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Jan
13
comment Is operational really isomorphic to a free monad?
@DanBurton Define run (Free ExitSuccess) = loop where loop = loop for example.
Jan
11
comment Is operational really isomorphic to a free monad?
I'm sure undefined can mess up the proof for TeletypeF as well, you just have to be a bit more devious.
Jan
10
comment Haskell - Is effect order deterministic in case of Applicative?
See hackage.haskell.org/packages/archive/transformers/0.3.0.0/doc/…, which is an applicative transformer that reverses the order of effects.
Jan
9
comment Display server time on client in Meteor
The down vote was mine from before you added the code, voted up now!
Jan
9
comment Display server time on client in Meteor
This code displays the client's time, not the server's.
Jan
4
comment Using constraint kinds and type families with 'limited' constraints
"UndecidableInstances is not a dangerous flag. It will never cause the type-checker to accept a program that `goes wrong.' The only bad consequence of using the flag is type checker's might be telling us that it cannot decide if our program is well-typed, given the context-stack--depth limit." okmij.org/ftp/Haskell/TypeClass.html#undecidable-inst-defense
Jan
1
comment Do Traversables really require to be traversed “left-to-right”?
fmap getCompose . traverse f . Compose is the same as traverse (traverse f), which does not do the zipping. You can use Compose, because the Applicative instance of Stream does the zipping, something like getCompose (traverse (Compose . traverse f) (Pair p q)), but you'd still need to unzip.
Jan
1
comment Do Traversables really require to be traversed “left-to-right”?
I'd probably write is as traverse f (U lstream focus rstream) = (\c (unzip -> (u,v)) -> U u c v) <$> f focus <*> traverse (both f) (zip lstream rstream), using ViewPatterns, and both from the lens package.
Dec
24
comment Counting different values using Data.Map leaks memory
You can try to import Data.Map.Strict instead of Data.Map.
Dec
24
comment Is there a way of deriving Binary instances for Vinyl record types using Derive and Template Haskell or otherwise
It should be possible to hand write the instances once for all Vinyl records, similar to how the Show instance is written.
Dec
23
comment Composition of two functors is a functor
You could use unsafeCoerce instead of arr, because Wrap and unWrap are no-ops...
Dec
20
comment Are there a thing call “semi-monad” or “counter-monad”?
dneg is also the counit (the arrow flips because the components of the counit are arrows in Hask^op). And the natural isomorphism required for an adjunction homC(F–,–) → homD(–,G–) is the identity because hom_(Hask^op)(a,b) = hom_Hask(b,a). So a Nomad is exactly "a contravariant functor which is self adjoint."
Dec
18
comment What are the adjoint functor pairs corresponding to common monads in Haskell?
And Cont r comes from the adjunction of the contravariant functor Op r : Hask^op --> Hask with itself, with Op r a = a -> r.
Dec
5
comment Partial application to precompute intermediary results
let r b c = let b2 = -.b /. 2.0 and z = b2 *. b2 in fun a -> (b2 +. sqrt (z-.a*.c))/.a
Dec
2
comment Instance show with Tree data structure
The braces are in the wrong place. Try show (Node (Tree l) (v) (Tree r)) = ...
Nov
29
comment How much is applicative really about applying, rather than “combining”?
If you add the FScalarBasisSpace restriction to the Approximate constructor, you don't need any context for <*>, because you can get the type class constraints by pattern matching on the input values.
Nov
28
comment Type families - Couldn't match type
I added the stateMap function, hope that helps.
Nov
28
comment Type families - Couldn't match type
You need to fix program when you pass it to the inner withAgent.
Nov
27
comment Biapplicative and Bimonad?
PS. Your Biapplicative class is correct I think. Biapplicative functors seem to match monoidal functors from Hask x Hask to Hask.
Oct
27
comment Writing cojoin or cobind for n-dimensional grid type
Naperian functors are also called representable functors: hackage.haskell.org/packages/archive/representable-functors/…