MathAction CaleyDickson

Topics

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  - Frobenius Algebra, Vector Spaces and Polynomial Ideals
    - The Algebra of Complex Numbers Is Frobenius In Many Ways
      - CaleyDickson <-- You are here.

Ref:

http://en.wikipedia.org/wiki/Cayley%E2%80%93Dickson_construction

"The Cayley–Dickson construction, named after Arthur Cayley and Leonard Eugene Dickson, produces a sequence of algebras over the field of real numbers, each with twice the dimension of the previous one. The algebras produced by this process are known as Cayley–Dickson algebras; since they extend the complex numbers, ... "

complex numbers, quaternions, octonions, sedenions, ...

http://en.wikipedia.org/wiki/Hypercomplex_number

fricas

(1) -> <spad>

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)abbrev domain CALEY CaleyDickson
CaleyDickson(C:CommutativeRing,gen:Symbol,gamma:C):ComplexCategory(C) with
    hyper:List % -> %
      ++ convert a list of scalars to a hyper-comnplex number
    scalars: % -> List %
      ++ convert a hyper-complex number to a list of scalars
  == add
    Rep := Record(re:C, im:C)
    rep(x:%):Rep == x pretend Rep
    per(x:Rep):% == x pretend %

    complex(x:C,y:C):% == per [x,y]
    real(x:%):C == rep(x).re
    imag(x:%):C == rep(x).im
    --mul(x:C,y:%):% == complex(x * real y, x * imag y)
    mul(x:C,y:%):% == per [x * rep(y).re, x * rep(y).im]

    -- Many funtctions are inherited from ComplexCategory
    --
    -- To Do:
    -- 1) Check which functions are still correct for higher-order algebras!

    0:% == complex(0,0)
    --zero?(x:%):Boolean == zero? real x and zero? imag x
    zero?(x:%):Boolean == x = 0
    1:% == complex(1,0)
    --one?(x:%):Boolean  == one? real x and zero? imag x
    one?(x:%):Boolean == x = 1

    if C has conjugate:C->C then
      -- In general we need conjugate
      (x:% * y:%):% ==
        complex(real x * real y - gamma*conjugate imag y * imag x,
                imag y * real x + imag x * conjugate real y)
      conjugate(x:%):% == complex(conjugate(real x), -imag x)
    else
      -- If not complex then conjugate is identity
      (x:% * y:%):% ==
        complex(real x * real y - gamma*imag y * imag x,
                imag y * real x + imag x * real y)
      conjugate(x:%):% == complex(real x, -imag x)

    -- correct order
    norm(x:%):C == retract(conjugate(x)*x)

    if C has Field then
      inv(x:%):% == mul(inv norm x, conjugate x)
      (x:% / y:%):% == x * inv(y)

    if C has rank:()->PositiveInteger then
      rank():PositiveInteger == 2*rank()$C
    else
      rank():PositiveInteger == 2

    if C has basis:()->Vector C then
      basis():Vector % ==
        concat([complex(i,0) for i in entries basis()$C],
               [complex(0,i) for i in entries basis()$C])
    else
      basis():Vector % == [1,imaginary()]

    if C has scalars: C -> List C then
      scalars(x:%):List % == map(coerce,concat(scalars real x, scalars imag x))$ListFunctions2(C,%)
    else
      scalars(x:%):List % == [ coerce real x, coerce imag x ]

    if C has hyper:List C -> C then
      hyper(x:List %):% ==
        h:Integer := divide(#x,2).quotient
        complex(hyper([retract(x.i)@C for i in 1..h]),hyper([retract(x.i)@C for i in h+1..#x]))
    else
      hyper(x:List %):% == complex(retract x.1,retract x.2)

    coerce(x:%):OutputForm ==
      outr:=real(x)::OutputForm
      imag x = 0 => return outr
      outi := hconcat(imag(x)::OutputForm, gen::OutputForm)
      if imag x = 1 then
        outi := gen::OutputForm
      if imag x = -1 then
        outi := -(gen::OutputForm)
      if C has imaginary:()->C then
        if imag x = -imaginary()$C then
          outi := -hconcat(imaginary()$C::OutputForm,gen::OutputForm)
      real x = 0 => return outi
      return outr + outi</spad>

fricas

Compiling FriCAS source code from file 
      /var/lib/zope2.10/instance/axiom-wiki/var/LatexWiki/381330559998884003-25px001.spad
      using old system compiler.
   CALEY abbreviates domain CaleyDickson 
------------------------------------------------------------------------
   initializing NRLIB CALEY for CaleyDickson 
   compiling into NRLIB CALEY 
****** Domain: C already in scope
   compiling local rep : $ -> Rep
      CALEY;rep is replaced by x 
Time: 0.05 SEC.

