Constructors
Constructors [1] are functions that create new objects – specifically, instances of Composite Types. In Julia, type objects also serve as constructor functions: they create new instances of themselves when applied to an argument tuple as a function. This much was already mentioned briefly when composite types were introduced. For example:
julia> struct Foo
bar
baz
end
julia> foo = Foo(1, 2)
Foo(1, 2)
julia> foo.bar
1
julia> foo.baz
2
For many types, forming new objects by binding their field values together is all that is ever needed to create instances. However, in some cases more functionality is required when creating composite objects. Sometimes invariants must be enforced, either by checking arguments or by transforming them. Recursive data structures, especially those that may be self-referential, often cannot be constructed cleanly without first being created in an incomplete state and then altered programmatically to be made whole, as a separate step from object creation. Sometimes, it’s just convenient to be able to construct objects with fewer or different types of parameters than they have fields. Julia’s system for object construction addresses all of these cases and more.
Outer Constructor Methods
A constructor is just like any other function in Julia in that its overall behavior is defined by the combined behavior of its methods. Accordingly, you can add functionality to a constructor by simply defining new methods. For example, let’s say you want to add a constructor method for Foo
objects that takes only one argument and uses the given value for both the bar
and baz
fields. This is simple:
julia> Foo(x) = Foo(x,x)
Foo
julia> Foo(1)
Foo(1, 1)
You could also add a zero-argument Foo
constructor method that supplies default values for both of the bar
and baz
fields:
julia> Foo() = Foo(0)
Foo
julia> Foo()
Foo(0, 0)
Here the zero-argument constructor method calls the single-argument constructor method, which in turn calls the automatically provided two-argument constructor method. For reasons that will become clear very shortly, additional constructor methods declared as normal methods like this are called outer constructor methods. Outer constructor methods can only ever create a new instance by calling another constructor method, such as the automatically provided default ones.
Inner Constructor Methods
While outer constructor methods succeed in addressing the problem of providing additional convenience methods for constructing objects, they fail to address the other two use cases mentioned in the introduction of this chapter: enforcing invariants, and allowing construction of self-referential objects. For these problems, one needs inner constructor methods. An inner constructor method is like an outer constructor method, except for two differences:
- It is declared inside the block of a type declaration, rather than outside of it like normal methods.
- It has access to a special locally existent function called
new
that creates objects of the block’s type.
For example, suppose one wants to declare a type that holds a pair of real numbers, subject to the constraint that the first number is not greater than the second one. One could declare it like this:
julia> struct OrderedPair
x::Real
y::Real
OrderedPair(x,y) = x > y ? error("out of order") : new(x,y)
end
Now OrderedPair
objects can only be constructed such that x <= y
:
julia> OrderedPair(1, 2)
OrderedPair(1, 2)
julia> OrderedPair(2,1)
ERROR: out of order
Stacktrace:
[1] error at ./error.jl:33 [inlined]
[2] OrderedPair(::Int64, ::Int64) at ./none:4
[3] top-level scope
If the type were declared mutable
, you could reach in and directly change the field values to violate this invariant. Of course, messing around with an object’s internals uninvited is bad practice. You (or someone else) can also provide additional outer constructor methods at any later point, but once a type is declared, there is no way to add more inner constructor methods. Since outer constructor methods can only create objects by calling other constructor methods, ultimately, some inner constructor must be called to create an object. This guarantees that all objects of the declared type must come into existence by a call to one of the inner constructor methods provided with the type, thereby giving some degree of enforcement of a type’s invariants.
If any inner constructor method is defined, no default constructor method is provided: it is presumed that you have supplied yourself with all the inner constructors you need. The default constructor is equivalent to writing your own inner constructor method that takes all of the object’s fields as parameters (constrained to be of the correct type, if the corresponding field has a type), and passes them to new
, returning the resulting object:
julia> struct Foo
bar
baz
Foo(bar,baz) = new(bar,baz)
end
This declaration has the same effect as the earlier definition of the Foo
type without an explicit inner constructor method. The following two types are equivalent – one with a default constructor, the other with an explicit constructor:
julia> struct T1
x::Int64
end
julia> struct T2
x::Int64
T2(x) = new(x)
end
julia> T1(1)
T1(1)
julia> T2(1)
T2(1)
julia> T1(1.0)
T1(1)
julia> T2(1.0)
T2(1)
It is good practice to provide as few inner constructor methods as possible: only those taking all arguments explicitly and enforcing essential error checking and transformation. Additional convenience constructor methods, supplying default values or auxiliary transformations, should be provided as outer constructors that call the inner constructors to do the heavy lifting. This separation is typically quite natural.
