Sedenion

In abstract algebra, the sedenions form a 16-dimensional noncommutative and nonassociative algebra over the reals obtained by applying the Cayley–Dickson construction to the octonions. The set of sedenions is denoted by $\mathbb{S}$ .

The term "sedenion" is also used for other 16-dimensional algebraic structures, such as a tensor product of 2 copies of the biquaternions, or the algebra of 4 by 4 matrices over the reals, or that studied by Smith (1995).

Arithmetic

A visualization of a 4D extension to the cubic Octonion#Fano plane mnemonic,^[1] showing the 35 triads as hyperplanes through the Real (e₀) vertex of the sedenion example given.

Like octonions, multiplication of sedenions is neither commutative nor associative. But in contrast to the octonions, the sedenions do not even have the property of being alternative. They do, however, have the property of power associativity, which can be stated as that, for any element x of $\mathbb{S}$ , the power $x^n$ is well defined. They are also flexible.

Every sedenion is a linear combination of the unit sedenions e₀, e₁, e₂, e₃, ...,e₁₅, which form a basis of the vector space of sedenions. Every sedenion can be represented in the form

x = x_0e_0 + x_1e_1 + x_2e_2 + \ldots + x_{14}e_{14} + x_{15}e_{15},\,

Addition and subtraction are defined by the addition and subtraction of corresponding coefficients and multiplication is distributive over addition.

Like other algebras based on the Cayley–Dickson construction, the sedenions contain the algebra they were constructed from. So, they contain the octonions (e₀ to e₇ in the table below), and therefore also the quaternions (e₀ to e₃), complex numbers (e₀ and e₁) and reals (e₀).

The sedenions have a multiplicative identity element e₀ and multiplicative inverses but they are not a division algebra because they have zero divisors. This means that two non-zero sedenions can be multiplied to obtain zero: an example is (e₃ + e₁₀)×(e₆ − e₁₅). All hypercomplex number systems after sedenions that are based on the Cayley–Dickson construction contain zero divisors.

The multiplication table of these unit sedenions follows:

$\times$	`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`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

From the above table, we can see that:

e_0e_i = e_ie_0 = e_i,

e_ie_i = -e_0 \,\, \text{for}\,\, i \neq 0,

e_ie_j = -e_je_i \,\, \text{for}\,\, i \neq j \,\,\text{and}\,\, i,j \neq 0.

e_i(e_je_k) = -(e_ie_j)e_k \,\,\text{for}\,\, i \neq j,\,\, i,j \neq 0\,\,\text{and}\,\, e_ie_j\neq \plusmn e_k.

The 35 triads that make up this specific sedenion multiplication table with the 7 triads of the octonion used in creating the sedenion through the Cayley–Dickson construction shown in bold red:

{{1, 2, 3} , {1, 4, 5} , {1, 7, 6} , {1, 8, 9}, {1, 11, 10}, {1, 13, 12}, {1, 14, 15},
{2, 4, 6} , {2, 5, 7} , {2, 8, 10}, {2, 9, 11}, {2, 14, 12}, {2, 15, 13}, {3, 4, 7} ,
{3, 6, 5} , {3, 8, 11}, {3, 10, 9}, {3, 13, 14}, {3, 15, 12}, {4, 8, 12}, {4, 9, 13},
{4, 10, 14}, {4, 11, 15}, {5, 8, 13}, {5, 10, 15}, {5, 12, 9}, {5, 14, 11}, {6, 8, 14},
{6, 11, 13}, {6, 12, 10}, {6, 15, 9}, {7, 8, 15}, {7, 9, 14}, {7, 12, 11}, {7, 13, 10}}

The list of 84 sets of zero divisors {e_a, e_b, e_c, e_d}, where (e_a + e_b) $\circ$ (e_c + e_d)=0:

Applications

Moreno (1998) showed that the space of norm 1 zero-divisors of the sedenions is homeomorphic to the compact form of the exceptional Lie group G₂.

Notes

↑ (Baez 2002, p. 6)

References

Imaeda, K.; Imaeda, M. (2000), "Sedenions: algebra and analysis", Applied Mathematics and Computation 115 (2): 77–88, doi:10.1016/S0096-3003(99)00140-X, MR 1786945
Baez, John C. (2002). "The Octonions". Bulletin of the American Mathematical Society 39 (2): 145–205. arXiv:math/0105155v4. doi:10.1090/S0273-0979-01-00934-X. ISSN 0273-0979. MR 1886087.
Kinyon, M.K., Phillips, J.D., Vojtěchovský, P.: C-loops: Extensions and constructions, Journal of Algebra and its Applications 6 (2007), no. 1, 1–20.
Kivunge, Benard M. and Smith, Jonathan D. H: "Subloops of sedenions", Comment.Math.Univ.Carolinae 45,2 (2004)295–302.
Moreno, Guillermo (1998), "The zero divisors of the Cayley–Dickson algebras over the real numbers", Sociedad Matemática Mexicana. Boletí n. Tercera Serie 4 (1): 13–28, arXiv:q-alg/9710013, MR 1625585
Smith, Jonathan D. H. (1995), "A left loop on the 15-sphere", Journal of Algebra 176 (1): 128–138, doi:10.1006/jabr.1995.1237, MR 1345298

Number systems

Countable sets	Natural numbers (ℕ) Integers (ℤ) Rational numbers (ℚ) Constructible numbers Algebraic numbers (𝔸) Periods Computable numbers Definable real numbers Arithmetical numbers Gaussian integers

Real numbers and extensions	Real numbers (ℝ) Complex numbers (ℂ) Quaternions (ℍ) Octonions (𝕆) Sedenions (𝕊) Cayley–Dickson construction Dual numbers Split-complex numbers Bicomplex numbers Split-quaternions Hyperbolic quaternions Biquaternions Dual quaternions Split-biquaternions Split-octonions Hypercomplex numbers Superreal numbers Irrational numbers Transcendental numbers Hyperreal numbers Levi-Civita field Surreal numbers

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Classification List

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Sedenion

Arithmetic

Applications

See also

Notes

References