   compiling local per : Rep -> $
      CALEY;per is replaced by x 
Time: 0 SEC.

   compiling exported complex : (C,C) -> $
Time: 0 SEC.

   compiling exported real : $ -> C
Time: 0 SEC.

   compiling exported imag : $ -> C
Time: 0 SEC.

   compiling local mul : (C,$) -> $
Time: 0 SEC.

   compiling exported Zero : () -> $
Time: 0 SEC.

   compiling exported zero? : $ -> Boolean
Time: 0 SEC.

   compiling exported One : () -> $
Time: 0 SEC.

   compiling exported one? : $ -> Boolean
Time: 0 SEC.

augmenting C: (SIGNATURE C conjugate (C C))
   compiling exported * : ($,$) -> $
Time: 0.01 SEC.

   compiling exported conjugate : $ -> $
Time: 0 SEC.

   compiling exported * : ($,$) -> $
Time: 0 SEC.

   compiling exported conjugate : $ -> $
Time: 0 SEC.

   compiling exported norm : $ -> C
Time: 0 SEC.

****** Domain: C already in scope
augmenting C: (Field)
   compiling exported inv : $ -> $
Time: 0 SEC.

   compiling exported / : ($,$) -> $
Time: 0 SEC.

augmenting C: (SIGNATURE C rank ((PositiveInteger)))
   compiling exported rank : () -> PositiveInteger
Time: 0.01 SEC.

   compiling exported rank : () -> PositiveInteger
      CALEY;rank;Pi;19 is replaced by 2 
Time: 0 SEC.

augmenting C: (SIGNATURE C basis ((Vector C)))
   compiling exported basis : () -> Vector $
Time: 0.01 SEC.

   compiling exported basis : () -> Vector $
Time: 0 SEC.

augmenting C: (SIGNATURE C scalars ((List C) C))
   compiling exported scalars : $ -> List $
Time: 0.01 SEC.

   compiling exported scalars : $ -> List $
Time: 0 SEC.

augmenting C: (SIGNATURE C hyper (C (List C)))
   compiling exported hyper : List $ -> $
Time: 0.02 SEC.

   compiling exported hyper : List $ -> $
Time: 0 SEC.

   compiling exported coerce : $ -> OutputForm
augmenting C: (SIGNATURE C imaginary (C))
Time: 0.01 SEC.

****** Domain: C already in scope
augmenting C: (RadicalCategory)
****** Domain: C already in scope
augmenting C: (TranscendentalFunctionCategory)
****** Domain: C already in scope
augmenting C: (RealNumberSystem)
****** Domain: C already in scope
augmenting C: (TranscendentalFunctionCategory)
****** Domain: C already in scope
augmenting C: (Comparable)
****** Domain: C already in scope
augmenting C: (ConvertibleTo (InputForm))
****** Domain: C already in scope
augmenting C: (ConvertibleTo (Pattern (Float)))
****** Domain: C already in scope
augmenting C: (ConvertibleTo (Pattern (Integer)))
****** Domain: C already in scope
augmenting C: (DifferentialRing)
****** Domain: C already in scope
augmenting C: (Eltable C C)
****** Domain: C already in scope
augmenting C: (Evalable C)
****** Domain: C already in scope
augmenting C: (Field)
****** Domain: C already in scope
augmenting C: (Finite)
****** Domain: C already in scope
augmenting C: (FiniteFieldCategory)
****** Domain: C already in scope
augmenting C: (InnerEvalable (Symbol) C)
****** Domain: C already in scope
augmenting C: (IntegerNumberSystem)
****** Domain: C already in scope
augmenting C: (IntegralDomain)
****** Domain: C already in scope
augmenting C: (LinearlyExplicitOver (Integer))
****** Domain: C already in scope
augmenting C: (PartialDifferentialRing (Symbol))
****** Domain: C already in scope
augmenting C: (PatternMatchable (Float))
****** Domain: C already in scope
augmenting C: (PatternMatchable (Integer))
****** Domain: C already in scope
augmenting C: (RealConstant)
****** Domain: C already in scope
augmenting C: (RealNumberSystem)
****** Domain: C already in scope
augmenting C: (RetractableTo (Fraction (Integer)))
****** Domain: C already in scope
augmenting C: (RetractableTo (Integer))
****** Domain: C already in scope
augmenting C: (TranscendentalFunctionCategory)
(time taken in buildFunctor:  250)

;;;     ***       |CaleyDickson| REDEFINED

;;;     ***       |CaleyDickson| REDEFINED
Time: 0.30 SEC.

