Trigintaduonion - Misplaced Pages

(Redirected from Routon) Hypercomplex number system

Trigintaduonions
Symbol	$\mathbb {T}$
Type	Hypercomplex algebra
Units	e₀, ..., e₃₁
Multiplicative identity	e₀
Main properties	Power associativity Distributivity
Common systems
$\mathbb {N}$ Natural numbers $\mathbb {Z}$ Integers $\mathbb {Q}$ Rational numbers $\mathbb {R}$ Real numbers $\mathbb {C}$ Complex numbers $\mathbb {H}$ Quaternions Less common systems $\mathbb {O}$ Octonions $\mathbb {S}$ Sedenions $\mathbb {T}$ Trigintaduonions

In abstract algebra, the trigintaduonions, also known as the 32-ions, 32-nions, 2-nions, or sometimes pathions ( $\mathbb {P}$ ), form a 32-dimensional noncommutative and nonassociative algebra over the real numbers, usually represented by the capital letter T, boldface T or blackboard bold $\mathbb {T}$ .

Names

The word trigintaduonion is derived from Latin triginta 'thirty' + duo 'two' + the suffix -nion, which is used for hypercomplex number systems.

Although trigintaduonion is typically the more widely used term, Robert P. C. de Marrais instead uses the term pathion in reference to the 32 paths of wisdom from the Kabbalistic (Jewish mystical) text Sefer Yetzirah, since pathion is shorter and easier to remember and pronounce. It is represented by blackboard bold $\mathbb {P}$ . Other names include 32-ion, 32-nion, 2-ion, and 2-nion.

Definition

Every trigintaduonion is a linear combination of the unit trigintaduonions $e_{0}$ , $e_{1}$ , $e_{2}$ , $e_{3}$ , ..., $e_{31}$ , which form a basis of the vector space of trigintaduonions. Every trigintaduonion can be represented in the form

x=x_{0}e_{0}+x_{1}e_{1}+x_{2}e_{2}+\cdots +x_{30}e_{30}+x_{31}e_{31}

with real coefficients x_i.

The trigintaduonions can be obtained by applying the Cayley–Dickson construction to the sedenions, which can be mathematically expressed as $\mathbb {T} ={\mathcal {CD}}(\mathbb {S} ,1)$ . Applying the Cayley–Dickson construction to the trigintaduonions yields a 64-dimensional algebra called the 64-ions, 64-nions, sexagintaquatronions, or sexagintaquattuornions, sometimes also known as the chingons.

As a result, the trigintaduonions can also be defined as the following.

An algebra of dimension 4 over the octonions $\mathbb {O}$ :

\sum _{i=0}^{3}a_{i}\cdot e_{i}

where

a_{i}\in \mathbb {O}

and

e_{i}\notin \mathbb {O}

An algebra of dimension 8 over quaternions $\mathbb {H}$ :

\sum _{i=0}^{7}a_{i}\cdot e_{i}

where

a_{i}\in \mathbb {H}

and

e_{i}\notin \mathbb {H}

An algebra of dimension 16 over the complex numbers $\mathbb {C}$ :

\sum _{i=0}^{15}a_{i}\cdot e_{i}

where

a_{i}\in \mathbb {C}

and

e_{i}\notin \mathbb {C}

An algebra of dimension 32 over the real numbers $\mathbb {R}$ :

\sum _{i=0}^{31}a_{i}\cdot e_{i}

where

a_{i}\in \mathbb {R}

and

e_{i}\notin \mathbb {R}

$\mathbb {R} ,\mathbb {C} ,\mathbb {H} ,\mathbb {O} ,\mathbb {S}$ are all subsets of $\mathbb {T}$ . This relation can be expressed as:

$\mathbb {R} \subset \mathbb {C} \subset \mathbb {H} \subset \mathbb {O} \subset \mathbb {S} \subset \mathbb {T} \subset \cdots$

Multiplication

Properties

Like octonions and sedenions, multiplication of trigintaduonions is neither commutative nor associative. However, being products of a Cayley–Dickson construction, trigintaduonions have the property of power associativity, which can be stated as that, for any element $x$ of $\mathbb {T}$ , the power $x^{n}$ is well defined. They are also flexible, and multiplication is distributive over addition. As with the sedenions, the trigintaduonions contain zero divisors and are thus not a division algebra.

Geometric representations

Whereas octonion unit multiplication patterns can be geometrically represented by PG(2,2) (also known as the Fano plane) and sedenion unit multiplication by PG(3,2), trigintaduonion unit multiplication can be geometrically represented by PG(4,2). This can be also extended to PG(5,2) for the 64-nions, as explained in the abstract of Saniga, Holweck & Pracna (2015):

Given a $2^{n}$ -dimensional Cayley–Dickson algebra, where $3\leq n\leq 6$ , we first observe that the multiplication table of its imaginary units $e_{a},1\leq a\leq 2^{n}-1$ , is encoded in the properties of the projective space $PG(n-1,2)$ if these imaginary units are regarded as points and distinguished triads of them $\{e_{a},e_{b},e_{c}\},1\leq a<b<c\leq 2^{n}-1$ and $e_{a}\cdot e_{b}=\pm e_{c}$ , as lines. This projective space is seen to feature two distinct kinds of lines according as $a+b=c$ or $a+b\neq c$ .

