I want to define a function like this:

```
(define (((lift fn) . gs) . args)
(apply fn (map (lambda (g) (apply g args)) gs)))
```

This basically "lifts" a function `fn`

so that instead of accepting its normal arguments, it accepts *functions* and produces a new function. So, for example,

```
(define add (lift +))
(define sum-of-sin-and-cos (add sin cos))
(sum-of-sin-and-cos 5) ; is equivalent to (+ (sin 5) (cos 5))
(define sum-of-multiplication-and-division (add * /))
(sum-of-multiplication-and-division 1 2 3 4 5) ; is equivalent to (+ (* 1 2 3 4 5) (/ 1 2 3 4 5))
```

This works in plain Racket. Now, I want to move this function into typed racket. Here is the type declaration I came up with:

```
(: lift (All (A ... ) (All (B ...) (All (C)
((B ... B -> C) ->
((A -> B) ... B ->
(A ... B -> C)))))))
```

Here is what I *think* the definition says: For all types `A0`

, `A1`

, .. `An`

and `B0`

, `B1`

, ... `Bn`

, and `C`

:

`lift`

takes (a function of`B0`

,`B1`

, ...`Bn`

to`C`

) and produces:- a function of many functions (
`Ai`

to`Bi`

,`i`

from 0 to`n`

) which in turn produces: - a function of
`Ai`

,`i`

from 0 to`n`

, which in turn produces: - a
`C`

This doesn't work: in the last line `(A ... B -> C)`

I get `Type Checker: Type variable A must be used with ... in: A`

.

This isn't the first problem with ellipsis I've had while using Typed Racket, and I think it's really a case of fundamental misunderstanding of what the ellipsis is meant to do.

As a side note, if I try to collapse the `All`

clauses to a single one like this:

`(All (A ... B ... C) blah blah blah)`

then in the second line `((B ... B - C) ->`

I get the following error: `Type Checker: Used a type variable (B) not bound with ... as a bound on a ... in: B`

(referring to the second B on that line). I don't really understand that either.