   Warnings: 
      [1] rep: pretendRep -- should replace by @
      [2] per: pretend$ -- should replace by @
      [3] real:  re has no value
      [4] imag:  im has no value
      [5] mul:  re has no value
      [6] mul:  im has no value
      [7] scalars:  $$ has no value

   Cumulative Statistics for Constructor CaleyDickson
      Time: 0.42 seconds

   finalizing NRLIB CALEY 
   Processing CaleyDickson for Browser database:
--->-->CaleyDickson(constructor): Not documented!!!!
--------(hyper (% (List %)))---------
--->-->CaleyDickson((hyper (% (List %)))): Improper first word in comments: convert
"convert a list of scalars to a hyper-comnplex number"
--------(scalars ((List %) %))---------
--->-->CaleyDickson((scalars ((List %) %))): Improper first word in comments: convert
"convert a hyper-complex number to a list of scalars"
--->-->CaleyDickson(): Missing Description
; compiling file "/var/aw/var/LatexWiki/CALEY.NRLIB/CALEY.lsp" (written 09 OCT 2022 07:51:53 PM):

; /var/aw/var/LatexWiki/CALEY.NRLIB/CALEY.fasl written
; compilation finished in 0:00:00.131
------------------------------------------------------------------------
   CaleyDickson is now explicitly exposed in frame initial 
   CaleyDickson will be automatically loaded when needed from 
      /var/aw/var/LatexWiki/CALEY.NRLIB/CALEY

Test

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R := FRAC POLY Integer

$\label{eq1}\hbox{\axiomType{Fraction}\ } (\hbox{\axiomType{Polynomial}\ } (\hbox{\axiomType{Integer}\ }))$

(1)

Type: Type

Complex Numbers

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C := CaleyDickson(R,'i,1)

$\label{eq2}\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{Fraction}\ } (\hbox{\axiomType{Polynomial}\ } (\hbox{\axiomType{Integer}\ })) , i , 1)$

(2)

Type: Type

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rank()$C

$\label{eq3}2$

(3)

Type: PositiveInteger?

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Ce:ILIST(C,0) := construct entries basis()$C

$\label{eq4}\left[ 1, \: i \right]$

(4)

Type: IndexedList?(CaleyDickson(Fraction(Polynomial(Integer)),i,1),0)

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matrix [[Ce.i * Ce.j for j in 0..#Ce-1] for i in 0..#Ce-1]

$\label{eq5}\left[ \begin{array}{cc} 1 & i \ i & - 1$

(5)

Type: Matrix(CaleyDickson(Fraction(Polynomial(Integer)),i,1))

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--
-- compare
--
Cg:ILIST(Complex R,0) := construct map(x+-> complex(x.1,x.2),
           1$SquareMatrix(2,FRAC INT)::List List FRAC INT)

$\label{eq6}\left[ 1, \: i \right]$

(6)

Type: IndexedList?(Complex(Fraction(Polynomial(Integer))),0)

fricas

matrix [[Cg.i * Cg.j for j in 0..#Cg-1] for i in 0..#Cg-1]

$\label{eq7}\left[ \begin{array}{cc} 1 & i \ i & - 1$

(7)

Type: Matrix(Complex(Fraction(Polynomial(Integer))))

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-- normed?
c1:C := hyper [subscript('c1,[i]) for i in 1..2]

$\label{eq8}{c 1_{1}}+{{c 1_{2}}i}$

(8)

Type: CaleyDickson(Fraction(Polynomial(Integer)),i,1)

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c2:C := hyper [subscript('c2,[i]) for i in 1..2]

$\label{eq9}{c 2_{1}}+{{c 2_{2}}i}$

(9)

Type: CaleyDickson(Fraction(Polynomial(Integer)),i,1)

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c3:C := hyper [subscript('c3,[i]) for i in 1..8]

$\label{eq10}{c 3_{1}}+{{c 3_{2}}i}$

(10)

Type: CaleyDickson(Fraction(Polynomial(Integer)),i,1)

fricas

-- Normed?
test(norm(c1*c2)=norm(c1)*norm(c2))

$\label{eq11} \mbox{\rm true}$

(11)

Type: Boolean

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-- Commutative?
test( c1 * c2 = c2 * c1 )

$\label{eq12} \mbox{\rm true}$

(12)

Type: Boolean

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-- Associative?
test((c1 * c2) * c3 = c1 * (c2 * c3))

$\label{eq13} \mbox{\rm true}$

(13)

