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	SandBox	Cartesian Product
SandBoxSqrt ←	↑		→ SandBoxSurfaceComplex

SandBoxSum

Edit detail for SandBoxSum revision 14 of 14

	1 2 3 4 5 6 7 8 9 10 11 12 13 14
Editor: test1 Time: 2013/04/25 19:51:06 GMT+0
Note:

changed:
-       Rep == Union(acomp:A,bcomp:B)
       Rep ==> Union(acomp:A, bcomp:B)
       rep x ==> (x@%) pretend Rep
       per x ==> (x@Rep) pretend %



changed:
-          x ** p ==
-                   rep(x) case acomp => per [rep(x).acomp ** p]
-                   per [rep(x).bcomp ** p]
          x ^ p ==
                   rep(x) case acomp => per [rep(x).acomp ^ p]
                   per [rep(x).bcomp ^ p]

changed:
-    Rep == Record(ind : NonNegativeInteger, elt : S)
    Rep ==> Record(ind : NonNegativeInteger, elt : S)
    rep x ==> (x@%) pretend Rep
    per x ==> (x@Rep) pretend %

changed:
-      x ** p == per [rep(x).ind, rep(x).elt ** p]
      x ^ p == per [rep(x).ind, rep(x).elt ^ p]

changed:
-    Rep == Record(ind:NonNegativeInteger, len:NonNegativeInteger, elt:S)
    Rep ==> Record(ind : NonNegativeInteger, len : NonNegativeInteger, elt : S)
    rep x ==> (x@%) pretend Rep
    per x ==> (x@Rep) pretend %

changed:
-      x ** p == per [rep(x).ind, rep(x).len, rep(x).elt ** p]
      x ^ p == per [rep(x).ind, rep(x).len, rep(x).elt ^ p]

The Sum domain constructor is intended to be the Categorical Dual of the Product domain constructor

spad

)abbrev domain SUM Sum
++ Description:
++ This domain implements direct union
Sum (A:SetCategory,B:SetCategory) : C == T
 where
  C == SetCategory  with
       if A has Finite and B has Finite then Finite
       if A has Monoid and B has Monoid then Monoid
       if A has AbelianMonoid and B has AbelianMonoid then AbelianMonoid
       if A has CancellationAbelianMonoid and
          B has CancellationAbelianMonoid then CancellationAbelianMonoid
       if A has Group  and B has Group  then  Group
       if A has AbelianGroup and B has AbelianGroup then  AbelianGroup
       if A has OrderedAbelianMonoidSup and B has OrderedAbelianMonoidSup
                                             then OrderedAbelianMonoidSup
       if A has OrderedSet and B has OrderedSet then  OrderedSet

       selectsum     : % -> Union(acomp:A,bcomp:B)
        ++ selectsum(x) \undocumented
       in1  :   A -> %
        ++ makefirst(a) \undocumented
       in2 :   B -> %
        ++ makesecond(b) \undocumented

  T == add

    --representations
       Rep ==> Union(acomp:A, bcomp:B)
       rep x ==> (x@%) pretend Rep
       per x ==> (x@Rep) pretend %

       import Rep

    --declarations
       x,y: %
       i: NonNegativeInteger
       p: NonNegativeInteger
       a: A
       b: B
       c: PositiveInteger
       d: Integer

    --define
       coerce(x:%):OutputForm ==
         rep(x) case acomp => sub(coerce(rep(x).acomp),"1")
         sub(coerce(rep(x).bcomp),"2")
       x=y == rep(x)=rep(y)
       selectsum(x) == rep(x)
       in1(a) == per [a]
       in2(b) == per [b]

