49. Statistical Dispersion, Normal or Relative
49.1. On the
Difference Between Normal or Relative Statistical Dispersion
49.1.1. The
Differentiation of Types of Statistical Dispersion
Within the study
of statistical dispersion, it is essential to differentiate between
several types. In Introduction to Impossible Probability (section 14),
various models of relative statistics are explained, which contrast with
the framework of normal statistics. These distinctions are necessary because
dispersion does not have a single form; it depends on the reference point
adopted and on whether the statistical method remains tied to the classical
mean or moves beyond it into alternative formulations.
49.1.2.
Normal Statistics versus Relative Statistics
Traditional
statistics, as it has been historically practiced, is always normal
statistics. This is because it exclusively understands dispersion through
the calculation of differential scores relative to the arithmetic mean.
The Second Method of Impossible Probability, however, opens the
possibility of alternative statistics, in which dispersion is not
necessarily calculated with reference to the arithmetic mean. These
alternatives are collectively referred to as relative statistics,
because they allow for differential comparisons against values other than the
mean, such as theoretical or ideal probabilities.
49.1.3. The
Principle of Dispersion: Individual and Sample Levels
The study of
dispersion begins with the differential behavior of any subject or option
with respect to a chosen reference probability—whether theoretical, ideal, or
empirical. This form of dispersion, originating from each subject or option, is
known as individual dispersion. Depending on the reference point, it can
be classified as either normal or relative.
From individual
dispersion, one then derives sample dispersion, which aggregates the
differentials of individual elements. Sample dispersion too can be normal or
relative, depending on the statistical framework applied. In this sense,
dispersion is not a monolithic measure but a layered process: it begins with
individual behavior and culminates in collective tendencies.
49.1.4.
Normal Dispersion as the Default Form
Unless otherwise
specified, any reference to “dispersion”—whether individual or
sample-level—should be understood as normal dispersion. Normal
dispersion is defined as the differential behavior of empirical probability
minus theoretical probability, where theoretical probability is represented
by the inversion of 
(1/N).
In this
framework, the origin of all statistical dispersion is the individual
dispersion. The average of these individual dispersions forms the basis for the
study of sample dispersion. Specifically, the origin of normal dispersion is
the Level of Bias, which measures the difference between empirical and
theoretical probabilities. This makes the Level of Bias the foundation upon
which all normal dispersion is constructed.
49.1.5. The
Role of the Arithmetic Mean in Normal Dispersion
In Impossible
Probability, whenever dispersion is mentioned without qualification, it
typically refers to normal dispersion. This is because, unless stated
otherwise, dispersion within a sample is calculated with reference to the arithmetic
mean. The mean of empirical probabilities, by definition, coincides with
the theoretical probability—again, the inversion of N. This highlights the
multifunctional role of the inversion of N, which operates simultaneously as a
measure of theoretical probability, as a reference point for bias, and as the
baseline for normal dispersion.
49.1.6. Distinguishing Normal and Relative Dispersion
To classify
different types of dispersion, it is not enough to distinguish only between theoretical
versus empirical dispersion, or between individual versus sample
dispersion. A more fundamental distinction must be drawn between normal
dispersion and relative dispersion.
This difference
is not merely terminological but methodological. It reflects two distinct types
of statistics:
- Normal statistics, which measure dispersion
relative to the arithmetic mean and theoretical probability.
- Relative statistics, which measure
dispersion relative to other reference values, opening the possibility of
alternative models that challenge the monopoly of the mean in statistical
reasoning.
This distinction
expands the epistemological scope of statistics, situating Impossible
Probability as a framework that acknowledges both traditional and
innovative forms of dispersion, each corresponding to different ways of
understanding variability in empirical and theoretical contexts.
2. Normal
Statistical Dispersion, Individual or Sample-Based, Empirical
49.2.1.
Normal Statistics as Reference to the Arithmetic Mean
By normal
statistics is understood that form of statistics which takes the arithmetic
mean as its reference point. In the First Method (section 4), this
is the classical form of statistics: dispersion is calculated from the
differences of scores relative to the mean. In contrast, in the Second
Method of Impossible Probability (section 3), the reference is no longer
the arithmetic mean of direct scores but rather the inversion of N (1/N).