Type: Boolean

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-- inverse
c1inv := inv c1

$\label{eq14}{\frac{c 1_{1}}{{{c 1_{2}}^{2}}+{{c 1_{1}}^{2}}}}+{-{\frac{c 1_{2}}{{{c 1_{2}}^{2}}+{{c 1_{1}}^{2}}}}i}$

(14)

Type: CaleyDickson(Fraction(Polynomial(Integer)),i,1)

fricas

test(c1 * c1inv = 1)

$\label{eq15} \mbox{\rm true}$

(15)

Type: Boolean

Quaternions

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Q := CaleyDickson(C,'j,1)

$\label{eq16}\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{Fraction}\ } (\hbox{\axiomType{Polynomial}\ } (\hbox{\axiomType{Integer}\ })) , i , 1) , j , 1)$

(16)

Type: Type

fricas

rank()$Q

$\label{eq17}4$

(17)

Type: PositiveInteger?

fricas

Qe:ILIST(Q,0) := construct entries basis()$Q

$\label{eq18}\left[ 1, \: i , \: j , \:{ij}\right]$

(18)

Type: IndexedList?(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),0)

fricas

matrix [[Qe.i * Qe.j for j in 0..#Qe-1] for i in 0..#Qe-1]

$\label{eq19}\left[ \begin{array}{cccc} 1 & i & j &{ij} \ i & - 1 &{ij}& - j \ j & -{ij}& - 1 & i \ {ij}& j & - i & - 1$

(19)

Type: Matrix(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1))

fricas

--
-- compare
--
Qg:ILIST(Quaternion R,0) := construct map(x+-> quatern(x.1,x.2,x.3,x.4),
           1$SquareMatrix(4,FRAC INT)::List List FRAC INT)

$\label{eq20}\left[ 1, \: i , \: j , \: k \right]$

(20)

Type: IndexedList?(Quaternion(Fraction(Polynomial(Integer))),0)

fricas

matrix [[Qg.i * Qg.j for j in 0..#Qg-1] for i in 0..#Qg-1]

$\label{eq21}\left[ \begin{array}{cccc} 1 & i & j & k \ i & - 1 & k & - j \ j & - k & - 1 & i \ k & j & - i & - 1$

(21)

Type: Matrix(Quaternion(Fraction(Polynomial(Integer))))

fricas

q1:Q := hyper [subscript('q1,[i]) for i in 1..4]

$\label{eq22}{q 1_{1}}+{{q 1_{2}}i}+{{{q 1_{3}}+{{q 1_{4}}i}}j}$

(22)

Type: CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1)

fricas

q2:Q := hyper [subscript('q2,[i]) for i in 1..4]

$\label{eq23}{q 2_{1}}+{{q 2_{2}}i}+{{{q 2_{3}}+{{q 2_{4}}i}}j}$

(23)

Type: CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1)

fricas

q3:Q := hyper [subscript('q3,[i]) for i in 1..8]

$\label{eq24}{q 3_{1}}+{{q 3_{2}}i}+{{{q 3_{5}}+{{q 3_{6}}i}}j}$

(24)

Type: CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1)

fricas

-- Normed?
test( norm(q1*q2) = norm(q1)*norm(q2))

$\label{eq25} \mbox{\rm true}$

(25)

Type: Boolean

fricas

-- Commutative?
test( q1 * q2 = q2 * q1 )

$\label{eq26} \mbox{\rm false}$

(26)

Type: Boolean

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-- Associative?
test((q1 * q2) * q3 = q1 * (q2 * q3))

$\label{eq27} \mbox{\rm true}$

(27)

Type: Boolean

fricas

-- inverse
q1inv := inv q1

$\label{eq28}\begin{array}{@{}l} \displaystyle {\frac{q 1_{1}}{{{q 1_{4}}^{2}}+{{q 1_{3}}^{2}}+{{q 1_{2}}^{2}}+{{q 1_{1}}^{2}}}}+ \ \ \displaystyle {-{\frac{q 1_{2}}{{{q 1_{4}}^{2}}+{{q 1_{3}}^{2}}+{{q 1_{2}}^{2}}+{{q 1_{1}}^{2}}}}i}+ \ \ \displaystyle {{-{\frac{q 1_{3}}{{{q 1_{4}}^{2}}+{{q 1_{3}}^{2}}+{{q 1_{2}}^{2}}+{{q 1_{1}}^{2}}}}+{-{\frac{q 1_{4}}{{{q 1_{4}}^{2}}+{{q 1_{3}}^{2}}+{{q 1_{2}}^{2}}+{{q 1_{1}}^{2}}}}i}}j}$

(28)

Type: CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1)

fricas

test(q1 * q1inv = 1)

$\label{eq29} \mbox{\rm true}$

(29)

