I'm using F# to create a lambda calculus. I am currently stuck trying to figure out how I would implement the fixed-point operator (also called Y combinator).

I think everything else is in order. Expressions are represented by the following discriminated union:

```
type Expr =
| Const of int
| Plus of Expr * Expr
| Times of Expr * Expr
| Minus of Expr * Expr
| Div of Expr * Expr
| Neg of Expr
| Var of string
| Fun of string * Expr
| App of Expr * Expr
| If of Expr * Expr * Expr
```

My `eval`

function seems to work. The following examples all yield the expected results.

example 1:

`> eval (Fun("x",Plus(Const 7,Var("x"))));;`

`val it : Expr = Fun ("x",Plus (Const 7,Var "x"))`

example 2:

`> eval (App(Fun("x",Plus(Const 7,Var("x"))),Const 3));;`

`val it : Expr = Const 10`

example 3:

`> eval (If(Const 0,Const 3,Const 4));;`

`val it : Expr = Const 4`

But as I mentioned, I'm having difficulty implementing the fixed-point operator within my lambda calculus. It is defined here as:

`Y = lambda G. (lambda g. G(g g)) (lambda g. G(g g))`

Does anyone have any suggestions? I've looked at other questions regarding the Y combinator, but couldn't find anything that I was able to successfully adopt.

All help is appreciated.

**Edit:** Fixed a typo in the code... previously I had `Mult`

instead of `Minus`

in the discriminated union. Funny that I just noticed that!