       if A has Monoid and B has Monoid then
          -- represent unit of Sum(A,B) as 1$A (We could use either 1$A or 1$B)
          1 == per [1$A]
          x * y ==
                   rep(x) case acomp and rep(y) case acomp => per [rep(x).acomp * rep(y).acomp]
                   rep(x) case bcomp and rep(y) case bcomp => per [rep(x).bcomp * rep(y).bcomp]
                   -- unit of Sum(A,B)=1$A is unit for B
                   x=1 => y
                   y=1 => x
                   error "not same type"
          x ^ p ==
                   rep(x) case acomp => per [rep(x).acomp ^ p]
                   per [rep(x).bcomp ^ p]

       if A has Finite and B has Finite then
          size == size$A + size$B
          index(n) ==
                      n > size$B => per [index((n::Integer - size$B)::PositiveInteger)$A]
                      per [index(n)$B]
          random() ==
                      random()$Boolean => per [random()$A]
                      per [random()$B]
          lookup(x) ==
                      rep(x) case acomp => (lookup(rep(x).acomp)$A::NonNegativeInteger + size$B)::PositiveInteger
                      lookup(rep(x).bcomp)$B
          hash(x) ==
                      rep(x) case acomp => hash(rep(x).acomp)$A + size$B::SingleInteger
                      hash(rep(x).bcomp)$B

       if A has Group and B has Group then
          inv(x) ==
                    rep(x) case acomp => per [inv(rep(x).acomp)]
                    per [inv(rep(x).bcomp)]

       if A has AbelianMonoid and B has AbelianMonoid then
          -- represent zero of Sum(A,B) as 0$A (We could use either 0$A or 0$B)
          0 == per [0$A]
          x + y ==
                   rep(x) case acomp and rep(y) case acomp => per [rep(x).acomp + rep(y).acomp]
                   rep(x) case bcomp and rep(y) case bcomp => per [rep(x).bcomp + rep(y).bcomp]
                   -- zero of Sum(A,B)=0$A is zero for B
                   x=0 => y
                   y=0 => x
                   error "not same type"
          c * x ==
                   rep(x) case acomp => per [c * rep(x).acomp]
                   per [c* rep(x).bcomp]

       if A has AbelianGroup and B has AbelianGroup then
          -x ==
                 rep(x) case acomp => per [- rep(x).acomp]
                 per [- rep(x).bcomp]
          (x - y):% ==
                   rep(x) case acomp and rep(y) case acomp => per [rep(x).acomp - rep(y).acomp]
                   rep(x) case bcomp and rep(y) case bcomp => per [rep(x).bcomp - rep(y).bcomp]
                   -- zero of Sum(A,B)=0$A is zero for B
                   x=0 => -y
                   y=0 => x
                   error "not same type"

          d * x ==
                   rep(x) case acomp => per [d * rep(x).acomp]
                   per [d* rep(x).bcomp]

       if A has OrderedAbelianMonoidSup and B has OrderedAbelianMonoidSup then
          sup(x,y) ==
                   rep(x) case acomp and rep(y) case acomp => per [sup(rep(x).acomp,rep(y).acomp)]
                   rep(x) case bcomp and rep(y) case bcomp => per [sup(rep(x).bcomp,rep(y).bcomp)]
                   rep(x) case acomp and rep(y) case bcomp => y
                   x

       if A has OrderedSet and B has OrderedSet then
          x < y ==
                   rep(x) case acomp and rep(y) case acomp => rep(x).acomp < rep(y).acomp
                   rep(x) case bcomp and rep(y) case bcomp => rep(x).bcomp < rep(y).bcomp
                   rep(x) case acomp and rep(y) case bcomp

spad

   Compiling FriCAS source code from file 
      /var/lib/zope2.10/instance/axiom-wiki/var/LatexWiki/6614319580939889182-25px001.spad
      using old system compiler.
   SUM abbreviates domain Sum 
------------------------------------------------------------------------
   initializing NRLIB SUM for Sum 
   compiling into NRLIB SUM 
   processing macro definition Rep ==> Union(acomp: A,bcomp: B) 
   processing macro definition rep x ==> pretend(@(x,$),Union(acomp: A,bcomp: B)) 
   processing macro definition per x ==> pretend(@(x,Union(acomp: A,bcomp: B)),$) 
   importing Union(acomp: A,bcomp: B)
   compiling exported coerce : $ -> OutputForm
****** comp fails at level 5 with expression: ******
error in function coerce 

