analytical realization

The analytical realization module is one of three similar modules (the other two are lithologic realization and stratigraphic_realization), which allows you to very quickly generate statistical realizations of your 2D and 3D kriged models based upon C Tech's Proprietary Extended Gaussian Geostatistical Simulation (GGS) technology, which we refer to as Fast Geostatistical Realizations^© or FGR^©. Our extensions to GGS allow you to:

• Create realizations very rapidly
• Exercise greater control over the frequency and magnitude of noise typical in GGS.
• Control deviation magnitudes from the nominal kriged prediction based on a Min Max Confidence Equivalent.
  • Deviations are the absolute value of the changes to the analytical prediction (in user units)
• Apply Simple or Advanced Anisotropy control over 2D or 3D wavelengths

C Tech's FGR^© creates more plausible cases (realizations) which allow the Nominal concentrations to deviate from the peak of the bell curve (equal probability of being an under-prediction as an over-prediction) by the same user defined Confidence.  However, FGR allows the deviations to be both positive (max) and negative (min), and to fluctuate in a more realistic randomized manner.

Module Input Ports

• Realization [Special Field] Accepts outputs from 3d estimation and krig_2d to allow for EGGS models to be created

Module Output Ports

• Output Field [Field] Outputs the subsetting level
• Deviations Field [Field] Outputs the deviations from the nominal kriged model

Important Parameters

There are several parameters which affect the realizations. A brief description of each follows:

• Randomness Generator Type
  • There are four types, each of which create a different 2D/3D random distribution
• Anisotropy Mode
  • Two options here are Simple or Advanced. These are equivalent to the variogram settings in 3d estimation or krig_2d
• Seed
  • The "Seed" is used in the random number generator, and makes it reproducible.
  • Unique seeds create unique realizations
• Wavelength
  • The 2D or 3D random distribution is governed by a mean wavelength that determines the apparent frequency of deviations from the nominal kriged result.
  • Wavelength is in your project coordinates (e.g. meters or feet)
  • Longer wavelengths create smoother realizations
  • Shorter wavelengths create more "noisy" variations in the realizations
  • Very short wavelengths will give results more similar to GGS (aka Sequential Gaussian Simulations)
• Min Max Confidence Equivalent
  • This parameter determines the magnitude of the deviations.
  • Values close to 50% result in outputs that deviate very little from the nominal kriged result.
    • (we do not allow values below 51% for algorithm stability reasons)
  • Values at or approaching 99.99% will result in the greatest (4 sigma) variations (more similar to GGS)