The problems comes from `val p = a*b`

If you write the simpler

for (a <- Right(4).right; b <- Right(5).right) yield a*b

it compiles and you get the proper result.

Your problem has two causes

First, the `Either`

projections `map`

and `flatMap`

do not have the usual signature , namely for routines map and flatMap defined in a generic class `M[A]`

, `(A => B) => M[B]`

and `(A => M[B]) => M[B]`

. The `M[A]`

the routine are defined in is `Either[A,B].RightProjection`

, but in results and argument, we have `Either[A,B]`

and not the projection.

Second, the way `val p = a*b`

in the for comprehension is translated. Scala Reference, 6.19 p 90:

A generator p <- e followed by a value definition p′ = e′ is
translated to the following generator of pairs of values, where x and
x′ are fresh names:

```
(p,p′) <- for(x@p<-e) yield {val x′@p′ = e′; (x,x′)}
```

Let's simplify the code just a little bit, dropping the `a <-`

. Also, `b`

and `p`

renamed to `p`

and `pp`

to be closer to the rewrite rule, with `pp`

for `p'`

. `a`

supposed to be in scope
for(p <- Right(5).right; val pp = a*p) yield pp

following the rule, we have to replace the generator + definition. What is around that, `for(`

and `)yield pp`

, unchanged.

```
for((p, pp) <- for(x@p <- Right(5).right) yield{val xx@pp = a*p; (x,xx)}) yield pp
```

The inner for is rewritten to a simple map

```
for((p, pp) <- Right(5).right.map{case x@p => val xx@pp = a*p; (x,xx)}) yield pp
```

Here is the problem. The `Right(5).right.map(...)`

is of type `Either[Nothing, (Int,Int)]`

, not `Either.RightProjection[Nothing, (Int,Int)]`

as we would want. It does not work in the outer for (which converts to a `map`

too. There is no `map`

method on `Either`

, it is defined on projections only.

If you look closely at your error message, it says so, even if it mentions `Product`

and `Serializable`

, it says that it is an `Either[Nothing, (Int, Int)]`

, and that no map is defined on it. The pair `(Int, Int)`

comes directly from the rewrite rule.

The for comprehension is intended to work well when respecting the proper signature. With the trick with `Either`

projections (which has its advantages too), we get this problem.