(SEQ
 (|:=| (|:| #1=#:G670 (|Boolean|))
  (|case| (|pretend| (@ |x| $) (|Union| (|:| |acomp| A) (|:| |bcomp| B)))
   |acomp|))
 (|exit| 1
  (IF #1#
      (|sub|
       (|coerce|
        ((|pretend| (@ |x| $) (|Union| (|:| |acomp| A) (|:| |bcomp| B)))
         |acomp|))
       | << 1 >> |)
      (|sub|
       (|coerce|
        ((|pretend| (@ |x| $) (|Union| (|:| |acomp| A) (|:| |bcomp| B)))
         |bcomp|))
       "2"))))
****** level 5  ******
$x:= 1
$m:= (OutputForm)
$f:=
((((#:G670 # #) (|x| # #) (|d| #) (|c| #) ...)))

   >> Apparent user error:
   Cannot coerce 1 
      of mode 1 
      to mode (OutputForm)

fricas

size()$Sum(PF 7,PF 13)

   Sum is an unknown constructor and so is unavailable. Did you mean to
      use -> but type something different instead?

The CoTuple? domain constructor is intended to be the Categorical Dual of the Tuple domain constructor

spad

)abbrev domain COT CoTuple
++ This domain is intended to be the categorical dual of a
++ Tuple (comma-delimited homogeneous sequence of values).
++ As such it implements an n-ary disjoint union.
CoTuple(S:Type): CoercibleTo(S) with
    inj: (NonNegativeInteger,S) -> %
      ++ inject(x,n) returns x as an element of the n-th
      ++ component of the CoTuple. CoTuples are 0-based
    ind: % -> NonNegativeInteger
      ++ index(x) returns the component number of x in the CoTuple
    if S has Monoid then Monoid
    if S has AbelianMonoid then AbelianMonoid
    if S has CancellationAbelianMonoid then CancellationAbelianMonoid
    if S has Group then Group
    if S has AbelianGroup then  AbelianGroup
    if S has OrderedAbelianMonoidSup then OrderedAbelianMonoidSup
    if S has SetCategory then SetCategory
    if S has OrderedSet then OrderedSet
  == add
    Rep ==> Record(ind : NonNegativeInteger, elt : S)
    rep x ==> (x@%) pretend Rep
    per x ==> (x@Rep) pretend %
    --declarations
    x,y: %
    s: S
    i: NonNegativeInteger
    p: NonNegativeInteger
    c: PositiveInteger
    d: Integer

    coerce(x:%):S == rep(x).elt
    inj(i,s) == per [i,s]
    ind(x) == rep(x).ind

    if S has SetCategory then
      x = y == (rep(x).ind = rep(y).ind) and (rep(x).elt = rep(y).elt)
      coerce(x : %): OutputForm == sub(coerce(rep(x).elt),coerce(rep(x).ind))
    if S has Monoid then
      -- represent unit of CoTuple(S) as 1$S of component 0
      1 == per [0,1]
      x * y ==
        rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).elt * rep(y).elt]
        x = 1 => y
        y = 1 => x
        error "not same type"
      x ^ p == per [rep(x).ind, rep(x).elt ^ p]

    if S has Group then
       inv(x) == per [rep(x).ind, inv(rep(x).elt)]

    if S has AbelianMonoid then
       -- represent zero of Sum(A,B) as 0$S
       0 == per [0,0]
       x + y ==
         rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).elt + rep(y).elt]
         x = 0 => y
         y = 0 => x
         error "not same type"
       c * x == per [rep(x).ind, c * rep(x).elt]