Type: Boolean

Octonions

Ref: http://en.wikipedia.org/wiki/Octonion

fricas

O:=CaleyDickson(Q,'k,1)

$\label{eq30}\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{Fraction}\ } (\hbox{\axiomType{Polynomial}\ } (\hbox{\axiomType{Integer}\ })) , i , 1) , j , 1) , k , 1)$

(30)

Type: Type

fricas

rank()$O

$\label{eq31}8$

(31)

Type: PositiveInteger?

fricas

Oe:ILIST(O,0) := construct entries basis()$O

$\label{eq32}\left[ 1, \: i , \: j , \:{ij}, \: k , \:{ik}, \:{jk}, \:{{ij}k}\right]$

(32)

Type: IndexedList?(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),0)

fricas

matrix [[Oe.i * Oe.j for j in 0..#Oe-1] for i in 0..#Oe-1]

$\label{eq33}\left[ \begin{array}{cccccccc} 1 & i & j &{ij}& k &{ik}&{jk}&{{ij}k} \ i & - 1 &{ij}& - j &{ik}& - k &{-{ij}k}&{jk} \ j & -{ij}& - 1 & i &{jk}&{{ij}k}& - k &{- ik} \ {ij}& j & - i & - 1 &{{ij}k}& -{jk}&{ik}& - k \ k &{- ik}& -{jk}&{-{ij}k}& - 1 & i & j &{ij} \ {ik}& k &{-{ij}k}&{jk}& - i & - 1 & -{ij}& j \ {jk}&{{ij}k}& k &{- ik}& - j &{ij}& - 1 & - i \ {{ij}k}& -{jk}&{ik}& k & -{ij}& - j & i & - 1$

(33)

Type: Matrix(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1))

fricas

--
-- compare
--
Og:ILIST(Octonion R,0):=map(x+-> octon(x.1,x.2,x.3,x.4,x.5,x.6,x.7,x.8),
           1$SquareMatrix(8,FRAC INT)::List List FRAC INT)

$\label{eq34}\left[ 1, \: i , \: j , \: k , \: E , \: I , \: J , \: K \right]$

(34)

Type: IndexedList?(Octonion(Fraction(Polynomial(Integer))),0)

fricas

matrix [[Og.i * Og.j for j in 0..#Og-1] for i in 0..#Og-1]

$\label{eq35}\left[ \begin{array}{cccccccc} 1 & i & j & k & E & I & J & K \ i & - 1 & k & - j & I & - E & - K & J \ j & - k & - 1 & i & J & K & - E & - I \ k & j & - i & - 1 & K & - J & I & - E \ E & - I & - J & - K & - 1 & i & j & k \ I & E & - K & J & - i & - 1 & - k & j \ J & K & E & - I & - j & k & - 1 & - i \ K & - J & I & E & - k & - j & i & - 1$

(35)

Type: Matrix(Octonion(Fraction(Polynomial(Integer))))

fricas

o1:O := hyper [subscript('o1,[i]) for i in 1..8]

$\label{eq36}{o 1_{1}}+{{o 1_{2}}i}+{{{o 1_{3}}+{{o 1_{4}}i}}j}+{{{o 1_{5}}+{{o 1_{6}}i}+{{{o 1_{7}}+{{o 1_{8}}i}}j}}k}$

(36)

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1)

fricas

o2:O := hyper [subscript('o2,[i]) for i in 1..8]

$\label{eq37}{o 2_{1}}+{{o 2_{2}}i}+{{{o 2_{3}}+{{o 2_{4}}i}}j}+{{{o 2_{5}}+{{o 2_{6}}i}+{{{o 2_{7}}+{{o 2_{8}}i}}j}}k}$

(37)

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1)

fricas

o3:O := hyper [subscript('o3,[i]) for i in 1..8]

$\label{eq38}{o 3_{1}}+{{o 3_{2}}i}+{{{o 3_{3}}+{{o 3_{4}}i}}j}+{{{o 3_{5}}+{{o 3_{6}}i}+{{{o 3_{7}}+{{o 3_{8}}i}}j}}k}$

(38)

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1)

fricas

-- normed?
test(norm(o1*o2)=norm(o1)*norm(o2))

$\label{eq39} \mbox{\rm true}$

(39)

Type: Boolean

fricas

-- Commutative?
test( o1 * o2 = o2 * o1 )

$\label{eq40} \mbox{\rm false}$

(40)

Type: Boolean

fricas

-- Associative?
test((o1 * o2) * o3 = o1 * (o2 * o3))

$\label{eq41} \mbox{\rm false}$

(41)

Type: Boolean

fricas

-- Alternative?
test((o1 * o2) * o1 = o1 * (o2 * o1))