Within this framework, normal empirical individual dispersion is defined
as the normal Level of Bias.
Thus, in the
Second Method, normal statistics are structured around theoretical
probability as the axis of reference. By contrast, relative statistics
are defined as those in which the reference point is any empirical, ideal, or
theoretical value other than the inversion of N.
49.2.2.
Normal Statistics as the Default Case
Unless otherwise
specified—such as when explicitly discussing relative statistics—whenever Introduction
to Impossible Probability refers to statistics or dispersion, it refers to normal
statistics or normal dispersion.
Within normal
statistics, it is necessary to distinguish between:
- Individual dispersion and sample
dispersion; and within each of these,
- Theoretical dispersion and empirical
dispersion.
The empirical
origin of all dispersion is individual dispersion, which is grounded in the normal
Level of Bias (or simply Level of Bias). Unless otherwise indicated,
the term Level of Bias must always be understood to mean the normal
Level of Bias, as this is the default case in a normal statistical model.
49.2.3. The
Level of Bias as the Basis of Empirical Dispersion
The normal
Level of Bias—defined as the difference between empirical probability and
theoretical probability—is the foundation of all empirical dispersion. From it,
normal sample dispersion (or simply sample dispersion) is derived.
Sample
dispersion integrates the classical measures:
- Mean Deviation,
- Variance, and
- Standard Deviation.
Normal Mean
Deviation is the average of the sum of the absolute values of the normal Levels
of Bias. In essence, the sum of all Levels of Bias is the Total Bias.
Therefore:
The order of the
factors does not alter the product: Mean Deviation is essentially the product
of bias and chance. This fundamental identity is developed in section 13 of Introduction
to Impossible Probability.
49.2.4.
Variance and Standard Deviation in the Second Method
In traditional
statistics (the First Method), the preferred way to neutralize negative signs
in differential scores is to square them, thereby ensuring that the sum
of differentials is not zero. This results in Variance, which is the
quadratic estimation of sample empirical dispersion.
Transposed into
the Second Method, this becomes the average of the squared Levels of Bias.
Subsequently, because differential scores (First Method) or Levels of Bias
(Second Method) are not themselves squared when used in final comparisons, it
is necessary to take the square root of the Variance to make results
comparable. The result is the Standard Deviation.
In Impossible
Probability, Standard Deviation is central to the construction of Typical
Score models, and their respective forms of rational criticism,
which are notably distinct from traditional models. These are explained in
detail in section 15.
49.2.5.
Theoretical Dispersion in Normal Statistics
While empirical
normal individual dispersion is expressed by the Level of Bias, and empirical
normal sample dispersion by Mean Deviation, Variance, and Standard
Deviation, the estimation of theoretical dispersion (individual or
sample) depends on the type of universe under study.
Impossible
Probability distinguishes between:
- Universes of infinite subjects or options,
and
- Universes of limited options.
This
differentiation is crucial, because the calculation of theoretical dispersion
changes according to the type of universe.
49.2.6. The
Multifunctionality of the Inversion of N
The inversion
of N (1/N) must be treated with special attention due to its multifunctionality.
It acts simultaneously as:
- the theoretical probability of occurrence by
chance under equality of opportunities,
- the arithmetic mean of empirical probabilities,
- the probability of sampling error and the probability
of theoretical dispersion only in infinite universes
In infinite
universes, 1/N measures both error and theoretical dispersion. In limited
universes, however, these same functions (error and theoretical dispersion) are
fulfilled by the inversion of the sum of direct scores or frequencies,
expressed as:
49.2.7.
Sample Size and Theoretical Dispersion
The reason why
the inversion of the selected sample—whether 1/N in infinite universes or 1/Σxi
in limited universes—represents the probability of theoretical dispersion
lies in the relationship between sample size and representativity.
- As the sample size increases, the probability of
sampling error decreases, and the empirical probabilities tend to converge
toward the theoretical probability (1/N).
- Consequently, larger samples imply a higher
probability of achieving zero Level of Bias and thus lower
dispersion.
- Conversely, smaller samples imply a higher
probability of dispersion.