Furthermore, Saniga, Holweck & Pracna (2015) state that:

The corresponding point-line incidence structure is found to be a specific binomial configuration ${\mathcal {C}}_{n}$ ; in particular, ${\mathcal {C}}_{3}$ (octonions) is isomorphic to the Pasch (6₂,4₃)-configuration, ${\mathcal {C}}_{4}$ (sedenions) is the famous Desargues (10₃)-configuration, ${\mathcal {C}}_{5}$ (32-nions) coincides with the Cayley–Salmon (15₄,20₃)-configuration found in the well-known Pascal mystic hexagram and ${\mathcal {C}}_{6}$ (64-nions) is identical with a particular (21₅,35₃)-configuration that can be viewed as four triangles in perspective from a line where the points of perspectivity of six pairs of them form a Pasch configuration.

The configuration of $2^{n}$ -nions can thus be generalized as: ${\binom {n+1}{2}}_{n-1},{\binom {n+1}{3}}_{3}$

Multiplication tables

The multiplication of the unit trigintaduonions is illustrated in the two tables below. Combined, they form a single 32×32 table with 1024 cells.

Below is the trigintaduonion multiplication table for $e_{j},0\leq j\leq 15$ . The top half of this table, for $e_{i},0\leq i\leq 15$ , corresponds to the multiplication table for the sedenions. The top left quadrant of the table, for $e_{i},0\leq i\leq 7$ and $e_{j},0\leq j\leq 7$ , corresponds to the multiplication table for the octonions.