    if S has AbelianGroup then
      - x == per [rep(x).ind, -rep(x).elt]
      (x - y):% ==
        rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).elt - rep(y).elt]
        x = 0 => -y
        y = 0 => x
        error "not same type"

      d * x == per [rep(x).ind, d* rep(x).elt]

    if S has OrderedAbelianMonoidSup then
      sup(x,y) ==
        rep(x).ind = rep(y).ind => per [rep(x).ind, sup(rep(x).elt,rep(y).elt)]
        rep(x).ind < rep(y).ind => y
        x
    if S has OrderedSet then
      x < y ==
        rep(x).ind = rep(y).ind => rep(x).elt < rep(y).elt
        rep(x).ind < rep(y).ind

spad

   Compiling FriCAS source code from file 
      /var/lib/zope2.10/instance/axiom-wiki/var/LatexWiki/2750494589739067594-25px003.spad
      using old system compiler.
   COT abbreviates domain CoTuple 
------------------------------------------------------------------------
   initializing NRLIB COT for CoTuple 
   compiling into NRLIB COT 
   processing macro definition Rep ==> Record(ind: NonNegativeInteger,elt: S) 
   processing macro definition rep x ==> pretend(@(x,$),Record(ind: NonNegativeInteger,elt: S)) 
   processing macro definition per x ==> pretend(@(x,Record(ind: NonNegativeInteger,elt: S)),$) 
   compiling exported coerce : $ -> S
      COT;coerce;$S;1 is replaced by QCDR 
Time: 0.01 SEC.

   compiling exported inj : (NonNegativeInteger,S) -> $
      COT;inj;NniS$;2 is replaced by CONS 
Time: 0 SEC.

   compiling exported ind : $ -> NonNegativeInteger
      COT;ind;$Nni;3 is replaced by QCAR 
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (SetCategory)
   compiling exported = : ($,$) -> Boolean
Time: 0 SEC.

   compiling exported coerce : $ -> OutputForm
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (Monoid)
   compiling exported One : () -> $
Time: 0 SEC.

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

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

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

****** Domain: S already in scope
augmenting S: (AbelianMonoid)
   compiling exported Zero : () -> $
Time: 0 SEC.

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

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

****** Domain: S already in scope
augmenting S: (AbelianGroup)
   compiling exported - : $ -> $
Time: 0 SEC.

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

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

****** Domain: S already in scope
augmenting S: (OrderedAbelianMonoidSup)
   compiling exported sup : ($,$) -> $
Time: 0.01 SEC.

****** Domain: S already in scope
augmenting S: (OrderedSet)
   compiling exported < : ($,$) -> Boolean
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (AbelianGroup)
****** Domain: S already in scope
augmenting S: (AbelianMonoid)
****** Domain: S already in scope
augmenting S: (CancellationAbelianMonoid)
****** Domain: S already in scope
augmenting S: (Group)
****** Domain: S already in scope
augmenting S: (Monoid)
****** Domain: S already in scope
augmenting S: (OrderedAbelianMonoidSup)
****** Domain: S already in scope
augmenting S: (OrderedSet)
****** Domain: S already in scope
augmenting S: (SetCategory)
(time taken in buildFunctor:  10)

;;;     ***       |CoTuple| REDEFINED

;;;     ***       |CoTuple| REDEFINED
Time: 0.01 SEC.

