Trigintaduonion - Misplaced Pages

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In abstract algebra, the trigintaduonions (from the Latin trigintaduo meaning 32) form a 32-dimensional algebra over the reals. They are constructed from the sedenions by applying the Cayley–Dickson construction.

Like the sedenions, which they contain as a sub-algebra, trigintaduonions are neither commutative, associative nor alternative. They do preserve the property of being power associative.

References

C++ Complex Numbers, Quaternions, Octonions, Sedenions, etc., University of Waterloo
^ The Basic Subalgebra Structure of the Cayley-Dickson Algebra of Dimension 32 (Trigintaduonions), Raoul E. Cawgas and co-authors

Compounding Fields and Their Quantum Equations in the Trigintaduonion Space, Zihua Weng

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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
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