Effective Monte Carlo simulation on System-V massively parallel associative string processing architecture

@article{dor1999EffectiveMC,
  title={Effective Monte Carlo simulation on System-V massively parallel associative string processing architecture},
  author={G{\'e}za {\'O}dor and Anargyros Krikelis and Gyorgy Vesztergombi and Francois Rohrbach},
  journal={Proceedings of the Seventh Euromicro Workshop on Parallel and Distributed Processing. PDP'99},
  year={1999},
  pages={281-288}
}
  • G. Ódor, A. Krikelis, F. Rohrbach
  • Published 3 February 1999
  • Physics, Computer Science
  • Proceedings of the Seventh Euromicro Workshop on Parallel and Distributed Processing. PDP'99
We show that the latest version of massively parallel processing associative string processing architecture (System-V) is applicable for fast Monte Carlo simulation if an effective on-processor random number generator is implemented. Our lagged Fibonacci generator can produce 10/sup 8/ random numbers on a processor string of 12 K PE-s. The time dependent Monte Carlo algorithm of the one-dimensional non-equilibrium kinetic Ising model performs 80 faster than the corresponding serial algorithm on… 

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References

SHOWING 1-10 OF 31 REFERENCES

ASP: a cost-effective parallel microcomputer

  • R. Lea
  • Computer Science
    IEEE Micro
  • 1988
The author presents ASP architecture, which offers cost-effective support of a wide range of numerical and nonnumerical computing applications, using state-of-the-art microelectronic technology to

One-dimensional non-equilibrium kinetic Ising models with branching annihilating random walk

Non-equilibrium kinetic Ising models evolving under the competing effect of spin flips at zero temperature and nearest-neighbour spin exchanges at T= infinity are investigated numerically from the

A modular massively parallel computing approach to image-related processing

TLDR
The experience with ASTRA in image related application development and system performance has led to a technology road-map using VLSI, MCM, and monolithic WSI technologies aiming at 'future proofing' of the Modular-MPC concept and systems achieving T (10/sup 12/) operations per second performance.

Theory of Branching and Annihilating Random Walks.

TLDR
A new universality class has been observed in d = 1 for even values of m, when the number of particles is locally conserved modulo 2, and another issue which clearly requires theoretical explanation is the occurrence of a transition at a finite value of σm.

One-dimensional kinetic Ising model with competing dynamics: Steady-state correlations and relaxation times.

TLDR
It is found that neither the steady-state nor the dynamic quantities show any sign of a phase transition that could exist in this one-dimensional, nonequilibrium system.

On the nonequilibrium phase transition in reaction-diffusion systems with an absorbing stationary state

It is pointed out that chemical reactions which show an absorbing stationary state in the master-equation approach (e.g. Schlögl's first reaction) exhibit nevertheless a second order phase transition

Extinction, survival, and dynamical phase transition of branching annihilating random walk.

TLDR
Analysis of statistical properties of random walkers which disappear when they meet and make offsprings by a controllable rate and Universality classes are found to depend on the number of offsprins in space dimension less than 3.

PHASE TRANSITIONS AND CRITICAL BEHAVIOUR IN ONE-DIMENSIONAL NON-EQUILIBRIUM KINETIC ISING MODELS WITH BRANCHING ANNIHILATING RANDOM WALK OF KINKS

One-dimensional non-equilibrium kinetic Ising models evolving under the competing effect of spin flips at zero temperature and nearest-neighbour spin exchanges exhibiting a parity-conserving (PC)

Non-equilibrium phase transitions in one-dimensional kinetic Ising models

A family of nonequilibrium kinetic Ising models, introduced earlier, evolving under the competing effect of spin flips at zero temperature and nearest-neighbour random spin exchanges, is further