Fisher Transform: Difference between revisions

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'''The Fisher transform''' is an indicator that identifies trend reversals. This oscillator can be successfully used for any financial instruments. This instrument was founded by J. F. Ehlers and aims to transform the distribution of [[price]] changes into a normal (Gaussian) distribution. The sign values swing around the zero line forming clear turning points, which simplifies the classification of trend reversals. This indicator is widely used as part of a trading procedure based on price [[action]] and is rather not used alone. '''The Fisher Transform''' is an uncomplicated analytical [[process]] used to transform any data set into a transformed data set whose Probability Density Function (PDF) is generally Gaussian (J.F.Ehlers 2011, p.2). The Fisher Transform provides more precise, sharper turning points than a regular momentum-class sign (Wiley 2017,p.441). The '''mission of the Fisher Transform''' is to take any sign possessing a nominally zero mean and bounced among the limits of -1 to +1 and transform the amplitude so that the modified indicator has an estimated natural possibility distribution (J.F.Ehlers 2013,p.195).
'''The Fisher transform''' is an indicator that identifies trend reversals. This oscillator can be successfully used for any financial instruments. This instrument was founded by J. F. Ehlers and aims to transform the distribution of [[price]] changes into a normal (Gaussian) distribution. The sign values swing around the zero line forming clear turning points, which simplifies the classification of trend reversals. This indicator is widely used as part of a trading procedure based on price [[action]] and is rather not used alone. '''The Fisher Transform''' is an uncomplicated analytical [[process]] used to transform any data set into a transformed data set whose [[Probability density function|Probability Density Function]] (PDF) is generally Gaussian (J.F.Ehlers 2011, p.2). The Fisher Transform provides more precise, sharper turning points than a regular momentum-class sign (Wiley 2017,p.441). The '''mission of the Fisher Transform''' is to take any sign possessing a nominally zero mean and bounced among the limits of -1 to +1 and transform the amplitude so that the modified indicator has an estimated natural possibility distribution (J.F.Ehlers 2013,p.195).


==The formula of the Fisher Transform==
==The formula of the Fisher Transform==

Revision as of 05:30, 20 January 2023

Fisher Transform
See also

The Fisher transform is an indicator that identifies trend reversals. This oscillator can be successfully used for any financial instruments. This instrument was founded by J. F. Ehlers and aims to transform the distribution of price changes into a normal (Gaussian) distribution. The sign values swing around the zero line forming clear turning points, which simplifies the classification of trend reversals. This indicator is widely used as part of a trading procedure based on price action and is rather not used alone. The Fisher Transform is an uncomplicated analytical process used to transform any data set into a transformed data set whose Probability Density Function (PDF) is generally Gaussian (J.F.Ehlers 2011, p.2). The Fisher Transform provides more precise, sharper turning points than a regular momentum-class sign (Wiley 2017,p.441). The mission of the Fisher Transform is to take any sign possessing a nominally zero mean and bounced among the limits of -1 to +1 and transform the amplitude so that the modified indicator has an estimated natural possibility distribution (J.F.Ehlers 2013,p.195).

The formula of the Fisher Transform

The Fisher Transform converts the Probability Density Function (PDF) of any waveform so that the converted output has a generally Gaussian PDF. The formula of the Fisher Transform is presented as (J.F.Ehlers 2011,p.3):

  • x = the input
  • y = the output
  • ln = the natural logarithm

The Inverse of the Fisher Transform

The Inverse Fisher Transform is perfect for forming a pointer that presents clear buy and sells signs in the cause of bipolar possibility delivery. This formula is discovered by solving comparison 1 for x in terms of y. The formula of the Inverse Fisher Transform is compressive and it is shown as (J.Ehlers 2004, p.1):

References

Author: Paulina Zając