[原創研究] 主相學概論 (Aikolistatics)
Section 1: Definitions of the stakeholders
Foolproof Chinese Version:
主相泛指族內競爭中主導有性選擇嘅性別
喺人類世界,所有女人都係主相
副相泛指向主相提供利益嘅性別
喺人類世界,所有男人都係副相
喺寄生蟲嘅世界,由於雌雄同體,
所以佢哋同時係主相和副相,直至遇到同類,
打贏嘅做副相貢獻精子,打輸嘅做主相俾蟲屌
無論一個副相有幾討厭主相都好,
喺動物制度下,
他必須向最少一個主相提供利益,
因為所有動物都有阿媽生
可見,交家用俾自己老母/老婆,
係所有副相嘅指定動作
English version with original jargon:
Aikolise refers to those sex dominant in sexual selection in the course of intraspecific competitions among sexual animals.
Aikolidyme refers to those sex being subordinate to any aikolise of the same species.
All women are aikolises and all men are aikolidymes. For every sexual animal, according to their MK behaviors, he/she/it can be further classified into common, transitional, complex or partial breeds.
All parasites have both male and female genitals. They are simultaneously aikolise and aikolidyme to fuck itself and then lay eggs. If more than one parasite of the same species is present, they will fight: the winner will be an aikolidyme providing interests to the loser (aikolise), including but not limited to sperms.
No matter how complex an aikolidyme is, he has to institutionally provide interest to at least one aikolise, including but not limited to biological mother, and stepmother, if any, in form of capital, cash or other economic forms.
Section 2: Classification of the stakeholder
Foolproof Chinese Version:
所有人分為4類:常態、轉態、複態、偏態
所有主相都唔係弱智,
所以主相IQ正態分佈嘅左半部會被視為無法生存,
即主相IQ 範圍為100-115
以115為智慧達標指標,
有68%嘅女人無法達標而且處於主流絕大多數
因此,主相會被預設為常態,
其預設動態MBTI類型為ESFJ,即港女
副相IQ範圍為0-115,
即有84%男人智慧不達標而且處於主流絕大多數
因此,副相會被預設為偏態(即偏私)
其預設動態MBTI類型為ISFJ,即狗公
Original English version with jargon:
Mankind is all about partial aikolidynamism.
Errata:
即主相IQ 範圍為100-200*
副相IQ範圍為0-200*
(Continued)
以下論述無術語,因此唔提供英譯
常態MK行為:直接消滅個別差異
例子:所有女人都想對家死
轉態MK行為:同化異類以便服從主流
例子:所有已婚男人對單身人士月老上身
複態MK行為:建立論述以令異類社會性死亡
例子:傳教(尤其是基督教)
偏態MK行為:建立人際關係堡壘,防止異類得勢
例子:雙方戀愛時,男方嚴禁女方接觸男閏密
所有動物都會作出上述四大MK行為,
分類時以最高頻率嘅作準
例如,狗公溝女時,自動變成偏私副相
Section 3: Polymorphism of the stakeholder
以下英譯術語以juxtaposition表示:
港女定律(Kong-gal Theorem)之一:
所有港女皆帶狗公格(假父愛格)
(All female ESFJ are imaginary partial)
例子:向自己仔女落對家藥
狗公定律(Dogman Theorem)之一:
所有狗公皆帶港女格(假母愛格)
(All male ISFJ are imaginary common)
例子:有鳩師奶教仔女周圍八卦做人肉搜索
以主相圖(Aikolifrontier)作進階分類:
在一個平面座標 (2D Cartesian Plane),
畫兩條綫:|y|= |x|
連同x軸同y軸畫分八大副態(sectors),
可得出四大分類中每類嘅兩大分類
首先,上方為轉態,右方為複態,
下方為偏態,左方為常態,可得以下分類:
Partial-sided common: 港女格
Transitional-sided common: 歇斯底里格
Common-sided transitional: 保姆格
Complex-sided transitional: 真父愛格
Transitional-sided complex: 真母愛格
Partial-sided complex: 學生格
Complex-sided partial: 權威格
Common-sided partial: 狗公格
在主相同畫兩個平面向量(2D vectors),
以較長者為主態(real aikolicharacter),
以較短者為副態(imaginary aikolicharacter),
可得港女定律同狗公定律嘅更準描述:
1. Female ESFJ: Imaginary Common-sided partial Partial-sided common aikolise
2. Male ISFJ: Imaginary Partial-sided common Common-sided partial aikolidyme
由於兩者之間每個人嘅主態和副態永遠唔會互相抵消,主態和副態疊加(vector sum)會互相強化,呢種幾何關係叫exobijugacy, 其反義詞為endobijugacy,即主態和副態形成共軛或反射(conjugate or transverse)
可得港女定律同狗公定律嘅更準確描述
在主相同畫兩個平面向量(2D vectors),
以較長者為主態(real aikolicharacter),
以較短者為副態(imaginary aikolicharacter),
可得港女定律同狗公定律嘅更準描述:
1. Female ESFJ: Imaginary Common-sided partial Partial-sided common aikolise
2. Male ISFJ: Imaginary Partial-sided common Common-sided partial aikolidyme
由於兩者之間每個人嘅主態和副態永遠唔會互相抵消,主態和副態疊加(vector sum)會互相強化,呢種幾何關係叫exobijugacy, 其反義詞為endobijugacy,即主態和副態形成共軛或反射(conjugate or transverse)
在主相圖畫兩個平面向量(2D vectors(
Section 4: Manipulation of Aikolifrontiers
This section is a bit mathy, so the contents wil be mainly in English:
We can rewrite an aikolicharacter in polar form of an 2D vector:
a_(i, j) = a_(n) (cos(θ_n) + sin(θ_n))
Where i = the order of the persons you wanna compare, and j = the order of the aikolicharacters from the selected person. If the cardinality of i is 1, then i=0 and j=n. The bold face implies that it is a 2D vector.