$\label{eq42} \mbox{\rm true}$

(42)

Type: Boolean

Split-Octonions

Ref: http://en.wikipedia.org/wiki/Split-octonion

Note: Our table below is not identical the one shown in the reference where a different convention is used to define multiplication.

fricas

sO:=CaleyDickson(Q,'ℓ,-1)

$\label{eq43}\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{Fraction}\ } (\hbox{\axiomType{Polynomial}\ } (\hbox{\axiomType{Integer}\ })) , i , 1) , j , 1) , � � , - 1)$

(43)

Type: Type

fricas

rank()$sO

$\label{eq44}8$

(44)

Type: PositiveInteger?

fricas

sOe:ILIST(sO,0) := construct entries basis()$sO

$\label{eq45}\left[ 1, \: i , \: j , \:{ij}, \: � � , \:{i � �}, \:{j � �}, \:{{ij}� �}\right]$

(45)

Type: IndexedList?(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),ℓ,-1),0)

fricas

matrix [[sOe.i * sOe.j for j in 0..#sOe-1] for i in 0..#sOe-1]

$\label{eq46}\left[ \begin{array}{cccccccc} 1 & i & j &{ij}& � � &{i � �}&{j � �}&{{ij}� �} \ i & - 1 &{ij}& - j &{i � �}& - � � &{-{ij}� �}&{j � �} \ j & -{ij}& - 1 & i &{j � �}&{{ij}� �}& - � � &{- i � �} \ {ij}& j & - i & - 1 &{{ij}� �}& -{j � �}&{i � �}& - � � \ � � &{- i � �}& -{j � �}&{-{ij}� �}& 1 & - i & - j & -{ij} \ {i � �}& � � &{-{ij}� �}&{j � �}& i & 1 &{ij}& - j \ {j � �}&{{ij}� �}& � � &{- i � �}& j & -{ij}& 1 & i \ {{ij}� �}& -{j � �}&{i � �}& � � &{ij}& j & - i & 1$

(46)

Type: Matrix(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),ℓ,-1))

fricas

so1:sO := hyper [subscript('so1,[i]) for i in 1..8]

$\label{eq47}{so 1_{1}}+{{so 1_{2}}i}+{{{so 1_{3}}+{{so 1_{4}}i}}j}+{{{so 1_{5}}+{{so 1_{6}}i}+{{{so 1_{7}}+{{so 1_{8}}i}}j}}� �}$

(47)

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),ℓ,-1)

fricas

so2:sO := hyper [subscript('so2,[i]) for i in 1..8]

$\label{eq48}{so 2_{1}}+{{so 2_{2}}i}+{{{so 2_{3}}+{{so 2_{4}}i}}j}+{{{so 2_{5}}+{{so 2_{6}}i}+{{{so 2_{7}}+{{so 2_{8}}i}}j}}� �}$

(48)

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),ℓ,-1)

fricas

so3:sO := hyper [subscript('so3,[i]) for i in 1..8]

$\label{eq49}{so 3_{1}}+{{so 3_{2}}i}+{{{so 3_{3}}+{{so 3_{4}}i}}j}+{{{so 3_{5}}+{{so 3_{6}}i}+{{{so 3_{7}}+{{so 3_{8}}i}}j}}� �}$

(49)

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),ℓ,-1)

fricas

-- Normed?
test(norm(so1*so2)=norm(so1)*norm(so2))

$\label{eq50} \mbox{\rm true}$

(50)

Type: Boolean

fricas

-- Commutative?
test( so1 * so2 = so2 * so1 )

$\label{eq51} \mbox{\rm false}$

(51)

Type: Boolean

fricas

-- Associative?
test((so1 * so2) * so3 = so1 * (so2 * so3))

$\label{eq52} \mbox{\rm false}$

(52)

Type: Boolean

fricas

-- Alternative?
test((so1 * so2) * so1 = so1 * (so2 * so1))

$\label{eq53} \mbox{\rm true}$

(53)

Type: Boolean

fricas

-- inverse
so1inv := inv so1;

Type: CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),ℓ,-1)

fricas

test(so1 * so1inv = 1)

$\label{eq54} \mbox{\rm true}$

(54)

Type: Boolean

Sedenions

Ref: http://en.wikipedia.org/wiki/Sedenion

fricas

S:=CaleyDickson(O,'l,1)

$\label{eq55}\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{CaleyDickson}\ } (\hbox{\axiomType{Fraction}\ } (\hbox{\axiomType{Polynomial}\ } (\hbox{\axiomType{Integer}\ })) , i , 1) , j , 1) , k , 1) , l , 1)$

