Classification of Thermodynamic Quarks

Different quarks are defined by different pairs of Anaxagorean sensations. So quarks can be classified by sensation into different categories. Quarks that are objectified from feelings felt on the right side are called ordinary quarks. The letter z is used to generically represent ordinary quarks so that

$\sf{z} \in \left\{ u, d, e, g, m, a, t, b, s, c \right\}$

On the other hand, quarks that contain an odd conjugate seed are defined from feelings experienced on the left. They are called anti-quarks and noted with an overline

$\bar{\sf{z}} \in \left\{ \bar{\sf{u}}, \bar{\sf{d}}, \bar{\sf{e}}, \bar{\sf{g}}, \bar{\sf{m}}, \bar{\sf{a}}, \bar{\sf{t}}, \bar{\sf{b}}, \bar{\sf{s}}, \bar{\sf{c}} \right\}$

Quarks can also be classified by their thermodynamic seed and its associated sensation, then named accordingly as follows.

 Class Sensations Quarks rotating quarks achromatic-visual and somatic sensations electronic quarks inorganic-chromatic-visual and somatic sensations muonic quarks organic-chromatic-visual and somatic sensations leptonic quarks chromatic-visual and somatic sensations dynamic quarks visual and somatic sensations big baryonic quarks dangerous-thermal and somatic sensations small baryonic quarks safe-thermal and somatic sensations baryonic quarks thermal and somatic sensations thermodynamic quarks thermal, visual and somatic sensations

The letter $\sf{q}$ is used to generally represent either an ordinary quark or an anti-quark

$\sf{q} \in \left\{ u, \bar{\sf{u}}, d, \bar{\sf{d}}, e, \bar{\sf{e}}, g, \bar{\sf{g}}, m, \bar{\sf{m}}, a, \bar{\sf{a}}, t, \bar{\sf{t}}, b, \bar{\sf{b}}, s, \bar{\sf{s}}, c, \bar{\sf{c}} \right\}$

For detailed calculations, it is often convenient to use a number called the quark index to represent different quark classes. After objectifying experience, events that were defined from bundles of sensation are subsequently discussed as composite quarks. Both interpretations are mathematically expressed as

$\sf{P}_{ \it{k}} = \left\{ \sf{q}^{1}, \sf{q}^{2}, \sf{q}^{3} \ \ldots \ \right\}$

page revision: 222, last edited: 28 May 2018 17:21