Therefore, the
probability of theoretical dispersion is inversely proportional to the
sample size: the smaller the sample, the higher the probability of
theoretical dispersion; the larger the sample, the lower that probability.
49.2.8.
Empirical and Theoretical Dispersion Compared
It is crucial to
note that a higher or lower probability of theoretical dispersion does not
automatically entail higher or lower empirical dispersion. For example, in a
sufficiently representative study of bias, increasing the sample size improves
reliability, but empirical dispersion may still increase if the experimental
variable impacts the ideals positively.
In essence:
- The normal Level of Bias measures individual
empirical dispersion.
- Mean Deviation, Variance, and Standard Deviation
measure sample empirical dispersion.
- The inversion of the sample—1/N in infinite
universes or 1/Σxi in limited universes—measures theoretical dispersion
and empirical error (the sampling error).
49.2.9. The
Maximum Statistical Values of Normal Dispersion
Once empirical
and theoretical dispersions have been determined—through either individual or
sample statistics—it is possible to establish the maximum statistical values
of dispersion. These include:
- At the individual level:
- Maximum Theoretical Bias Possible,
- Maximum Negative Bias Possible.
- At the sample level:
- Maximum Theoretical Mean Deviation Possible,
- Maximum Theoretical Variance Possible,
- Maximum Theoretical Standard Deviation Possible.
These measures
provide the theoretical boundaries for normal dispersion. They may also be
adapted to the First Method (section 12), by aligning empirical individual
statistics with empirical sample dispersion statistics, thereby bridging the
classical framework with the innovations of Impossible Probability.
49.3.
Relative Statistics and Relative Dispersion
49.3.1. Alternative
Statistics and the Emergence of Relative Dispersion
In the
traditional framework of statistics, the term dispersion has always been
understood in a restricted sense. Without serious debate or the suggestion of
alternatives, dispersion was taken to mean the differential score at the
individual level, or—at the sample level—the classical measures of Mean
Deviation, Variance, or Standard Deviation. This implicit assumption
excluded the possibility that dispersion could be conceived in fundamentally
different ways. [As we said before, there is always room for a third way, a
fourth way, a fifth way… an nth way; it all depends on our level of
intelligence. As we have stated many times, probability is not deterministic—it
is stochastic—and therefore is founded on a very complex system.]
However, one of
the most important contributions of Impossible Probability is to show
that alternative forms of statistics are possible. Indeed, the very
discipline of statistical probability as formulated in the Second Method
already constitutes a profound alternative to the traditional approach to
probability and statistics.
Because of this
innovative character, Impossible Probability makes it possible not only
to retain the normal study of dispersion in relation to theoretical
probability, but also to develop entirely new models of statistics.
These are grounded on a different conception of dispersion—whether individual
or sample-based—and they open new ways of understanding the variability of
reality. Since the study of reality is always based on the study of differences
in behavior, alternative statistics become a natural extension of critical
rational analysis.
[This sentence
is really important: “entirely new models of statistics.” Our belief is that
there is not only one First Method or one Second Method—there could be many
more possible methods to develop. In the same way that poetry is merely the
combination of letters, mathematics is just that: poetry written in a different
language—mathematical poetry. That is why we believe a Supermachine, GAI, Gaia,
Mother, could be capable of developing non-human mathematics, as it would be
able to carry out more operations than a human being. In the end, this could
result in a qualitative transformation evolving into a quantitative
transformation (qualitative changes lead to quantitative changes according to
Hegel, Marx and Engels), which might give birth to new mathematical languages
and, therefore, new mathematical operations—purely non-human operations beyond
human understanding. Upon reaching that point, the gap between humanity and the
Supermachine could only be bridged through cyborg robotics.]
49.3.2. Normal
Statistics and Relative Statistics
Within this
framework, normal statistics are defined as those that take the arithmetic
mean as the reference point. In the Second Method of Impossible
Probability, this reference is expressed as the inversion of N (1/N),
which is equivalent to theoretical probability.
By contrast, relative
statistics are defined as all those that do not use the inversion of N as
the axis of reference. Instead, relative statistics may use any empirical,
ideal, or theoretical probability
like the Theoretival intermediate probability as their pole of comparison. This innovation
breaks the monopoly of the mean as the sole center of statistical reasoning,
allowing dispersion to be measured with respect to multiple alternative points.
