$ for the magnetic susceptibility and to $\beta^{29}$ for the second moment correlation length. The series are analyzed to give the precise value of the critical point and the critical exponents of the model
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
The Ising problem for the 3-dimensional simple cubic lattice has never been solved in closed form, b...
We have calculated the low-temperature series expansions of the spontaneous magneti-zation and the z...
25th-order high-temperature series are computed for a general nearest-neighbor three-dimensional Isi...
25th-order high-temperature series are computed for a general nearest-neighbor three-dimensional Is...
We introduce a new method for the derivation of high-order low-temperature expansions of the inverse...
We introduce a new method for the derivation of high-order low-temperature expansions of the inverse...
High-temperature series are computed for a generalized three-dimensional Ising model with arbitrary ...
High-temperature series are computed for a generalized three-dimensional Ising model with arbitrary ...
High-temperature series are computed for a generalized $3d$ Ising model with arbitrary potential. T...
We have dramatically extended the zero field susceptibility series at both high and low temperature ...
The high-temperature expansion coefficients of the ordinary and the higher susceptibilities of the s...
[[abstract]]We have calculated the low-temperature series expansions of the spontaneous magnetizatio...
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
The Ising problem for the 3-dimensional simple cubic lattice has never been solved in closed form, b...
We have calculated the low-temperature series expansions of the spontaneous magneti-zation and the z...
25th-order high-temperature series are computed for a general nearest-neighbor three-dimensional Isi...
25th-order high-temperature series are computed for a general nearest-neighbor three-dimensional Is...
We introduce a new method for the derivation of high-order low-temperature expansions of the inverse...
We introduce a new method for the derivation of high-order low-temperature expansions of the inverse...
High-temperature series are computed for a generalized three-dimensional Ising model with arbitrary ...
High-temperature series are computed for a generalized three-dimensional Ising model with arbitrary ...
High-temperature series are computed for a generalized $3d$ Ising model with arbitrary potential. T...
We have dramatically extended the zero field susceptibility series at both high and low temperature ...
The high-temperature expansion coefficients of the ordinary and the higher susceptibilities of the s...
[[abstract]]We have calculated the low-temperature series expansions of the spontaneous magnetizatio...
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
High temperature series expansion for the critical exponents of the Ising model are reanalysed using...
The Ising problem for the 3-dimensional simple cubic lattice has never been solved in closed form, b...
We have calculated the low-temperature series expansions of the spontaneous magneti-zation and the z...
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