Critical exponents in Monte Carlo simulations

In summary, the conversation discusses the difficulty in determining the critical exponent ##\alpha## in Monte Carlo simulations of classical spin systems. The equations ##M \propto L^{-\frac{\beta}{\nu}}, \chi \propto L^{\frac{\gamma}{\nu}}, ## and ##C_V \propto L^{\frac{\alpha}{\nu}}## are mentioned, as well as the relation ##2-\alpha=d\nu## and the need to calculate ##\frac{\alpha}{\nu}## from the slope of the curve ##\ln C_V## as a function of ##\ln L##. The speaker also mentions not being able to find the exponent ##\alpha## in a table for
  • #1
LagrangeEuler
717
20
In Monte Carlo simulation of classical spin systems I have a trouble to determine critical exponent ##\alpha##.
##M \propto L^{-\frac{\beta}{\nu}} ##
## \chi \propto L^{\frac{\gamma}{\nu}} ##
## C_V \propto L^{\frac{\alpha}{\nu}} ##
Is this correct? From that slope of the curve ##\ln Cv## as a function of ##\ln L## determines ##\frac{\alpha}{\nu}##. There is relation ##2-\alpha=d\nu ##, where ##d## is dimension of the lattice. What is a problem with determining ##\alpha##? I didn't get exponent ##\alpha## from the table for ##2d## and ##3d## Ising model.
 
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  • #2
Maybe there is some different way for calculating critical exponents in simulation. If you know that another way please tell me. Tnx.
 

1. What are critical exponents in Monte Carlo simulations?

Critical exponents in Monte Carlo simulations are mathematical parameters that describe the behavior of a physical system at its critical point, where it undergoes a phase transition. They are used to characterize the relationship between different physical quantities, such as the correlation length and the temperature, at the critical point.

2. How are critical exponents determined in Monte Carlo simulations?

Critical exponents are determined through the use of Monte Carlo simulations, which involve running computer simulations to model the behavior of a physical system. By analyzing the data generated from these simulations, critical exponents can be calculated and used to understand the behavior of the system at its critical point.

3. What is the significance of critical exponents in Monte Carlo simulations?

The critical exponents in Monte Carlo simulations provide important information about the behavior of a physical system at its critical point. They can help researchers understand the nature of phase transitions and the critical behavior of the system, and can also be used to test the validity of theoretical models.

4. Can critical exponents be used to predict the behavior of a physical system?

While critical exponents can provide valuable insights into the behavior of a physical system, they cannot be used to predict the exact behavior of the system. This is because critical exponents are dependent on the specific conditions and parameters of the system, and may vary in different situations.

5. Are critical exponents universal in Monte Carlo simulations?

Yes, critical exponents are considered to be universal in Monte Carlo simulations. This means that they are independent of the specific details of the system, and only depend on the dimensionality and symmetry of the system. This universality allows for the use of critical exponents in studying a wide range of physical systems.

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