Incomplete Initialization
The final problem which has still not been addressed is construction of self-referential objects, or more generally, recursive data structures. Since the fundamental difficulty may not be immediately obvious, let us briefly explain it. Consider the following recursive type declaration:
julia> mutable struct SelfReferential
obj::SelfReferential
end
This type may appear innocuous enough, until one considers how to construct an instance of it. If a
is an instance of SelfReferential
, then a second instance can be created by the call:
julia> b = SelfReferential(a)
But how does one construct the first instance when no instance exists to provide as a valid value for its obj
field? The only solution is to allow creating an incompletely initialized instance of SelfReferential
with an unassigned obj
field, and using that incomplete instance as a valid value for the obj
field of another instance, such as, for example, itself.
To allow for the creation of incompletely initialized objects, Julia allows the new
function to be called with fewer than the number of fields that the type has, returning an object with the unspecified fields uninitialized. The inner constructor method can then use the incomplete object, finishing its initialization before returning it. Here, for example, is another attempt at defining the SelfReferential
type, this time using a zero-argument inner constructor returning instances having obj
fields pointing to themselves:
julia> mutable struct SelfReferential
obj::SelfReferential
SelfReferential() = (x = new(); x.obj = x)
end
We can verify that this constructor works and constructs objects that are, in fact, self-referential:
julia> x = SelfReferential();
julia> x === x
true
julia> x === x.obj
true
julia> x === x.obj.obj
true
Although it is generally a good idea to return a fully initialized object from an inner constructor, it is possible to return incompletely initialized objects:
julia> mutable struct Incomplete
data
Incomplete() = new()
end
julia> z = Incomplete();
While you are allowed to create objects with uninitialized fields, any access to an uninitialized reference is an immediate error:
julia> z.data
ERROR: UndefRefError: access to undefined reference
This avoids the need to continually check for null
values. However, not all object fields are references. Julia considers some types to be “plain data”, meaning all of their data is self-contained and does not reference other objects. The plain data types consist of primitive types (e.g. Int
) and immutable structs of other plain data types. The initial contents of a plain data type is undefined:
julia> struct HasPlain
n::Int
HasPlain() = new()
end
julia> HasPlain()
HasPlain(438103441441)
Arrays of plain data types exhibit the same behavior.
You can pass incomplete objects to other functions from inner constructors to delegate their completion:
julia> mutable struct Lazy
data
Lazy(v) = complete_me(new(), v)
end
As with incomplete objects returned from constructors, if complete_me
or any of its callees try to access the data
field of the Lazy
object before it has been initialized, an error will be thrown immediately.
Parametric Constructors
Parametric types add a few wrinkles to the constructor story. Recall from Parametric Types that, by default, instances of parametric composite types can be constructed either with explicitly given type parameters or with type parameters implied by the types of the arguments given to the constructor. Here are some examples:
julia> struct Point{T<:Real}
x::T
y::T
end
julia> Point(1,2) ## implicit T ##
Point{Int64}(1, 2)
julia> Point(1.0,2.5) ## implicit T ##
Point{Float64}(1.0, 2.5)
julia> Point(1,2.5) ## implicit T ##
ERROR: MethodError: no method matching Point(::Int64, ::Float64)
Closest candidates are:
Point(::T, ::T) where T<:Real at none:2
julia> Point{Int64}(1, 2) ## explicit T ##
Point{Int64}(1, 2)
julia> Point{Int64}(1.0,2.5) ## explicit T ##
ERROR: InexactError: Int64(2.5)
Stacktrace:
[...]
julia> Point{Float64}(1.0, 2.5) ## explicit T ##
Point{Float64}(1.0, 2.5)
julia> Point{Float64}(1,2) ## explicit T ##
Point{Float64}(1.0, 2.0)
As you can see, for constructor calls with explicit type parameters, the arguments are converted to the implied field types: Point{Int64}(1,2)
works, but Point{Int64}(1.0,2.5)
raises an InexactError
when converting 2.5
to Int64
. When the type is implied by the arguments to the constructor call, as in Point(1,2)
, then the types of the arguments must agree – otherwise the T
cannot be determined – but any pair of real arguments with matching type may be given to the generic Point
constructor.