(55)

Type: Type

fricas

rank()$S

$\label{eq56}16$

(56)

Type: PositiveInteger?

fricas

Se:ILIST(S,0) := construct entries basis()$S

$\label{eq57}\left[ 1, \: i , \: j , \:{ij}, \: k , \:{ik}, \:{jk}, \:{{ij}k}, \: l , \:{il}, \:{jl}, \:{{ij}l}, \:{kl}, \:{{ik}l}, \:{{jk}l}, \:{{{ij}k}l}\right]$

(57)

Type: IndexedList?(CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1),0)

fricas

matrix [[Se.i * Se.j for j in 0..#Se-1] for i in 0..#Se-1]

$\label{eq58}\left[ \begin{array}{cccccccccccccccc} 1 & i & j &{ij}& k &{ik}&{jk}&{{ij}k}& l &{il}&{jl}&{{ij}l}&{kl}&{{ik}l}&{{jk}l}&{{{ij}k}l} \ i & - 1 &{ij}& - j &{ik}& - k &{-{ij}k}&{jk}&{il}& - l &{-{ij}l}&{jl}&{{- ik}l}&{kl}&{{{ij}k}l}&{-{jk}l} \ j & -{ij}& - 1 & i &{jk}&{{ij}k}& - k &{- ik}&{jl}&{{ij}l}& - l &{- il}&{-{jk}l}&{{-{ij}k}l}&{kl}&{{ik}l} \ {ij}& j & - i & - 1 &{{ij}k}& -{jk}&{ik}& - k &{{ij}l}&{- jl}&{il}& - l &{{-{ij}k}l}&{{jk}l}&{{- ik}l}&{kl} \ k &{- ik}& -{jk}&{-{ij}k}& - 1 & i & j &{ij}&{kl}&{{ik}l}&{{jk}l}&{{{ij}k}l}& - l &{- il}&{- jl}&{-{ij}l} \ {ik}& k &{-{ij}k}&{jk}& - i & - 1 & -{ij}& j &{{ik}l}& -{kl}&{{{ij}k}l}&{-{jk}l}&{il}& - l &{{ij}l}&{- jl} \ {jk}&{{ij}k}& k &{- ik}& - j &{ij}& - 1 & - i &{{jk}l}&{{-{ij}k}l}& -{kl}&{{ik}l}&{jl}&{-{ij}l}& - l &{il} \ {{ij}k}& -{jk}&{ik}& k & -{ij}& - j & i & - 1 &{{{ij}k}l}&{{jk}l}&{{- ik}l}& -{kl}&{{ij}l}&{jl}&{- il}& - l \ l &{- il}&{- jl}&{-{ij}l}& -{kl}&{{- ik}l}&{-{jk}l}&{{-{ij}k}l}& - 1 & i & j &{ij}& k &{ik}&{jk}&{{ij}k} \ {il}& l &{-{ij}l}&{jl}&{{- ik}l}&{kl}&{{{ij}k}l}&{-{jk}l}& - i & - 1 & -{ij}& j &{- ik}& k &{{ij}k}& -{jk} \ {jl}&{{ij}l}& l &{- il}&{-{jk}l}&{{-{ij}k}l}&{kl}&{{ik}l}& - j &{ij}& - 1 & - i & -{jk}&{-{ij}k}& k &{ik} \ {{ij}l}&{- jl}&{il}& l &{{-{ij}k}l}&{{jk}l}&{{- ik}l}&{kl}& -{ij}& - j & i & - 1 &{-{ij}k}&{jk}&{- ik}& k \ {kl}&{{ik}l}&{{jk}l}&{{{ij}k}l}& l &{- il}&{- jl}&{-{ij}l}& - k &{ik}&{jk}&{{ij}k}& - 1 & - i & - j & -{ij} \ {{ik}l}& -{kl}&{{{ij}k}l}&{-{jk}l}&{il}& l &{{ij}l}&{- jl}&{- ik}& - k &{{ij}k}& -{jk}& i & - 1 &{ij}& - j \ {{jk}l}&{{-{ij}k}l}& -{kl}&{{ik}l}&{jl}&{-{ij}l}& l &{il}& -{jk}&{-{ij}k}& - k &{ik}& j & -{ij}& - 1 & i \ {{{ij}k}l}&{{jk}l}&{{- ik}l}& -{kl}&{{ij}l}&{jl}&{- il}& l &{-{ij}k}&{jk}&{- ik}& - k &{ij}& j & - i & - 1$

(58)

Type: Matrix(CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1))

fricas

s1:S := hyper [subscript('s1,[i]) for i in 1..16]