Note that a_(n) = a_n
Now we shall discuss the geometry of a pair of aikolicharacters from a person or two. Recall the definition of dot product:
a•b = |a||b|cos(k)
where k is the phase angle between a and b.
Note that the domain of k is [0, π]. From this, we can derive many geometric significance of aikolicharacters and even astrolabes:
Case 1: a•b >0
Exobijugacy will form. This is referred to positive reinforcement of 2 aikolicharacters. In astrolabes, we also establish the following relationships:
辰•酉 > 0 (六合)
子•申 > 0 (三合)
Aries • Leo (三合)
Aries • Genini (60 degree good aspect)
Case 2: k = 0
This is an extreme case of Exobijugacy as a and b overlaps. This is a good aspect in French horoscope, but it is not always the case in Bazi (i.e. for 辰午酉亥)
Case 3: k = π/2
The dot product becomes zero. It is referred to tangential relationship because it is the only case of linear independence in 2D vector. In this case, we obtain a rectanglar hyperbola:
d |a | •e |b |= def
where d, e, f are positive constants.
a and b cannot cancel out each other. In astrolabes, the following relationships are established:
子•卯 = 0 (無禮之刑)
亥•寅 = 0 (相破)
Aries • Cancer = 0 (90 degrees bas aspect)
Errata:
Case 1: a•b >0
Exobijugacy will form. This is referred to positive reinforcement of 2 aikolicharacters. In astrolabes, we also establish the following relationships:
辰•卯 > 0 (相破 - bad)
子•丑 > 0 (六合 - good)
Aries • Leo (三合)
Aries • Genini (60 degree good aspect)
Errata:
Case 1: a•b >0
Exobijugacy will form. This is referred to positive reinforcement of 2 aikolicharacters. In astrolabes, we also establish the following relationships:
辰•卯 > 0 (相破 - bad)
子•丑 > 0 (六合 - good)
Aries • Leo (三合)
Aries • Genini (60 degree good aspect)
辰•卯 > 0 (相破 - bad)
子•丑 > 0 (六合 - good)
Aries • Leo (三合)
Aries • Genini (60 degree good aspect)
Case 4: a•b < 0
Endobijugacy will form. It is referree as negative reinforcement between 2 aikolicharacters, and is an instance of reducibility (a measure of harmony). In astrolabes, such a geometric pattern can be good or bad:
辰•酉 < 0 (六合)
子•申 < 0 (三合)
子•未 < 0 (相害)
Aries • Leo < 0 (120 degree good aspect)
Aries • Scorpio < 0 (150 degree bad aspect)
Case 5: k=π
This is the extreme case of endobijugacy. In aikolicharacters, when |a| =| b |, the reducibility is thr greatest and thus favorable m, but it is not the case in astrolabes:
辰•戍 (相沖)
Aries • Libra (180 degree bad aspect)
甲•己 (相合,合而不化乃兩者皆消亡)
Case 5: k=π
This is the extreme case of endobijugacy. In aikolicharacters, when |a| =| b |, the reducibility is thr greatest and thus favorable m, but it is not the case in astrolabes:
辰•戍 (相沖)
Aries • Libra (180 degree bad aspect)
甲•己 (相合,合而不化乃兩者皆消亡)
This is the extreme case of endobijugacy. In aikolicharacters, when |a| =| b |, the reducibility is thr greatest and thus favorable but it is not the case in astrolabes:
Below are some jargons describing a specific aikolicharacters:
1. Omniphile (noun)
It refers to real transitional-sided aikolicharacters. The only 2 cases are transitional-sided common and transitional-sided complex.
2. Selectophile (noun)
It refers to real partial-sided aikolicharacters. The only 2 cases are partial-sided common and partial-sided complex.
3. Omniphilic (adjective)
It refers to the 2 real transitional aikolicharacters. If a person is omniphilic, it means that he/she is doujinkonic i.e. egalitarian in general English.
4. Selectophilic (adjective)
It refers to the 2 real partial aikolicharacters. If a person is selectophilic, it means that he/she is hentaikonic i.e. totalitarian in general English.