   Cumulative Statistics for Constructor CoTuple
      Time: 0.03 seconds

   finalizing NRLIB COT 
   Processing CoTuple for Browser database:
--------constructor---------
--------(inj (% (NonNegativeInteger) S))---------
--->-->CoTuple((inj (% (NonNegativeInteger) S))): Improper first word in comments: inject
"inject(\\spad{x},{}\\spad{n}) returns \\spad{x} as an element of the \\spad{n}-th component of the CoTuple. CoTuples are 0-based"
--------(ind ((NonNegativeInteger) %))---------
--->-->CoTuple((ind ((NonNegativeInteger) %))): Improper first word in comments: index
"index(\\spad{x}) returns the component number of \\spad{x} in the CoTuple"
; compiling file "/var/aw/var/LatexWiki/COT.NRLIB/COT.lsp" (written 04 APR 2022 06:58:01 PM):

; /var/aw/var/LatexWiki/COT.NRLIB/COT.fasl written
; compilation finished in 0:00:00.052
------------------------------------------------------------------------
   CoTuple is now explicitly exposed in frame initial 
   CoTuple will be automatically loaded when needed from 
      /var/aw/var/LatexWiki/COT.NRLIB/COT

fricas

inj(1,10)

$\label{eq1}{10}_{1}$

(1)

Type: CoTuple?(PositiveInteger?)

fricas

inj(1,10) < inj(2,10)

$\label{eq2} \mbox{\rm true}$

(2)

Type: Boolean

fricas

sup(inj(1,99), inj(2,10))$CoTuple(NNI)

$\label{eq3}{10}_{2}$

(3)

Type: CoTuple?(NonNegativeInteger?)

The DirectSum? domain constructor implements an associative (flat) DirectSum? domain that is the dual to DirectProduct?.

spad

)abbrev domain DIRSUM DirectSum
++ This domain is intended to be the categorical dual of
++ DirectProduct (comma-delimited homogeneous sequence of
++ values). As such it implements an n-ary disjoint union.
DirectSum(S:Type): Type with
    coerce: S -> %
      ++ any type is a 1-ary union
    inj: (NonNegativeInteger,NonNegativeInteger,%) -> %
      ++ inject(i,n,x) injects the m-CoTuple element x as the
      ++ (m + i)-th component of the (n+m)-CoTuple.
    ind: % -> NonNegativeInteger
      ++ index(x) returns the component number of x in the CoTuple
    len: % -> NonNegativeInteger
      ++ len(x) returns the number of components
    if S has Monoid then Monoid
    if S has AbelianMonoid then AbelianMonoid
    if S has CancellationAbelianMonoid then CancellationAbelianMonoid
    if S has Group then Group
    if S has AbelianGroup then  AbelianGroup
    if S has OrderedAbelianMonoidSup then OrderedAbelianMonoidSup
    if S has SetCategory then SetCategory
    if S has OrderedSet then OrderedSet
  == add
    Rep ==> Record(ind : NonNegativeInteger, len : NonNegativeInteger, elt : S)
    rep x ==> (x@%) pretend Rep
    per x ==> (x@Rep) pretend %
    --declarations
    x,y: %
    s: S
    i: NonNegativeInteger
    p: NonNegativeInteger
    c: PositiveInteger
    d: Integer

    coerce(s:S):% == per [0,0,s]
    inj(i,n,x) ==
      i < n => per [rep(x).len+i,rep(x).len+n,rep(x).elt]
      error "index out of bounds"
    ind(x) == rep(x).ind
    len(x) == rep(x).len

    if S has SetCategory then
      x = y == (rep(x).ind = rep(y).ind) and (rep(x).elt = rep(y).elt)
      coerce(x : %): OutputForm == sub(coerce(rep(x).elt),coerce(rep(x).ind))
    if S has Monoid then
      -- represent unit of CoTuple(S) as 1$S of component 0
      1 == per [0,0,1]
      x * y ==
        rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).len, rep(x).elt * rep(y).elt]
        x = 1 => y
        y = 1 => x
        error "not same type"
      x ^ p == per [rep(x).ind, rep(x).len, rep(x).elt ^ p]

    if S has Group then
       inv(x) == per [rep(x).ind, rep(x).len, inv(rep(x).elt)]

    if S has AbelianMonoid then
       -- represent zero of Sum(A,B) as 0$S
       0 == per [0,0,0]
       x + y ==
         rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).len, rep(x).elt + rep(y).elt]
         x = 0 => y
         y = 0 => x
         error "not same type"
       c * x == per [rep(x).ind, rep(x).len, c * rep(x).elt]