What’s really going on here is that Point
, Point{Float64}
and Point{Int64}
are all different constructor functions. In fact, Point{T}
is a distinct constructor function for each type T
. Without any explicitly provided inner constructors, the declaration of the composite type Point{T<:Real}
automatically provides an inner constructor, Point{T}
, for each possible type T<:Real
, that behaves just like non-parametric default inner constructors do. It also provides a single general outer Point
constructor that takes pairs of real arguments, which must be of the same type. This automatic provision of constructors is equivalent to the following explicit declaration:
julia> struct Point{T<:Real}
x::T
y::T
Point{T}(x,y) where {T<:Real} = new(x,y)
end
julia> Point(x::T, y::T) where {T<:Real} = Point{T}(x,y);
Notice that each definition looks like the form of constructor call that it handles. The call Point{Int64}(1,2)
will invoke the definition Point{T}(x,y)
inside the struct
block. The outer constructor declaration, on the other hand, defines a method for the general Point
constructor which only applies to pairs of values of the same real type. This declaration makes constructor calls without explicit type parameters, like Point(1,2)
and Point(1.0,2.5)
, work. Since the method declaration restricts the arguments to being of the same type, calls like Point(1,2.5)
, with arguments of different types, result in “no method” errors.
Suppose we wanted to make the constructor call Point(1,2.5)
work by “promoting” the integer value 1
to the floating-point value 1.0
. The simplest way to achieve this is to define the following additional outer constructor method:
julia> Point(x::Int64, y::Float64) = Point(convert(Float64,x),y);
This method uses the convert
function to explicitly convert x
to Float64
and then delegates construction to the general constructor for the case where both arguments are Float64
. With this method definition what was previously a MethodError
now successfully creates a point of type Point{Float64}
:
julia> Point(1,2.5)
Point{Float64}(1.0, 2.5)
julia> typeof(ans)
Point{Float64}
However, other similar calls still don’t work:
julia> Point(1.5,2)
ERROR: MethodError: no method matching Point(::Float64, ::Int64)
Closest candidates are:
Point(::T, !Matched::T) where T<:Real at none:1
For a more general way to make all such calls work sensibly, see Conversion and Promotion. At the risk of spoiling the suspense, we can reveal here that all it takes is the following outer method definition to make all calls to the general Point
constructor work as one would expect:
julia> Point(x::Real, y::Real) = Point(promote(x,y)...);
The promote
function converts all its arguments to a common type – in this case Float64
. With this method definition, the Point
constructor promotes its arguments the same way that numeric operators like +
do, and works for all kinds of real numbers:
julia> Point(1.5,2)
Point{Float64}(1.5, 2.0)
julia> Point(1,1//2)
Point{Rational{Int64}}(1//1, 1//2)
julia> Point(1.0,1//2)
Point{Float64}(1.0, 0.5)
Thus, while the implicit type parameter constructors provided by default in Julia are fairly strict, it is possible to make them behave in a more relaxed but sensible manner quite easily. Moreover, since constructors can leverage all of the power of the type system, methods, and multiple dispatch, defining sophisticated behavior is typically quite simple.
Case Study: Rational
Perhaps the best way to tie all these pieces together is to present a real world example of a parametric composite type and its constructor methods. To that end, we implement our own rational number type OurRational
, similar to Julia’s built-in Rational
type, defined in rational.jl
:
julia> struct OurRational{T<:Integer} <: Real
num::T
den::T
function OurRational{T}(num::T, den::T) where T<:Integer
if num == 0 && den == 0
error("invalid rational: 0//0")
end
g = gcd(den, num)
num = div(num, g)
den = div(den, g)
new(num, den)
end
end
julia> OurRational(n::T, d::T) where {T<:Integer} = OurRational{T}(n,d)
OurRational
julia> OurRational(n::Integer, d::Integer) = OurRational(promote(n,d)...)
OurRational
julia> OurRational(n::Integer) = OurRational(n,one(n))
OurRational
julia> ⊘(n::Integer, d::Integer) = OurRational(n,d)
⊘ (generic function with 1 method)
julia> ⊘(x::OurRational, y::Integer) = x.num ⊘ (x.den*y)
⊘ (generic function with 2 methods)
julia> ⊘(x::Integer, y::OurRational) = (x*y.den) ⊘ y.num
⊘ (generic function with 3 methods)
julia> ⊘(x::Complex, y::Real) = complex(real(x) ⊘ y, imag(x) ⊘ y)
⊘ (generic function with 4 methods)
julia> ⊘(x::Real, y::Complex) = (x*y') ⊘ real(y*y')
⊘ (generic function with 5 methods)
julia> function ⊘(x::Complex, y::Complex)
xy = x*y'
yy = real(y*y')
complex(real(xy) ⊘ yy, imag(xy) ⊘ yy)
end
⊘ (generic function with 6 methods)
The first line – struct OurRational{T<:Integer} <: Real
– declares that OurRational
takes one type parameter of an integer type, and is itself a real type. The field declarations num::T
and den::T
indicate that the data held in a OurRational{T}
object are a pair of integers of type T
, one representing the rational value’s numerator and the other representing its denominator.