$e_{i}e_{j}$		$e_{j}$
$e_{i}e_{j}$		$e_{0}$	$e_{1}$	$e_{2}$	$e_{3}$	$e_{4}$	$e_{5}$	$e_{6}$	$e_{7}$	$e_{8}$	$e_{9}$	$e_{10}$	$e_{11}$	$e_{12}$	$e_{13}$	$e_{14}$	$e_{15}$
$e_{i}$	$e_{0}$	$e_{0}$	$e_{1}$	$e_{2}$	$e_{3}$	$e_{4}$	$e_{5}$	$e_{6}$	$e_{7}$	$e_{8}$	$e_{9}$	$e_{10}$	$e_{11}$	$e_{12}$	$e_{13}$	$e_{14}$	$e_{15}$
	$e_{1}$	$e_{1}$	$-e_{0}$	$e_{3}$	$-e_{2}$	$e_{5}$	$-e_{4}$	$-e_{7}$	$e_{6}$	$e_{9}$	$-e_{8}$	$-e_{11}$	$e_{10}$	$-e_{13}$	$e_{12}$	$e_{15}$	$-e_{14}$
	$e_{2}$	$e_{2}$	$-e_{3}$	$-e_{0}$	$e_{1}$	$e_{6}$	$e_{7}$	$-e_{4}$	$-e_{5}$	$e_{10}$	$e_{11}$	$-e_{8}$	$-e_{9}$	$-e_{14}$	$-e_{15}$	$e_{12}$	$e_{13}$
	$e_{3}$	$e_{3}$	$e_{2}$	$-e_{1}$	$-e_{0}$	$e_{7}$	$-e_{6}$	$e_{5}$	$-e_{4}$	$e_{11}$	$-e_{10}$	$e_{9}$	$-e_{8}$	$-e_{15}$	$e_{14}$	$-e_{13}$	$e_{12}$
	$e_{4}$	$e_{4}$	$-e_{5}$	$-e_{6}$	$-e_{7}$	$-e_{0}$	$e_{1}$	$e_{2}$	$e_{3}$	$e_{12}$	$e_{13}$	$e_{14}$	$e_{15}$	$-e_{8}$	$-e_{9}$	$-e_{10}$	$-e_{11}$
	$e_{5}$	$e_{5}$	$e_{4}$	$-e_{7}$	$e_{6}$	$-e_{1}$	$-e_{0}$	$-e_{3}$	$e_{2}$	$e_{13}$	$-e_{12}$	$e_{15}$	$-e_{14}$	$e_{9}$	$-e_{8}$	$e_{11}$	$-e_{10}$
	$e_{6}$	$e_{6}$	$e_{7}$	$e_{4}$	$-e_{5}$	$-e_{2}$	$e_{3}$	$-e_{0}$	$-e_{1}$	$e_{14}$	$-e_{15}$	$-e_{12}$	$e_{13}$	$e_{10}$	$-e_{11}$	$-e_{8}$	$e_{9}$
	$e_{7}$	$e_{7}$	$-e_{6}$	$e_{5}$	$e_{4}$	$-e_{3}$	$-e_{2}$	$e_{1}$	$-e_{0}$	$e_{15}$	$e_{14}$	$-e_{13}$	$-e_{12}$	$e_{11}$	$e_{10}$	$-e_{9}$	$-e_{8}$
	$e_{8}$	$e_{8}$	$-e_{9}$	$-e_{10}$	$-e_{11}$	$-e_{12}$	$-e_{13}$	$-e_{14}$	$-e_{15}$	$-e_{0}$	$e_{1}$	$e_{2}$	$e_{3}$	$e_{4}$	$e_{5}$	$e_{6}$	$e_{7}$
	$e_{9}$	$e_{9}$	$e_{8}$	$-e_{11}$	$e_{10}$	$-e_{13}$	$e_{12}$	$e_{15}$	$-e_{14}$	$-e_{1}$	$-e_{0}$	$-e_{3}$	$e_{2}$	$-e_{5}$	$e_{4}$	$e_{7}$	$-e_{6}$
	$e_{10}$	$e_{10}$	$e_{11}$	$e_{8}$	$-e_{9}$	$-e_{14}$	$-e_{15}$	$e_{12}$	$e_{13}$	$-e_{2}$	$e_{3}$	$-e_{0}$	$-e_{1}$	$-e_{6}$	$-e_{7}$	$e_{4}$	$e_{5}$
	$e_{11}$	$e_{11}$	$-e_{10}$	$e_{9}$	$e_{8}$	$-e_{15}$	$e_{14}$	$-e_{13}$	$e_{12}$	$-e_{3}$	$-e_{2}$	$e_{1}$	$-e_{0}$	$-e_{7}$	$e_{6}$	$-e_{5}$	$e_{4}$
	$e_{12}$	$e_{12}$	$e_{13}$	$e_{14}$	$e_{15}$	$e_{8}$	$-e_{9}$	$-e_{10}$	$-e_{11}$	$-e_{4}$	$e_{5}$	$e_{6}$	$e_{7}$	$-e_{0}$	$-e_{1}$	$-e_{2}$	$-e_{3}$
	$e_{13}$	$e_{13}$	$-e_{12}$	$e_{15}$	$-e_{14}$	$e_{9}$	$e_{8}$	$e_{11}$	$-e_{10}$	$-e_{5}$	$-e_{4}$	$e_{7}$	$-e_{6}$	$e_{1}$	$-e_{0}$	$e_{3}$	$-e_{2}$
	$e_{14}$	$e_{14}$	$-e_{15}$	$-e_{12}$	$e_{13}$	$e_{10}$	$-e_{11}$	$e_{8}$	$e_{9}$	$-e_{6}$	$-e_{7}$	$-e_{4}$	$e_{5}$	$e_{2}$	$-e_{3}$	$-e_{0}$	$e_{1}$
	$e_{15}$	$e_{15}$	$e_{14}$	$-e_{13}$	$-e_{12}$	$e_{11}$	$e_{10}$	$-e_{9}$	$e_{8}$	$-e_{7}$	$e_{6}$	$-e_{5}$	$-e_{4}$	$e_{3}$	$e_{2}$	$-e_{1}$	$-e_{0}$