    if S has AbelianGroup then
      - x == per [rep(x).ind, rep(x).len, -rep(x).elt]
      (x - y):% ==
        rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).len, rep(x).elt - rep(y).elt]
        x = 0 => -y
        y = 0 => x
        error "not same type"

      d * x == per [rep(x).ind, rep(x).len, d* rep(x).elt]

    if S has OrderedAbelianMonoidSup then
      sup(x,y) ==
        rep(x).ind = rep(y).ind => per [rep(x).ind, rep(x).len, sup(rep(x).elt,rep(y).elt)]
        rep(x).ind < rep(y).ind => y
        x
    if S has OrderedSet then
      x < y ==
        rep(x).ind = rep(y).ind => rep(x).elt < rep(y).elt
        rep(x).ind < rep(y).ind

spad

   Compiling FriCAS source code from file 
      /var/lib/zope2.10/instance/axiom-wiki/var/LatexWiki/5742852776520408994-25px005.spad
      using old system compiler.
   DIRSUM abbreviates domain DirectSum 
------------------------------------------------------------------------
   initializing NRLIB DIRSUM for DirectSum 
   compiling into NRLIB DIRSUM 
   processing macro definition Rep ==> Record(ind: NonNegativeInteger,len: NonNegativeInteger,elt: S) 
   processing macro definition rep x ==> pretend(@(x,$),Record(ind: NonNegativeInteger,len: NonNegativeInteger,elt: S)) 
   processing macro definition per x ==> pretend(@(x,Record(ind: NonNegativeInteger,len: NonNegativeInteger,elt: S)),$) 
   compiling exported coerce : S -> $
      DIRSUM;coerce;S$;1 is replaced by VECTOR00s 
Time: 0 SEC.

   compiling exported inj : (NonNegativeInteger,NonNegativeInteger,$) -> $
Time: 0.01 SEC.

   compiling exported ind : $ -> NonNegativeInteger
      DIRSUM;ind;$Nni;3 is replaced by QVELTx0 
Time: 0 SEC.

   compiling exported len : $ -> NonNegativeInteger
      DIRSUM;len;$Nni;4 is replaced by QVELTx1 
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (SetCategory)
   compiling exported = : ($,$) -> Boolean
Time: 0 SEC.

   compiling exported coerce : $ -> OutputForm
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (Monoid)
   compiling exported One : () -> $
Time: 0 SEC.

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

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

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

****** Domain: S already in scope
augmenting S: (AbelianMonoid)
   compiling exported Zero : () -> $
Time: 0 SEC.

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

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

****** Domain: S already in scope
augmenting S: (AbelianGroup)
   compiling exported - : $ -> $
Time: 0 SEC.

   compiling exported - : ($,$) -> $
Time: 0.01 SEC.

   compiling exported * : (Integer,$) -> $
Time: 0.01 SEC.

****** Domain: S already in scope
augmenting S: (OrderedAbelianMonoidSup)
   compiling exported sup : ($,$) -> $
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (OrderedSet)
   compiling exported < : ($,$) -> Boolean
Time: 0 SEC.

****** Domain: S already in scope
augmenting S: (AbelianGroup)
****** Domain: S already in scope
augmenting S: (AbelianMonoid)
****** Domain: S already in scope
augmenting S: (CancellationAbelianMonoid)
****** Domain: S already in scope
augmenting S: (Group)
****** Domain: S already in scope
augmenting S: (Monoid)
****** Domain: S already in scope
augmenting S: (OrderedAbelianMonoidSup)
****** Domain: S already in scope
augmenting S: (OrderedSet)
****** Domain: S already in scope
augmenting S: (SetCategory)
(time taken in buildFunctor:  10)

;;;     ***       |DirectSum| REDEFINED

;;;     ***       |DirectSum| REDEFINED
Time: 0.01 SEC.