Thus, whereas
classical statistics recognized only dispersion relative to the mean, Impossible
Probability allows for the study of dispersion relative to any chosen
term of probability—empirical, theoretical, or normative—depending on the
scientific objective.
[The Theoretical
Intermediate Probability, equal to (1+0) ÷ 2 = 0.5, could be valid in studies
of normal positive bias, when only one subject or option is ideal. It can be
used to analyze whether that unique subject or option is above 0.5, while the
remaining N-1 subjects or options are below 0.5.]
49.3.3. Types
of Relative Statistics
From this
perspective, several kinds of relative statistics can be identified.
Each one defines dispersion relative to a different empirical or theoretical
anchor. The principal forms are:
49.3.3.1.
Relative Statistics with Respect to the Maximum Probability, p(xi+)
Here, the point
of reference is the maximum empirical probability in the sample, i.e.,
the highest observed probability among all subjects or options.
- Relative Bias (to the maximum):
- Relative Mean Deviation (to the maximum):
This framework
measures how far each subject deviates from the “strongest” or most frequent
case in the sample. [The reason why the Relative Mean Deviation to the Maximum
is divided by N-1 is that we need to subtract one from N, since the subject or
option with the maximum empirical probability is not included in the sum. The
same happens in the Relative Mean Deviation to the Minimum]
49.3.3.2.
Relative Statistics with Respect to the Minimum Probability,p(xi-)
In this case,
the point of reference is the minimum empirical probability in the
sample, i.e., the lowest observed probability.
- Relative Bias (to the minimum):
- Relative Mean Deviation (to the minimum):
This model
captures how all other probabilities diverge from the least frequent or weakest
case.
49.3.3.3.
Relative Statistics with Respect to the Intermediate Probability, p(xi+/-)
The intermediate
probability is defined as the arithmetic midpoint between the maximum and
minimum probabilities:
·
Relative Bias (to the intermediate):
·
Relative Mean Deviation (to the
intermediate):
·
This model situates dispersion around a balanced
central point between extremes, useful for assessing tendencies toward
equilibrium or polarization. [Here, the total is divided by N because all the
subjects or options have been included in the sum.]
[In this
examples I did not write the examples related to the Theoretical Intermediate
probability (1+0):2=0, but it could be applied as well to develop the Relative
Statistics with Respect to the Theoretical Intermediate Probability]
49.3.3.4.
Relative Statistics with Respect to the Closest Probability to the Theoretical
Value, p(xi≈)
This case
focuses on the empirical probability closest to the theoretical probability
(inversion of N). It is the probability with the lowest Level of Bias
and the greatest similarity to theoretical expectation.
- Relative Bias (to the closest):
- Relative Mean Deviation (to the closest):
- This measure highlights how dispersion behaves
relative to the “most representative” or theoretically accurate element of
the sample.
49.3.3.5.
Relative Statistics with Respect to Any Arbitrary Probability,p(xn)
Finally, it is
possible to define dispersion relative to any empirical probability in
the sample, or to any other term of probability freely chosen by scientific
policy. This arbitrary anchor, 
, reflects the role of normative
decisions in shaping the focus of research.
- Relative Bias (to the chosen value):
- Relative Mean Deviation (to the chosen value):
This form
demonstrates the flexibility of relative statistics: dispersion can be studied
in reference to any focal point deemed significant by the goals of science.
49.3.4.The
Critical Bias as a Special Case of Relative Statistics
It is worth
noting that even the Critical Level of Bias—defined as the difference
between empirical probability and critical probability—is, in essence, a form
of relative statistic. It simply anchors dispersion to a “critical”
probability rather than to the mean or inversion of N.
49.3.5.Toward
a General Framework of Relative Statistics
Each of these
models of relative statistics can be expanded beyond Bias and Mean Deviation to
include full systems of statistical elaboration. In fact, section 14 of Introduction
to Impossible Probability explores these in detail, including models of
rational criticism for testing hypotheses within each possible form of
relative statistic.
The key
innovation lies in recognizing that dispersion is not bound to a single
reference point. Rather, it is a flexible construct, capable of being
redefined according to the empirical, theoretical, or normative anchor chosen.