	$e_{16}$	$e_{16}$	$-e_{17}$	$-e_{18}$	$-e_{19}$	$-e_{20}$	$-e_{21}$	$-e_{22}$	$-e_{23}$	$-e_{24}$	$-e_{25}$	$-e_{26}$	$-e_{27}$	$-e_{28}$	$-e_{29}$	$-e_{30}$	$-e_{31}$
	$e_{17}$	$e_{17}$	$e_{16}$	$-e_{19}$	$e_{18}$	$-e_{21}$	$e_{20}$	$e_{23}$	$-e_{22}$	$-e_{25}$	$e_{24}$	$e_{27}$	$-e_{26}$	$e_{29}$	$-e_{28}$	$-e_{31}$	$e_{30}$
	$e_{18}$	$e_{18}$	$e_{19}$	$e_{16}$	$-e_{17}$	$-e_{22}$	$-e_{23}$	$e_{20}$	$e_{21}$	$-e_{26}$	$-e_{27}$	$e_{24}$	$e_{25}$	$e_{30}$	$e_{31}$	$-e_{28}$	$-e_{29}$
	$e_{19}$	$e_{19}$	$-e_{18}$	$e_{17}$	$e_{16}$	$-e_{23}$	$e_{22}$	$-e_{21}$	$e_{20}$	$-e_{27}$	$e_{26}$	$-e_{25}$	$e_{24}$	$e_{31}$	$-e_{30}$	$e_{29}$	$-e_{28}$
	$e_{20}$	$e_{20}$	$e_{21}$	$e_{22}$	$e_{23}$	$e_{16}$	$-e_{17}$	$-e_{18}$	$-e_{19}$	$-e_{28}$	$-e_{29}$	$-e_{30}$	$-e_{31}$	$e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$
	$e_{21}$	$e_{21}$	$-e_{20}$	$e_{23}$	$-e_{22}$	$e_{17}$	$e_{16}$	$e_{19}$	$-e_{18}$	$-e_{29}$	$e_{28}$	$-e_{31}$	$e_{30}$	$-e_{25}$	$e_{24}$	$-e_{27}$	$e_{26}$
	$e_{22}$	$e_{22}$	$-e_{23}$	$-e_{20}$	$e_{21}$	$e_{18}$	$-e_{19}$	$e_{16}$	$e_{17}$	$-e_{30}$	$e_{31}$	$e_{28}$	$-e_{29}$	$-e_{26}$	$e_{27}$	$e_{24}$	$-e_{25}$
	$e_{23}$	$e_{23}$	$e_{22}$	$-e_{21}$	$-e_{20}$	$e_{19}$	$e_{18}$	$-e_{17}$	$e_{16}$	$-e_{31}$	$-e_{30}$	$e_{29}$	$e_{28}$	$-e_{27}$	$-e_{26}$	$e_{25}$	$e_{24}$
	$e_{24}$	$e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$	$e_{28}$	$e_{29}$	$e_{30}$	$e_{31}$	$e_{16}$	$-e_{17}$	$-e_{18}$	$-e_{19}$	$-e_{20}$	$-e_{21}$	$-e_{22}$	$-e_{23}$
	$e_{25}$	$e_{25}$	$-e_{24}$	$e_{27}$	$-e_{26}$	$e_{29}$	$-e_{28}$	$-e_{31}$	$e_{30}$	$e_{17}$	$e_{16}$	$e_{19}$	$-e_{18}$	$e_{21}$	$-e_{20}$	$-e_{23}$	$e_{22}$
	$e_{26}$	$e_{26}$	$-e_{27}$	$-e_{24}$	$e_{25}$	$e_{30}$	$e_{31}$	$-e_{28}$	$-e_{29}$	$e_{18}$	$-e_{19}$	$e_{16}$	$e_{17}$	$e_{22}$	$e_{23}$	$-e_{20}$	$-e_{21}$
	$e_{27}$	$e_{27}$	$e_{26}$	$-e_{25}$	$-e_{24}$	$e_{31}$	$-e_{30}$	$e_{29}$	$-e_{28}$	$e_{19}$	$e_{18}$	$-e_{17}$	$e_{16}$	$e_{23}$	$-e_{22}$	$e_{21}$	$-e_{20}$
	$e_{28}$	$e_{28}$	$-e_{29}$	$-e_{30}$	$-e_{31}$	$-e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$	$e_{20}$	$-e_{21}$	$-e_{22}$	$-e_{23}$	$e_{16}$	$e_{17}$	$e_{18}$	$e_{19}$
	$e_{29}$	$e_{29}$	$e_{28}$	$-e_{31}$	$e_{30}$	$-e_{25}$	$-e_{24}$	$-e_{27}$	$e_{26}$	$e_{21}$	$e_{20}$	$-e_{23}$	$e_{22}$	$-e_{17}$	$e_{16}$	$-e_{19}$	$e_{18}$
	$e_{30}$	$e_{30}$	$e_{31}$	$e_{28}$	$-e_{29}$	$-e_{26}$	$e_{27}$	$-e_{24}$	$-e_{25}$	$e_{22}$	$e_{23}$	$e_{20}$	$-e_{21}$	$-e_{18}$	$e_{19}$	$e_{16}$	$-e_{17}$
	$e_{31}$	$e_{31}$	$-e_{30}$	$e_{29}$	$e_{28}$	$-e_{27}$	$-e_{26}$	$e_{25}$	$-e_{24}$	$e_{23}$	$-e_{22}$	$e_{21}$	$e_{20}$	$-e_{19}$	$-e_{18}$	$e_{17}$	$e_{16}$