$\label{eq59}\begin{array}{@{}l} \displaystyle {s 1_{1}}+{{s 1_{2}}i}+{{{s 1_{3}}+{{s 1_{4}}i}}j}+{{{s 1_{5}}+{{s 1_{6}}i}+{{{s 1_{7}}+{{s 1_{8}}i}}j}}k}+ \ \ \displaystyle {{{s 1_{9}}+{{s 1_{10}}i}+{{{s 1_{11}}+{{s 1_{12}}i}}j}+{{{s 1_{13}}+{{s 1_{14}}i}+{{{s 1_{15}}+{{s 1_{16}}i}}j}}k}}l}$

(59)

Type: CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1)

fricas

s2:S := hyper [subscript('s2,[i]) for i in 1..16]

$\label{eq60}\begin{array}{@{}l} \displaystyle {s 2_{1}}+{{s 2_{2}}i}+{{{s 2_{3}}+{{s 2_{4}}i}}j}+{{{s 2_{5}}+{{s 2_{6}}i}+{{{s 2_{7}}+{{s 2_{8}}i}}j}}k}+ \ \ \displaystyle {{{s 2_{9}}+{{s 2_{10}}i}+{{{s 2_{11}}+{{s 2_{12}}i}}j}+{{{s 2_{13}}+{{s 2_{14}}i}+{{{s 2_{15}}+{{s 2_{16}}i}}j}}k}}l}$

(60)

Type: CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1)

fricas

s3:S := hyper [subscript('s3,[i]) for i in 1..16]

$\label{eq61}\begin{array}{@{}l} \displaystyle {s 3_{1}}+{{s 3_{2}}i}+{{{s 3_{3}}+{{s 3_{4}}i}}j}+{{{s 3_{5}}+{{s 3_{6}}i}+{{{s 3_{7}}+{{s 3_{8}}i}}j}}k}+ \ \ \displaystyle {{{s 3_{9}}+{{s 3_{10}}i}+{{{s 3_{11}}+{{s 3_{12}}i}}j}+{{{s 3_{13}}+{{s 3_{14}}i}+{{{s 3_{15}}+{{s 3_{16}}i}}j}}k}}l}$

(61)

Type: CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1)

fricas

-- normed?
test(norm(s1*s2)=norm(s1)*norm(s2))

$\label{eq62} \mbox{\rm false}$

(62)

Type: Boolean

fricas

-- Commutative
test( s1 * s2 = s2 * s1 )

$\label{eq63} \mbox{\rm false}$

(63)

Type: Boolean

fricas

-- Associative?
test( (s1 * s2) * s3 =  s1 * (s2 * s3) )

$\label{eq64} \mbox{\rm false}$

(64)

Type: Boolean

fricas

-- Alternative?
test((s1 * s2) * s1 = - s1 * (s2 * s1))

$\label{eq65} \mbox{\rm false}$

(65)

Type: Boolean

fricas

-- zero divisor
(Se.3 + Se.10) * (Se.6 - Se.15)

$\label{eq66}0$

(66)

Type: CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1)

fricas

-- inverse
s1inv := inv s1;

Type: CaleyDickson(CaleyDickson(CaleyDickson(CaleyDickson(Fraction(Polynomial(Integer)),i,1),j,1),k,1),l,1)

fricas

test(s1 * s1inv = 1)

$\label{eq67} \mbox{\rm true}$

(67)

Type: Boolean

Power Associative?

Algebra with associative powers

Ref: http://eom.springer.de/a/a011410.htm

fricas

test( s1^2 * s1 = s1 * s1^2 )

$\label{eq68} \mbox{\rm true}$

(68)

Type: Boolean

fricas

test( (s1^2 * s1) * s1 = s1^2 * s1^2 )

$\label{eq69} \mbox{\rm true}$

(69)

Type: Boolean

Conversions

fricas

test(s1=hyper scalars s1)

$\label{eq70} \mbox{\rm true}$

(70)

Type: Boolean

fricas

scalars(s1)::List Symbol

$\label{eq71}\begin{array}{@{}l} \displaystyle \left[{s 1_{1}}, \:{s 1_{2}}, \:{s 1_{3}}, \:{s 1_{4}}, \:{s 1_{5}}, \:{s 1_{6}}, \:{s 1_{7}}, \:{s 1_{8}}, \:{s 1_{9}}, \:{s 1_{10}}, \:{s 1_{11}}, \:{s 1_{12}}, \: \right. \ \ \displaystyle \left.{s 1_{13}}, \:{s 1_{14}}, \:{s 1_{15}}, \:{s 1_{16}}\right]$

(71)

Type: List(Symbol)