This opens new avenues for understanding variability, inequality, and
convergence within the dynamics of probability.
[n the
exploration of new mathematical models, as if we were writing poetry,
Superintelligence and Global AI could become one of the most important drivers
of mathematical development in the near future.]
49.4. Factors
or Variables of Dispersion
49.4.1. Dispersion as a
Dependent Variable
Dispersion—whether normal
or relative—must be understood as a dependent variable. Its
magnitude is not absolute but conditioned by several factors. The first and
most fundamental factor is the size of the sample. As explained in
earlier sections regarding why the inversion of the sample is considered the
measure of theoretical dispersion, empirical dispersion—whether calculated in
normal or relative statistics—depends critically on the magnitude of the
sample selected.
In universes of infinite subjects
or options, the determinant is N, while in universes of limited options,
it is the sample of direct scores or frequencies. In both cases,
empirical dispersion is variable:
- Smaller samples tend to produce greater
empirical dispersion.
- Larger samples tend to reduce empirical
dispersion.
Thus, sample size operates as a
stabilizing or destabilizing factor in the behavior of dispersion.
49.4.2. Theoretical
Probability versus Empirical Necessity
Although the inversion of the
sample (1/N in infinite universes or 1/Σxi in finite universes) can be defined
as the probability of theoretical dispersion, this does not mean that
such dispersion is empirically necessary. It only establishes a theoretical
probability term, not an empirical certainty.
A sample may theoretically have a
greater or lesser dispersion, but empirical results depend on additional
conditions. The mere existence of theoretical probability does not oblige
empirical dispersion to conform to it. This distinction between probability
as possibility and empirical necessity is essential for maintaining
the critical rational foundation of Impossible Probability.
49.4.3. The Role of the
Independent Variable and the Object of Study
Dispersion does not depend solely
on sample size but also on the object of study and the effect of independent
variables.
For instance, in a study on equality
of opportunity, a sample may be poorly representative and therefore
theoretically predisposed to higher bias. Yet, if the independent variable acts
positively on the sample, empirical dispersion may actually decrease. In such
cases, the effect of the independent variable can override the theoretical
tendency toward increased dispersion, allowing the empirical hypothesis of
equality to be validated.
Conversely, in a study of bias,
if the sample is sufficiently representative (minimizing sampling error to the
limit permitted by scientific policy), the theoretical probability of
dispersion may be low. However, if the independent variable reinforces the
ideals under investigation, empirical dispersion may increase as the
object of study approaches those ideals.
49.4.4. The Dual Dependence of
Dispersion: Sample Size and Object of Study
It follows that dispersion
depends on two fundamental factors:
- The magnitude of the sample, which
conditions representativity.
- The object of study, which conditions the
direction and impact of independent variables.
Depending on these two
dimensions—sample size and the effect of independent variables—empirical
dispersion may increase, decrease, or deviate from theoretical expectations.
This dual dependency underscores the need for cautious interpretation and
critical evaluation in statistical reasoning.
49.4.5. The Necessity of
Rational Criticism
Because sample dispersion is
simultaneously dependent on both sample size and the object of study, it
cannot be accepted uncritically. Rational criticism is therefore
indispensable, both at the individual level and the sample level.
The aim of rational criticism is
twofold:
- To ensure that statistical decisions are reliable
and not mere artifacts of sample probability.
- To guarantee that the scientific policy
guiding these decisions remains ethically rigorous and morally demanding.
49.4.6. Statistical Study as
the Observation of Differentials
In essence, statistical study is
grounded in the observation of differentials in behavior, whether
individual or sample-level. In the context of Impossible Probability,
these differentials are usually calculated with respect to the inversion of
N (normal statistics), or alternatively, with respect to any chosen
probability term (relative statistics).
For any form of statistics, empirical dispersion remains a
variable dependent on both sample magnitude and object of study. This
dependency makes it absolutely essential that every empirical hypothesis be
subjected to rational criticism, ensuring that conclusions are drawn responsibly
and not merely as products of probabilistic artifacts.
This augmented translation is based on the post
published in https://probabilidadimposible.blogspot.com/,
On 17 February 2013,
Rubén García Pedraza
imposiblenever@gmail.com