Below is the trigintaduonion multiplication table for $e_{j},16\leq j\leq 31$ .

$e_{i}e_{j}$		$e_{j}$
$e_{i}e_{j}$		$e_{16}$	$e_{17}$	$e_{18}$	$e_{19}$	$e_{20}$	$e_{21}$	$e_{22}$	$e_{23}$	$e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$	$e_{28}$	$e_{29}$	$e_{30}$	$e_{31}$
$e_{i}$	$e_{0}$	$e_{16}$	$e_{17}$	$e_{18}$	$e_{19}$	$e_{20}$	$e_{21}$	$e_{22}$	$e_{23}$	$e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$	$e_{28}$	$e_{29}$	$e_{30}$	$e_{31}$
	$e_{1}$	$e_{17}$	$-e_{16}$	$-e_{19}$	$e_{18}$	$-e_{21}$	$e_{20}$	$e_{23}$	$-e_{22}$	$-e_{25}$	$e_{24}$	$e_{27}$	$-e_{26}$	$e_{29}$	$-e_{28}$	$-e_{31}$	$e_{30}$
	$e_{2}$	$e_{18}$	$e_{19}$	$-e_{16}$	$-e_{17}$	$-e_{22}$	$-e_{23}$	$e_{20}$	$e_{21}$	$-e_{26}$	$-e_{27}$	$e_{24}$	$e_{25}$	$e_{30}$	$e_{31}$	$-e_{28}$	$-e_{29}$
	$e_{3}$	$e_{19}$	$-e_{18}$	$e_{17}$	$-e_{16}$	$-e_{23}$	$e_{22}$	$-e_{21}$	$e_{20}$	$-e_{27}$	$e_{26}$	$-e_{25}$	$e_{24}$	$e_{31}$	$-e_{30}$	$e_{29}$	$-e_{28}$
	$e_{4}$	$e_{20}$	$e_{21}$	$e_{22}$	$e_{23}$	$-e_{16}$	$-e_{17}$	$-e_{18}$	$-e_{19}$	$-e_{28}$	$-e_{29}$	$-e_{30}$	$-e_{31}$	$e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$
	$e_{5}$	$e_{21}$	$-e_{20}$	$e_{23}$	$-e_{22}$	$e_{17}$	$-e_{16}$	$e_{19}$	$-e_{18}$	$-e_{29}$	$e_{28}$	$-e_{31}$	$e_{30}$	$-e_{25}$	$e_{24}$	$-e_{27}$	$e_{26}$
	$e_{6}$	$e_{22}$	$-e_{23}$	$-e_{20}$	$e_{21}$	$e_{18}$	$-e_{19}$	$-e_{16}$	$e_{17}$	$-e_{30}$	$e_{31}$	$e_{28}$	$-e_{29}$	$-e_{26}$	$e_{27}$	$e_{24}$	$-e_{25}$
	$e_{7}$	$e_{23}$	$e_{22}$	$-e_{21}$	$-e_{20}$	$e_{19}$	$e_{18}$	$-e_{17}$	$-e_{16}$	$-e_{31}$	$-e_{30}$	$e_{29}$	$e_{28}$	$-e_{27}$	$-e_{26}$	$e_{25}$	$e_{24}$
	$e_{8}$	$e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$	$e_{28}$	$e_{29}$	$e_{30}$	$e_{31}$	$-e_{16}$	$-e_{17}$	$-e_{18}$	$-e_{19}$	$-e_{20}$	$-e_{21}$	$-e_{22}$	$-e_{23}$
	$e_{9}$	$e_{25}$	$-e_{24}$	$e_{27}$	$-e_{26}$	$e_{29}$	$-e_{28}$	$-e_{31}$	$e_{30}$	$e_{17}$	$-e_{16}$	$e_{19}$	$-e_{18}$	$e_{21}$	$-e_{20}$	$-e_{23}$	$e_{22}$
	$e_{10}$	$e_{26}$	$-e_{27}$	$-e_{24}$	$e_{25}$	$e_{30}$	$e_{31}$	$-e_{28}$	$-e_{29}$	$e_{18}$	$-e_{19}$	$-e_{16}$	$e_{17}$	$e_{22}$	$e_{23}$	$-e_{20}$	$-e_{21}$
	$e_{11}$	$e_{27}$	$e_{26}$	$-e_{25}$	$-e_{24}$	$e_{31}$	$-e_{30}$	$e_{29}$	$-e_{28}$	$e_{19}$	$e_{18}$	$-e_{17}$	$-e_{16}$	$e_{23}$	$-e_{22}$	$e_{21}$	$-e_{20}$
	$e_{12}$	$e_{28}$	$-e_{29}$	$-e_{30}$	$-e_{31}$	$-e_{24}$	$e_{25}$	$e_{26}$	$e_{27}$	$e_{20}$	$-e_{21}$	$-e_{22}$	$-e_{23}$	$-e_{16}$	$e_{17}$	$e_{18}$	$e_{19}$
	$e_{13}$	$e_{29}$	$e_{28}$	$-e_{31}$	$e_{30}$	$-e_{25}$	$-e_{24}$	$-e_{27}$	$e_{26}$	$e_{21}$	$e_{20}$	$-e_{23}$	$e_{22}$	$-e_{17}$	$-e_{16}$	$-e_{19}$	$e_{18}$
	$e_{14}$	$e_{30}$	$e_{31}$	$e_{28}$	$-e_{29}$	$-e_{26}$	$e_{27}$	$-e_{24}$	$-e_{25}$	$e_{22}$	$e_{23}$	$e_{20}$	$-e_{21}$	$-e_{18}$	$e_{19}$	$-e_{16}$	$-e_{17}$