   Cumulative Statistics for Constructor DirectSum
      Time: 0.04 seconds

   finalizing NRLIB DIRSUM 
   Processing DirectSum for Browser database:
--------constructor---------
--------(coerce (% S))---------
--->-->DirectSum((coerce (% S))): Improper first word in comments: any
"any type is a 1-ary union"
--------(inj (% (NonNegativeInteger) (NonNegativeInteger) %))---------
--->-->DirectSum((inj (% (NonNegativeInteger) (NonNegativeInteger) %))): Improper first word in comments: inject
"inject(\\spad{i},{}\\spad{n},{}\\spad{x}) injects the \\spad{m}-CoTuple element \\spad{x} as the (\\spad{m} + \\spad{i})\\spad{-}th component of the (\\spad{n+m})-CoTuple."
--------(ind ((NonNegativeInteger) %))---------
--->-->DirectSum((ind ((NonNegativeInteger) %))): Improper first word in comments: index
"index(\\spad{x}) returns the component number of \\spad{x} in the CoTuple"
--------(len ((NonNegativeInteger) %))---------
; compiling file "/var/aw/var/LatexWiki/DIRSUM.NRLIB/DIRSUM.lsp" (written 04 APR 2022 06:58:01 PM):

; /var/aw/var/LatexWiki/DIRSUM.NRLIB/DIRSUM.fasl written
; compilation finished in 0:00:00.067
------------------------------------------------------------------------
   DirectSum is now explicitly exposed in frame initial 
   DirectSum will be automatically loaded when needed from 
      /var/aw/var/LatexWiki/DIRSUM.NRLIB/DIRSUM

fricas

inj(0,2,10)

$\label{eq4}{10}_{0}$

(4)

Type: DirectSum?(Integer)

fricas

inj(0,2,10) < inj(1,2,10)

$\label{eq5} \mbox{\rm true}$

(5)

Type: Boolean

fricas

sup(inj(0,2,99), inj(1,2,10))$DirectSum(NNI)

$\label{eq6}{10}_{1}$

(6)

Type: DirectSum?(NonNegativeInteger?)

fricas

a0:=inj(0,2,'a)

$\label{eq7}a_{0}$

(7)

Type: DirectSum?(Polynomial(Integer))

fricas

len(a0)

$\label{eq8}2$

(8)

Type: PositiveInteger?

fricas

b1:=inj(1,2,'b)

$\label{eq9}b_{1}$

(9)

Type: DirectSum?(Polynomial(Integer))

fricas

len(b1)

$\label{eq10}2$

(10)

Type: PositiveInteger?

fricas

a2:=inj(0,2,inj(0,2,'aa))

$\label{eq11}aa_{2}$

(11)

Type: DirectSum?(Polynomial(Integer))

fricas

len(a2)

$\label{eq12}4$

(12)

Type: PositiveInteger?

fricas

a3:=inj(1,2,inj(0,2,'ba))

$\label{eq13}ba_{3}$

(13)

Type: DirectSum?(Polynomial(Integer))

fricas

len(a3)

$\label{eq14}4$

(14)

Type: PositiveInteger?

fricas

b2:=inj(0,2,inj(1,2,'ab))

$\label{eq15}ab_{2}$

(15)

Type: DirectSum?(Polynomial(Integer))

fricas

len(b2)

$\label{eq16}4$

(16)

Type: PositiveInteger?

fricas

b3:=inj(1,2,inj(1,2,'bb))

$\label{eq17}bb_{3}$

(17)

Type: DirectSum?(Polynomial(Integer))

fricas

len(b3)

$\label{eq18}4$

(18)

Type: PositiveInteger?

fricas

inj(2,3,b3)

$\label{eq19}bb_{6}$

(19)

Type: DirectSum?(Polynomial(Integer))