Lastly, there is a rule of thumb: no ambiguous case of every aikolicharacter. A aikolicharacter cannot lie on the following borders:
y=x
y=-x
y=0
x=0
i.e. a_(i, j) = 0 when θ_n = m π/4,
where m is any integer.
Lastly, there is a rule of thumb: no ambiguous case of every aikolicharacter. A aikolicharacter cannot lie on the following borders:
y=x
y=-x
y=0
x=0
i.e. a_(i, j) = 0 when θ_n = m π/4,
where m is any integer.
An aikolicharacter cannot lie on the following borders:
Below are some jargons describing a specific aikolicharacters:
1. Omniphile (noun)
It refers to real transitional-sided aikolicharacters. The only 2 cases are transitional-sided common and transitional-sided complex.
2. Selectophile (noun)
It refers to real partial-sided aikolicharacters. The only 2 cases are partial-sided common and partial-sided complex.
3. Omniphilic (adjective)
It refers to the 2 real transitional aikolicharacters. If a person is omniphilic, it means that he/she is doujinkonic i.e. egalitarian in general English.
4. Selectophilic (adjective)
It refers to the 2 real partial aikolicharacters. If a person is selectophilic, it means that he/she is hentaikonic i.e. totalitarian in general English.
Below are some jargons describing specific aikolicharacters:
Case 5: k=π
This is the extreme case of endobijugacy. In aikolicharacters, when |a| =| b |, the reducibility is thr greatest and thus favorable m, but it is not the case in astrolabes:
辰•戍 (相沖)
Aries • Libra (180 degree bad aspect)
甲•己 (相合,合而不化乃兩者皆消亡)
This is the extreme case of endobijugacy. In aikolicharacters, when |a| =| b |, the reducibility is thr greatest and thus favorable but it is not the case in astrolabes:
This is the extreme case of endobijugacy. In aikolicharacters, when |a| =| b |, the reducibility is the greatest and thus favorable but it is not the case in astrolabes:
Case 4: a•b < 0
Endobijugacy will form. It is referree as negative reinforcement between 2 aikolicharacters, and is an instance of reducibility (a measure of harmony). In astrolabes, such a geometric pattern can be good or bad:
辰•酉 < 0 (六合)
子•申 < 0 (三合)
子•未 < 0 (相害)
Aries • Leo < 0 (120 degree good aspect)
Aries • Scorpio < 0 (150 degree bad aspect)
Endobijugacy will form. It is referred to negative reinforcement between 2 aikolicharacters, and is an instance of reducibility (a measure of harmony).
Now we shall discuss the geometry of a pair of aikolicharacters from a person or two. Recall the definition of dot product:
a•b = |a||b|cos(k)
where k is the phase angle between a and b.
Note that the domain of k is [0, π]. From this, we can derive many geometric significance of aikolicharacters and even astrolabes:
Case 1: a•b >0
Exobijugacy will form. This is referred to positive reinforcement of 2 aikolicharacters. In astrolabes, we also establish the following relationships:
辰•酉 > 0 (六合)
子•申 > 0 (三合)
Aries • Leo (三合)
Aries • Genini (60 degree good aspect)
Case 2: k = 0
This is an extreme case of Exobijugacy as a and b overlaps. This is a good aspect in French horoscope, but it is not always the case in Bazi (i.e. for 辰午酉亥)
Case 3: k = π/2
The dot product becomes zero. It is referred to tangential relationship because it is the only case of linear independence in 2D vector. In this case, we obtain a rectanglar hyperbola:
d |a | •e |b |= def
where d, e, f are positive constants.
a and b cannot cancel out each other. In astrolabes, the following relationships are established:
子•卯 = 0 (無禮之刑)
亥•寅 = 0 (相破)
Aries • Cancer = 0 (90 degrees bas aspect)
Errata:
Note that the domain of k is [0, π]. From this, we can derive many geometric significances of aikolicharacters and even astrolabes:
...
Case 2: k = 0
This is an extreme case of Exobijugacy as a and b overlap. This is a good aspect in French horoscope, but it is not always the case in Bazi (i.e. for 辰午酉亥)
Section 4: Manipulation of Aikolifrontiers
This section is a bit mathy, so the contents wil be mainly in English:
We can rewrite an aikolicharacter in polar form of an 2D vector:
a_(i, j) = a_(n) (cos(θ_n) + sin(θ_n))
Where i = the order of the persons you wanna compare, and j = the order of the aikolicharacters from the selected person. If the cardinality of i is 1, then i=0 and j=n. The bold face implies that it is a 2D vector.
Erratum:
This section is a bit mathy, so the contents will be mainly in English:
結構:建立新論述時,用英文最準確但容易打錯字,用中文則小錯但易混淆。這是一個絕對吃力不討好嘅過程,因為它無法直接被口述。
結構:建立新論述時,用英文最準確但容易打錯字,用中文則小錯但易混淆。這是一個絕對吃力不討好嘅過程,因為它無法直接被口述。
結論