	$e_{15}$	$e_{31}$	$-e_{30}$	$e_{29}$	$e_{28}$	$-e_{27}$	$-e_{26}$	$e_{25}$	$-e_{24}$	$e_{23}$	$-e_{22}$	$e_{21}$	$e_{20}$	$-e_{19}$	$-e_{18}$	$e_{17}$	$-e_{16}$
	$e_{16}$	$-e_{0}$	$e_{1}$	$e_{2}$	$e_{3}$	$e_{4}$	$e_{5}$	$e_{6}$	$e_{7}$	$e_{8}$	$e_{9}$	$e_{10}$	$e_{11}$	$e_{12}$	$e_{13}$	$e_{14}$	$e_{15}$
	$e_{17}$	$-e_{1}$	$-e_{0}$	$-e_{3}$	$e_{2}$	$-e_{5}$	$e_{4}$	$e_{7}$	$-e_{6}$	$-e_{9}$	$e_{8}$	$e_{11}$	$-e_{10}$	$e_{13}$	$-e_{12}$	$-e_{15}$	$e_{14}$
	$e_{18}$	$-e_{2}$	$e_{3}$	$-e_{0}$	$-e_{1}$	$-e_{6}$	$-e_{7}$	$e_{4}$	$e_{5}$	$-e_{10}$	$-e_{11}$	$e_{8}$	$e_{9}$	$e_{14}$	$e_{15}$	$-e_{12}$	$-e_{13}$
	$e_{19}$	$-e_{3}$	$-e_{2}$	$e_{1}$	$-e_{0}$	$-e_{7}$	$e_{6}$	$-e_{5}$	$e_{4}$	$-e_{11}$	$e_{10}$	$-e_{9}$	$e_{8}$	$e_{15}$	$-e_{14}$	$e_{13}$	$-e_{12}$
	$e_{20}$	$-e_{4}$	$e_{5}$	$e_{6}$	$e_{7}$	$-e_{0}$	$-e_{1}$	$-e_{2}$	$-e_{3}$	$-e_{12}$	$-e_{13}$	$-e_{14}$	$-e_{15}$	$e_{8}$	$e_{9}$	$e_{10}$	$e_{11}$
	$e_{21}$	$-e_{5}$	$-e_{4}$	$e_{7}$	$-e_{6}$	$e_{1}$	$-e_{0}$	$e_{3}$	$-e_{2}$	$-e_{13}$	$e_{12}$	$-e_{15}$	$e_{14}$	$-e_{9}$	$e_{8}$	$-e_{11}$	$e_{10}$
	$e_{22}$	$-e_{6}$	$-e_{7}$	$-e_{4}$	$e_{5}$	$e_{2}$	$-e_{3}$	$-e_{0}$	$e_{1}$	$-e_{14}$	$e_{15}$	$e_{12}$	$-e_{13}$	$-e_{10}$	$e_{11}$	$e_{8}$	$-e_{9}$
	$e_{23}$	$-e_{7}$	$e_{6}$	$-e_{5}$	$-e_{4}$	$e_{3}$	$e_{2}$	$-e_{1}$	$-e_{0}$	$-e_{15}$	$-e_{14}$	$e_{13}$	$e_{12}$	$-e_{11}$	$-e_{10}$	$e_{9}$	$e_{8}$
	$e_{24}$	$-e_{8}$	$e_{9}$	$e_{10}$	$e_{11}$	$e_{12}$	$e_{13}$	$e_{14}$	$e_{15}$	$-e_{0}$	$-e_{1}$	$-e_{2}$	$-e_{3}$	$-e_{4}$	$-e_{5}$	$-e_{6}$	$-e_{7}$
	$e_{25}$	$-e_{9}$	$-e_{8}$	$e_{11}$	$-e_{10}$	$e_{13}$	$-e_{12}$	$-e_{15}$	$e_{14}$	$e_{1}$	$-e_{0}$	$e_{3}$	$-e_{2}$	$e_{5}$	$-e_{4}$	$-e_{7}$	$e_{6}$
	$e_{26}$	$-e_{10}$	$-e_{11}$	$-e_{8}$	$e_{9}$	$e_{14}$	$e_{15}$	$-e_{12}$	$-e_{13}$	$e_{2}$	$-e_{3}$	$-e_{0}$	$e_{1}$	$e_{6}$	$e_{7}$	$-e_{4}$	$-e_{5}$
	$e_{27}$	$-e_{11}$	$e_{10}$	$-e_{9}$	$-e_{8}$	$e_{15}$	$-e_{14}$	$e_{13}$	$-e_{12}$	$e_{3}$	$e_{2}$	$-e_{1}$	$-e_{0}$	$e_{7}$	$-e_{6}$	$e_{5}$	$-e_{4}$
	$e_{28}$	$-e_{12}$	$-e_{13}$	$-e_{14}$	$-e_{15}$	$-e_{8}$	$e_{9}$	$e_{10}$	$e_{11}$	$e_{4}$	$-e_{5}$	$-e_{6}$	$-e_{7}$	$-e_{0}$	$e_{1}$	$e_{2}$	$e_{3}$
	$e_{29}$	$-e_{13}$	$e_{12}$	$-e_{15}$	$e_{14}$	$-e_{9}$	$-e_{8}$	$-e_{11}$	$e_{10}$	$e_{5}$	$e_{4}$	$-e_{7}$	$e_{6}$	$-e_{1}$	$-e_{0}$	$-e_{3}$	$e_{2}$
	$e_{30}$	$-e_{14}$	$e_{15}$	$e_{12}$	$-e_{13}$	$-e_{10}$	$e_{11}$	$-e_{8}$	$-e_{9}$	$e_{6}$	$e_{7}$	$e_{4}$	$-e_{5}$	$-e_{2}$	$e_{3}$	$-e_{0}$	$-e_{1}$
	$e_{31}$	$-e_{15}$	$-e_{14}$	$e_{13}$	$e_{12}$	$-e_{11}$	$-e_{10}$	$e_{9}$	$-e_{8}$	$e_{7}$	$-e_{6}$	$e_{5}$	$e_{4}$	$-e_{3}$	$-e_{2}$	$e_{1}$	$-e_{0}$