Now things get interesting. OurRational
has a single inner constructor method which checks that both of num
and den
aren’t zero and ensures that every rational is constructed in “lowest terms” with a non-negative denominator. This is accomplished by dividing the given numerator and denominator values by their greatest common divisor, computed using the gcd
function. Since gcd
returns the greatest common divisor of its arguments with sign matching the first argument (den
here), after this division the new value of den
is guaranteed to be non-negative. Because this is the only inner constructor for OurRational
, we can be certain that OurRational
objects are always constructed in this normalized form.
OurRational
also provides several outer constructor methods for convenience. The first is the “standard” general constructor that infers the type parameter T
from the type of the numerator and denominator when they have the same type. The second applies when the given numerator and denominator values have different types: it promotes them to a common type and then delegates construction to the outer constructor for arguments of matching type. The third outer constructor turns integer values into rationals by supplying a value of 1
as the denominator.
Following the outer constructor definitions, we defined a number of methods for the ⊘
operator, which provides a syntax for writing rationals (e.g. 1 ⊘ 2
). Julia’s Rational
type uses the //
operator for this purpose. Before these definitions, ⊘
is a completely undefined operator with only syntax and no meaning. Afterwards, it behaves just as described in Rational Numbers – its entire behavior is defined in these few lines. The first and most basic definition just makes a ⊘ b
construct a OurRational
by applying the OurRational
constructor to a
and b
when they are integers. When one of the operands of ⊘
is already a rational number, we construct a new rational for the resulting ratio slightly differently; this behavior is actually identical to division of a rational with an integer. Finally, applying ⊘
to complex integral values creates an instance of Complex{OurRational}
– a complex number whose real and imaginary parts are rationals:
julia> z = (1 + 2im) ⊘ (1 - 2im);
julia> typeof(z)
Complex{OurRational{Int64}}
julia> typeof(z) <: Complex{OurRational}
false
Thus, although the ⊘
operator usually returns an instance of OurRational
, if either of its arguments are complex integers, it will return an instance of Complex{OurRational}
instead. The interested reader should consider perusing the rest of rational.jl
: it is short, self-contained, and implements an entire basic Julia type.
Outer-only constructors
As we have seen, a typical parametric type has inner constructors that are called when type parameters are known; e.g. they apply to Point{Int}
but not to Point
. Optionally, outer constructors that determine type parameters automatically can be added, for example constructing a Point{Int}
from the call Point(1,2)
. Outer constructors call inner constructors to actually make instances. However, in some cases one would rather not provide inner constructors, so that specific type parameters cannot be requested manually.
For example, say we define a type that stores a vector along with an accurate representation of its sum:
julia> struct SummedArray{T<:Number,S<:Number}
data::Vector{T}
sum::S
end
julia> SummedArray(Int32[1; 2; 3], Int32(6))
SummedArray{Int32,Int32}(Int32[1, 2, 3], 6)
The problem is that we want S
to be a larger type than T
, so that we can sum many elements with less information loss. For example, when T
is Int32
, we would like S
to be Int64
. Therefore we want to avoid an interface that allows the user to construct instances of the type SummedArray{Int32,Int32}
. One way to do this is to provide a constructor only for SummedArray
, but inside the struct
definition block to suppress generation of default constructors:
julia> struct SummedArray{T<:Number,S<:Number}
data::Vector{T}
sum::S
function SummedArray(a::Vector{T}) where T
S = widen(T)
new{T,S}(a, sum(S, a))
end
end
julia> SummedArray(Int32[1; 2; 3], Int32(6))
ERROR: MethodError: no method matching SummedArray(::Array{Int32,1}, ::Int32)
Closest candidates are:
SummedArray(::Array{T,1}) where T at none:5
This constructor will be invoked by the syntax SummedArray(a)
. The syntax new{T,S}
allows specifying parameters for the type to be constructed, i.e. this call will return a SummedArray{T,S}
. new{T,S}
can be used in any constructor definition, but for convenience the parameters to new{}
are automatically derived from the type being constructed when possible.
- 1Nomenclature: while the term “constructor” generally refers to the entire function which constructs objects of a type, it is common to abuse terminology slightly and refer to specific constructor methods as “constructors”. In such situations, it is generally clear from the context that the term is used to mean “constructor method” rather than “constructor function”, especially as it is often used in the sense of singling out a particular method of the constructor from all of the others.