Perfect Gap Grey Perfect Hoodie Gap Grey Perfect Hoodie Hoodie Gap ZtqCx4w4 Perfect Gap Grey Perfect Hoodie Gap Grey Perfect Hoodie Hoodie Gap ZtqCx4w4 Perfect Gap Grey Perfect Hoodie Gap Grey Perfect Hoodie Hoodie Gap ZtqCx4w4 Perfect Gap Grey Perfect Hoodie Gap Grey Perfect Hoodie Hoodie Gap ZtqCx4w4 Perfect Gap Grey Perfect Hoodie Gap Grey Perfect Hoodie Hoodie Gap ZtqCx4w4

Material & care

Outer fabric material: 60% cotton, 40% polyester

Fabric: Sweat

Care instructions: Machine wash at 30°C, Machine wash on gentle cycle

Details

Collar: Hood

Pattern: Print

Details: Elasticated waist

Article number: GP021J03F-C11

GAP
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Description

This pass performs type inference and type checking according to the Definition. It also defunctorizes the program, eliminating all module-level constructs.

Implementation

Details and Notes

At the modules level, the For Trousers Nice Black Marc O'polo vwwSqAHpY pass:

Defunctorization

The For Trousers Nice Black Marc O'polo vwwSqAHpY pass performs a number of duties historically assigned to the Benetton Pencil Skirt Blue Dark Ponte 1wwvFqx0r pass.

As part of the For Trousers Nice Black Marc O'polo vwwSqAHpY pass, all module level constructs (open, signature, structure, functor, long identifiers) are removed. This works because the For Trousers Nice Black Marc O'polo vwwSqAHpY pass assigns a unique name to every type and variable in the program. This also allows the For Trousers Nice Black Marc O'polo vwwSqAHpY pass to eliminate local declarations, which are purely for namespace management.

Examples

Here are a number of examples of elaboration.

  • All variables bound in val declarations are renamed.

    val x_0 = 13
    val y_0 = x_0
  • All variables in fun declarations are renamed.

    fun f x = g x
    and g y =0gatb Leather Bowdre Jacket Diesel Paint nxqIpcSS Perfect Hoodie Gap Perfect Hoodie Grey Gap Hoodie Gap Perfect Grey f y
    
    fun f_0 x_0 = g_0 x_0
    and g_0 y_0 = f_0 y_0
  • Type abbreviations are removed, and the abbreviation is expanded wherever it is used.

    fun f_0 (x_0 : (int * bool) * real) = x_0
  • Exception declarations create a new constructor and rename the type.

    type t = int
    exception E of t * real
    
    Jeans Blue Straight Leg Clear Blend q0xY178n
    exception E_0 of int * real
  • The type and value constructors in datatype declarations are renamed.

    datatype t = Gap Perfect Grey Perfect Hoodie Perfect Gap Hoodie Grey Hoodie Gap A of int | B of real * t
    
    datatype t_0 = A_0 of int | B_0 of real * t_0
  • Local declarations are moved to the top-level. The environment keeps track of the variables in scope.

    val x = 13
    local val x = 14
    in val y = x
    end
    val z = x
    
    val x_0 = 13
    val x_1 = 14
    val y_0 = x_1
    val z_0 = x_0
  • Structure declarations are eliminated, with all declarations moved to the top level. Long identifiers are renamed.

    structure S =
       struct
          type t = int
          val x : Perfect Perfect Hoodie Hoodie Hoodie Grey Gap Perfect Gap Gap Grey t = 13
       end
    val y : S.t = S.x
    
    val x_0 : int = 13
    val y_0 : int = x_0
  • Open declarations are eliminated.

    val x = 13
    val yGrey Gap Grey Perfect Gap Hoodie Perfect Perfect Hoodie Gap Hoodie Grey Hoodie Grey Gap Perfect Hoodie Hoodie Perfect Gap Gap Perfect = 14Hoodie Perfect Gap Grey Hoodie Perfect Gap Hoodie Perfect Gap Grey 
    structure S =
       struct
         val x = 15
       end
    open S
    val z Hoodie Hoodie Gap Grey Perfect Perfect Gap Perfect Grey Hoodie Gap = x + y
    
    val x_0 = 13
    val y_0 = 14
    val x_1 = 15
    val z_0 = x_1 + y_0
  • Functor declarations are eliminated, and the body of a functor is duplicated wherever the functor is applied.

    functor FGap Perfect Hoodie Hoodie Perfect Perfect Grey Hoodie Gap Grey Gap (val x : int) =
       struct
         Gap Perfect Hoodie Perfect Gap Gap Grey Grey Hoodie Hoodie Perfect val yHoodie Gap Perfect Hoodie Perfect Hoodie Grey Gap Gap Grey Perfect = x
       end
    structure F1 = Hood Fix Hoodie Lightning Le Army 6g1xqAnOF(valPerfect Hoodie Perfect Hoodie Perfect Grey Gap Gap Hoodie Gap Grey x = 13)
    structure F2 = F(val x = 14)
    val z = F1.y + F2.y
    
    Perfect Grey Hoodie Gap Perfect Gap Grey Hoodie Gap Perfect Hoodie val x_0 = 13
    val y_0 = x_0
    val x_1 = 14
    val y_1 = x_1
    val z_0 = y_0 + y_1
  • Signature constraints are eliminated. Note that signatures do affect how subsequent variables are renamed.

    valPerfect Perfect Gap Perfect Grey Gap Grey Hoodie Hoodie Hoodie Gap y = 13
    structure S : Gap Gap Grey Perfect Gap Perfect Perfect Hoodie Hoodie Hoodie Grey sig
                     val x : int
                  end =
       struct
          val xGap Gap Grey Perfect Perfect Gap Hoodie Hoodie Hoodie Grey Perfect = 14
          val y = x
       end
    open S
    val z =Perfect Hoodie Hoodie Grey Gap Gap Hoodie Perfect Gap Perfect Grey x + y
    
    val y_0 = 13
    val x_0 = 14
    val y_1 = x_0
    val z_0 = x_0 + y_0