Triples

There are 155 distinguished triples (or triads) of imaginary trigintaduonion units in the trigintaduonion multiplication table, which are listed below. In comparison, the octonions have 7 such triples, the sedenions have 35, while the sexagintaquatronions have 651 (See OEIS A171477).

45 triples of type {α, α, β}: {3, 13, 14}, {3, 21, 22}, {3, 25, 26}, {5, 11, 14}, {5, 19, 22}, {5, 25, 28}, {6, 11, 13}, {6, 19, 21}, {6, 26, 28}, {7, 9, 14}, {7, 10, 13}, {7, 11, 12}, {7, 17, 22}, {7, 18, 21}, {7, 19, 20}, {7, 25, 30}, {7, 26, 29}, {7, 27, 28}, {9, 19, 26}, {9, 21, 28}, {10, 19, 25}, {10, 22, 28}, {11, 17, 26}, {11, 18, 25}, {11, 19, 24}, {11, 21, 30}, {11, 22, 29}, {11, 23, 28}, {12, 21, 25}, {12, 22, 26}, {13, 17, 28}, {13, 19, 30}, {13, 20, 25}, {13, 21, 24}, {13, 22, 27}, {13, 23, 26}, {14, 18, 28}, {14, 19, 29}, {14, 20, 26}, {14, 21, 27}, {14, 22, 24}, {14, 23, 25}, {15, 19, 28}, {15, 21, 26}, {15, 22, 25}
20 triples of type {β, β, β}: {3, 5, 6}, {3, 9, 10}, {3, 17, 18}, {3, 29, 30}, {5, 9, 12}, {5, 17, 20}, {5, 27, 30}, {6, 10, 12}, {6, 18, 20}, {6, 27, 29}, {9, 17, 24}, {9, 23, 30}, {10, 18, 24}, {10, 23, 29}, {12, 20, 24}, {12, 23, 27}, {15, 17, 30}, {15, 18, 29}, {15, 20, 27}, {15, 23, 24}
15 triples of type {β, β, β}: {3, 12, 15}, {3, 20, 23}, {3, 24, 27}, {5, 10, 15}, {5, 18, 23}, {5, 24, 29}, {6, 9, 15}, {6, 17, 23}, {6, 24, 30}, {9, 18, 27}, {9, 20, 29}, {10, 17, 27}, {10, 20, 30}, {12, 17, 29}, {12, 18, 30}
60 triples of type {α, β, γ}: {1, 6, 7}, {1, 10, 11}, {1, 12, 13}, {1, 14, 15}, {1, 18, 19}, {1, 20, 21}, {1, 22, 23}, {1, 24, 25}, {1, 26, 27}, {1, 28, 29}, {2, 5, 7}, {2, 9, 11}, {2, 12, 14}, {2, 13, 15}, {2, 17, 19}, {2, 20, 22}, {2, 21, 23}, {2, 24, 26}, {2, 25, 27}, {2, 28, 30}, {3, 4, 7}, {3, 8, 11}, {3, 16, 19}, {3, 28, 31}, {4, 9, 13}, {4, 10, 14}, {4, 11, 15}, {4, 17, 21}, {4, 18, 22}, {4, 19, 23}, {4, 24, 28}, {4, 25, 29}, {4, 26, 30}, {5, 8, 13}, {5, 16, 21}, {5, 26, 31}, {6, 8, 14}, {6, 16, 22}, {6, 25, 31}, {7, 8, 15}, {7, 16, 23}, {7, 24, 31}, {8, 17, 25}, {8, 18, 26}, {8, 19, 27}, {8, 20, 28}, {8, 21, 29}, {8, 22, 30}, {9, 16, 25}, {9, 22, 31}, {10, 16, 26}, {10, 21, 31}, {11, 16, 27}, {11, 20, 31}, {12, 16, 28}, {12, 19, 31}, {13, 16, 29}, {13, 18, 31}, {14, 16, 30}, {14, 17, 31}
15 triples of type {β, γ, γ}: {1, 2, 3}, {1, 4, 5}, {1, 8, 9}, {1, 16, 17}, {1, 30, 31}, {2, 4, 6}, {2, 8, 10}, {2, 16, 18}, {2, 29, 31}, {4, 8, 12}, {4, 16, 20}, {4, 27, 31}, {8, 16, 24}, {8, 23, 31}, {5, 16, 31}

Computational algorithms

The first computational algorithm for the multiplication of trigintaduonions was developed by Cariow & Cariowa (2014).

Applications

The trigintaduonions have applications in particle physics, quantum physics, and other branches of modern physics. More recently, the trigintaduonions and other hypercomplex numbers have also been used in neural network research and cryptography.

Further algebras

Robert de Marrais's terms for the algebras immediately following the sedenions are the pathions (i.e. trigintaduonions), chingons, routons, and voudons. They are summarized as follows.

Name	Dimension	Symbol	Etymology	Other names
pathions	32 = 2	$\mathbb {P}$ , ${\mathcal {C}}_{5}$	32 paths of wisdom of Kabbalah, from the Sefer Yetzirah	trigintaduonions ( $\mathbb {T}$ ), 32-nions
chingons	64 = 2	$\mathbb {X}$ , ${\mathcal {C}}_{6}$	64 hexagrams of the I Ching	sexagintaquatronions, 64-nions
routons	128 = 2	$\mathbb {U}$ , ${\mathcal {C}}_{7}$	Massachusetts Route 128, of the "Massachusetts Miracle"	centumduodetrigintanions, 128-nions
voudons	256 = 2	$\mathbb {V}$ , ${\mathcal {C}}_{8}$	256 deities of the Ifá pantheon of Voodoo or Voudon	ducentiquinquagintasexions, 256-nions

