# OneDimensionalArray SΒΆ

array1.spad line 439 [edit on github]

S: Type

This is the domain of 1-based one dimensional arrays

- #: % -> NonNegativeInteger
from Aggregate

- <=: (%, %) -> Boolean if S has OrderedSet
from PartialOrder

- <: (%, %) -> Boolean if S has OrderedSet
from PartialOrder

- >=: (%, %) -> Boolean if S has OrderedSet
from PartialOrder

- >: (%, %) -> Boolean if S has OrderedSet
from PartialOrder

- any?: (S -> Boolean, %) -> Boolean
from HomogeneousAggregate S

- coerce: % -> OutputForm if S has CoercibleTo OutputForm
from CoercibleTo OutputForm

- concat: (%, %) -> %
from LinearAggregate S

- concat: (%, S) -> %
from LinearAggregate S

- concat: (S, %) -> %
from LinearAggregate S

- concat: List % -> %
from LinearAggregate S

- construct: List S -> %
from Collection S

- convert: % -> InputForm if S has ConvertibleTo InputForm
from ConvertibleTo InputForm

- copyInto!: (%, %, Integer) -> %
from LinearAggregate S

- count: (S -> Boolean, %) -> NonNegativeInteger
from HomogeneousAggregate S

- count: (S, %) -> NonNegativeInteger if S has BasicType
from HomogeneousAggregate S

- delete: (%, Integer) -> %
from LinearAggregate S

- delete: (%, UniversalSegment Integer) -> %
from LinearAggregate S

- elt: (%, Integer) -> S
- elt: (%, Integer, S) -> S
from EltableAggregate(Integer, S)

- elt: (%, UniversalSegment Integer) -> %
from Eltable(UniversalSegment Integer, %)

- entries: % -> List S
from IndexedAggregate(Integer, S)

- entry?: (S, %) -> Boolean if S has BasicType
from IndexedAggregate(Integer, S)

- eval: (%, Equation S) -> % if S has Evalable S and S has SetCategory
from Evalable S

- eval: (%, List Equation S) -> % if S has Evalable S and S has SetCategory
from Evalable S

- eval: (%, List S, List S) -> % if S has Evalable S and S has SetCategory
from InnerEvalable(S, S)

- eval: (%, S, S) -> % if S has Evalable S and S has SetCategory
from InnerEvalable(S, S)

- every?: (S -> Boolean, %) -> Boolean
from HomogeneousAggregate S

- fill!: (%, S) -> %
from IndexedAggregate(Integer, S)

- find: (S -> Boolean, %) -> Union(S, failed)
from Collection S

- first: % -> S
from IndexedAggregate(Integer, S)

- first: (%, NonNegativeInteger) -> %
from LinearAggregate S

- hash: % -> SingleInteger if S has Hashable
from Hashable

- hashUpdate!: (HashState, %) -> HashState if S has Hashable
from Hashable

- index?: (Integer, %) -> Boolean
from IndexedAggregate(Integer, S)

- indices: % -> List Integer
from IndexedAggregate(Integer, S)

- insert: (%, %, Integer) -> %
from LinearAggregate S

- insert: (S, %, Integer) -> %
from LinearAggregate S

- latex: % -> String if S has SetCategory
from SetCategory

- leftTrim: (%, S) -> % if S has BasicType
from LinearAggregate S

- less?: (%, NonNegativeInteger) -> Boolean
from Aggregate

- map!: (S -> S, %) -> %
from HomogeneousAggregate S

- map: ((S, S) -> S, %, %) -> %
from LinearAggregate S

- map: (S -> S, %) -> %
from HomogeneousAggregate S

- max: % -> S if S has OrderedSet
from HomogeneousAggregate S

- max: (%, %) -> % if S has OrderedSet
from OrderedSet

- max: ((S, S) -> Boolean, %) -> S
from HomogeneousAggregate S

- maxIndex: % -> Integer
from IndexedAggregate(Integer, S)

- member?: (S, %) -> Boolean if S has BasicType
from HomogeneousAggregate S

- members: % -> List S
from HomogeneousAggregate S

- merge: (%, %) -> % if S has OrderedSet
from LinearAggregate S

- merge: ((S, S) -> Boolean, %, %) -> %
from LinearAggregate S

- min: % -> S if S has OrderedSet
from HomogeneousAggregate S

- min: (%, %) -> % if S has OrderedSet
from OrderedSet

- minIndex: % -> Integer
from IndexedAggregate(Integer, S)

- more?: (%, NonNegativeInteger) -> Boolean
from Aggregate

- new: (NonNegativeInteger, S) -> %
from LinearAggregate S

- oneDimensionalArray: (NonNegativeInteger, S) -> %
`oneDimensionalArray(n, s)`

creates an array from`n`

copies of element`s`

- oneDimensionalArray: List S -> %
`oneDimensionalArray(l)`

creates an array from a list of elements`l`

- parts: % -> List S
from HomogeneousAggregate S

- position: (S -> Boolean, %) -> Integer
from LinearAggregate S

- position: (S, %) -> Integer if S has BasicType
from LinearAggregate S

- position: (S, %, Integer) -> Integer if S has BasicType
from LinearAggregate S

- qelt: (%, Integer) -> S
from EltableAggregate(Integer, S)

- qsetelt!: (%, Integer, S) -> S
from EltableAggregate(Integer, S)

- reduce: ((S, S) -> S, %) -> S
from Collection S

- reduce: ((S, S) -> S, %, S) -> S
from Collection S

- reduce: ((S, S) -> S, %, S, S) -> S if S has BasicType
from Collection S

- remove: (S -> Boolean, %) -> %
from Collection S

- remove: (S, %) -> % if S has BasicType
from Collection S

- removeDuplicates: % -> % if S has BasicType
from Collection S

- reverse!: % -> %
from LinearAggregate S

- reverse: % -> %
from LinearAggregate S

- rightTrim: (%, S) -> % if S has BasicType
from LinearAggregate S

- select: (S -> Boolean, %) -> %
from Collection S

- setelt!: (%, Integer, S) -> S
from EltableAggregate(Integer, S)

- setelt!: (%, UniversalSegment Integer, S) -> S
from LinearAggregate S

- size?: (%, NonNegativeInteger) -> Boolean
from Aggregate

- smaller?: (%, %) -> Boolean if S has Comparable
from Comparable

- sort!: % -> % if S has OrderedSet
from LinearAggregate S

- sort!: ((S, S) -> Boolean, %) -> %
from LinearAggregate S

- sort: % -> % if S has OrderedSet
from LinearAggregate S

- sort: ((S, S) -> Boolean, %) -> %
from LinearAggregate S

- sorted?: % -> Boolean if S has OrderedSet
from LinearAggregate S

- sorted?: ((S, S) -> Boolean, %) -> Boolean
from LinearAggregate S

- trim: (%, S) -> % if S has BasicType
from LinearAggregate S

CoercibleTo OutputForm if S has CoercibleTo OutputForm

Comparable if S has Comparable

ConvertibleTo InputForm if S has ConvertibleTo InputForm

Eltable(UniversalSegment Integer, %)

Evalable S if S has Evalable S and S has SetCategory

InnerEvalable(S, S) if S has Evalable S and S has SetCategory

OneDimensionalArrayAggregate S

OrderedSet if S has OrderedSet

PartialOrder if S has OrderedSet

SetCategory if S has SetCategory