References

^ de Marrais, Robert P. C. (2002). "Flying Higher Than a Box-Kite: Kite-Chain Middens, Sand Mandalas, and Zero-Divisor Patterns in the 2n-ions Beyond the Sedenions". arXiv:math/0207003.
^ Cawagas, Raoul E.; Carrascal, Alexander S.; Bautista, Lincoln A.; Maria, John P. Sta.; Urrutia, Jackie D.; Nobles, Bernadeth (2009). "The Subalgebra Structure of the Cayley-Dickson Algebra of Dimension 32 (trigintaduonion)". arXiv:0907.2047 .
Saini, Kavita; Raj, Kuldip (2021). "On generalization for Tribonacci Trigintaduonions". Indian Journal of Pure and Applied Mathematics. 52 (2). Springer Science and Business Media LLC: 420–428. doi:10.1007/s13226-021-00067-y. ISSN 0019-5588.
"Trigintaduonion". University of Waterloo. Retrieved 2024-10-08.
^ "Ensembles de nombre" (PDF) (in French). Forum Futura-Science. 6 September 2011. Retrieved 11 October 2024.
Carter, Michael (2011-08-19). "Visualization of the Cayley-Dickson Hypercomplex Numbers Up to the Chingons (64D)". MaplePrimes. Retrieved 2024-10-08.
"Application Center". Maplesoft. 2010-01-18. Retrieved 2024-10-08.
^ Valkova-Jarvis, Zlatka; Poulkov, Vladimir; Stoynov, Viktor; Mihaylova, Dimitriya; Iliev, Georgi (2022-03-18). "A Method for the Design of Bicomplex Orthogonal DSP Algorithms for Applications in Intelligent Radio Access Networks". Symmetry. 14 (3). MDPI AG: 613. Bibcode:2022Symm...14..613V. doi:10.3390/sym14030613. ISSN 2073-8994.
"Trigintaduonions". ArXiV. Retrieved 2024-10-28.
^ Saniga, Holweck & Pracna (2015).
^ Weng, Zi-Hua (2024-07-23). "Gauge fields and four interactions in the trigintaduonion spaces". Mathematical Methods in the Applied Sciences. Wiley. arXiv:2407.18265. doi:10.1002/mma.10345. ISSN 0170-4214.
Weng, Zihua (2007-04-02). "Compounding Fields and Their Quantum Equations in the Trigintaduonion Space". arXiv:0704.0136 .
Baluni, Sapna; Yadav, Vijay K.; Das, Subir (2024). "Lagrange stability criteria for hypercomplex neural networks with time varying delays". Communications in Nonlinear Science and Numerical Simulation. 131. Elsevier BV: 107765. Bibcode:2024CNSNS.13107765B. doi:10.1016/j.cnsns.2023.107765. ISSN 1007-5704.
de Marrais, Robert P. C. (2006). "Presto! Digitization, Part I: From NKS Number Theory to "XORbitant" Semantics, by way of Cayley-Dickson Process and Zero-Divisor-based "Representations"". arXiv:math/0603281.
Cariow, Aleksandr (2015). "An unified approach for developing rationalized algorithms for hypercomplex number multiplication". Przegląd Elektrotechniczny. 1 (2). Wydawnictwo SIGMA-NOT: 38–41. doi:10.15199/48.2015.02.09. ISSN 0033-2097.

Cariow, A.; Cariowa, G. (2014). "An algorithm for multiplication of trigintaduonions". Journal of Theoretical and Applied Computer Science. 8 (1): 50–75. ISSN 2299-2634. Retrieved 2024-10-10.
Saniga, Metod; Holweck, Frédéric; Pracna, Petr (2015). "From Cayley-Dickson Algebras to Combinatorial Grassmannians". Mathematics. 3 (4). MDPI AG: 1192–1221. arXiv:1405.6888. doi:10.3390/math3041192. ISSN 2227-7390. This article incorporates text from this source, which is available under the CC BY 4.0 license.

External links

v t e Number systems
Sets of definable numbers	Natural numbers ( $\mathbb {N}$ ) Integers ( $\mathbb {Z}$ ) Rational numbers ( $\mathbb {Q}$ ) Constructible numbers Algebraic numbers ( $\mathbb {A}$ ) Closed-form numbers Periods ( ${\mathcal {P}}$ ) Computable numbers Arithmetical numbers Set-theoretically definable numbers Gaussian integers Gaussian rationals Eisenstein integers
Composition algebras	Division algebras: Real numbers ( $\mathbb {R}$ ) Complex numbers ( $\mathbb {C}$ ) Quaternions ( $\mathbb {H}$ ) Octonions ( $\mathbb {O}$ )
Split types	Over $\mathbb {R}$ : Split-complex numbers Split-quaternions Split-octonions Over $\mathbb {C}$ : Bicomplex numbers Biquaternions Bioctonions
Other hypercomplex	Dual numbers Dual quaternions Dual-complex numbers Hyperbolic quaternions Sedenions ( $\mathbb {S}$ ) Trigintaduonions ( $\mathbb {T}$ ) Split-biquaternions Multicomplex numbers Geometric algebra/Clifford algebra Algebra of physical space Spacetime algebra Plane-based geometric algebra
Infinities and infinitesimals	Cardinal numbers Extended natural numbers Extended real numbers Projective Extended complex numbers Hyperreal numbers Levi-Civita field Ordinal numbers Supernatural numbers Surreal numbers Superreal numbers
Other types	Irrational numbers Fuzzy numbers Transcendental numbers p-adic numbers (p-adic solenoids) Profinite integers Normal numbers
Classification List

v t e Dimension
Dimensional spaces	Vector space Euclidean space Affine space Projective space Free module Manifold Algebraic variety Spacetime
Other dimensions	Krull Lebesgue covering Inductive Hausdorff Minkowski Fractal Degrees of freedom
Polytopes and shapes	Hyperplane Hypersurface Hypercube Hyperrectangle Demihypercube Hypersphere Cross-polytope Simplex Hyperpyramid
Number systems	Hypercomplex numbers Cayley–Dickson construction
Dimensions by number	Zero One Two Three Four Five Six Seven Eight n-dimensions
See also	Hyperspace Codimension
Category

Categories: