About bots2

When I was in high school, I came across an internet game called bots2. Bots2 was a multiplayer game where people can log in, customize a robot, and autonomously fight against pre-built AI and other human players. The game would progress in rounds, wherein each robot would attempt to destroy its adversary. The game would continue until one robot dropped below 0 health, at which point the other robot would emerge victorious.

Bots2 was purportedly attacked by hackers and never brought back up. However, someone has taken the liberty of creating a clone of the old game, named bots4. If you’re interested, you can play bots4 here. In fact, I might recommend playing around with it for a minute or two, because we’ll be building a (very) simple version of bots2 in this post!

Preliminaries

I only assume a basic familiarity with monad transformers in this post. If you need an introduction, sigfpe has a great introduction to them on his blog. We’ll be using Russell O’Connor’s Lens-Family and Gabriel Gonzalez’ Pipes libraries to make the implementation easy (and educational!).

I also want to give a shout out to Gabriel, who was generous enough to personally review and edit my initial draft of the code in this post – it looks much better than it did before, thanks to him.

Without further ado, let’s get started!

import Pipes import qualified Pipes.Prelude as P import qualified System.Random as R import Lens.Family2 import Lens.Family2.Stock import Lens.Family2.State.Lazy import Control.Monad.Trans.State import Control.Monad import Control.Concurrent (threadDelay)

Modeling Bots

The game we wish to build pits two bots against each other, who will fight to the death based on who has the better stats (and a bit of randomness). We’ll need to be able to model each bot as an entity along with its specific stats.

During each round, each bot:

Deals damage to its opponent Has a chance to block (and take half damage) Has a chance to dodge (and take no damage)

We’ll model a Bot like so:

data Bot = Bot { _ name :: String , _ str :: Int , _ dex :: Int , _ con :: Int , _ hp :: Int } deriving ( Show , Eq )

We’ll use str to modify damage output, dex to modify dodge chance, con to modify block chance, and hp to denote the amount of health the bot has remaining. We’ll also tack on a name so we can print out more informative messages during the game. Note the prefix _ on each field; these are here so we can give our Lens es nicer names.

name :: Lens' Bot String str, dex, con, hp :: Lens' Bot Int name k ( Bot nm s d c h) = fmap (

m' -> Bot nm' s d c h) (k nm) str k ( Bot nm s d c h) = fmap (\s' -> Bot nm s' d c h) (k s ) dex k ( Bot nm s d c h) = fmap (\d' -> Bot nm s d' c h) (k d ) con k ( Bot nm s d c h) = fmap (\c' -> Bot nm s d c' h) (k c ) hp k ( Bot nm s d c h) = fmap (\h' -> Bot nm s d c h') (k h )

We can now define some Lens es for our Bot fields. We do this manually because it’s relatively simple and to avoid the TemplateHaskell requirement that comes along with Edward Kmett’s larger Lens library. Given a more complicated system, we might choose to use Lens to automatically generate these. However, this is a small program so the overhead isn’t necessary. Also, don’t worry too much about the declarations of the Lens es above: Just know that they allow us to do some cool stuff later on.

With these Lens es defined and our Bot data type in place, we can move on to defining more of the game’s semantics.

More Types

We’ll need a data type to represent a bot’s actions during a single round, and a game state representing the global state of the game:

type Event = ( Int , Bool , Bool ) type BotState = ( R.StdGen , ( Bot , Bot ))

The Event type defines a round of a single Bot’s behavior in a 3-tuple – the first parameter corresponds to damage dealt, the second to whether or not the bot dodged, and the third to whether or not the bot blocked. We will process these events later.

The BotState type boxes up a StdGen for us to use when generating random events, and a 2-tuple of Bot s – the player character’s bot and the enemy AI. This is all the global state we need in our game.

We can make some new Lens es for these types, given that 2-tuples are easily indexed using Lens :

generator :: Lens' BotState R.StdGen generator = _1 player :: Lens' BotState Bot player = _2 . _1 enemy :: Lens' BotState Bot enemy = _2 . _2

Here we create a Lens that references the StdGen of the BotState , using _1 . We can also compose Lens es using . (from the Prelude !) and we use this functionality with the simple Lens es _1 and _2 to make Lens es referencing the player and enemy AI in a BotState .

Well, that’s about all the type declaring we need to do. Now we can get on with piecing together the actual gameplay.

Generating Events

Now comes the fun part: actually programming the game mechanics. Essentially what we’d like to do is the following:

Generate an event for the player and enemy at the same time. Process each event. If either bot is dead, end the game and print an ending message.

Here we’ll focus on (1), generating events. Let’s take a look at some code:

genEvent :: Bot -> StateT R.StdGen IO Event genEvent bot = do [n, m, r] <- replicateM 3 $ state (R.randomR ( 0 , 100 )) let dodge = n < 100 * bot ^. dex `div` (bot ^. dex + 50 ) block = m < 100 * bot ^. con `div` (bot ^. con + 30 ) dmg = bot ^. str + (bot ^. str * r) `div` 30 return (dmg, dodge, block)

In order to generate an event for a bot, we grab three numbers between 0 and 100:

n, which helps determine if the bot dodges,

m, which helps determine if the bot blocks,

and r, which helps determine how much damage the bot does.

We can use the state combinator here to lift the computation (R.randomR (0, 100)) to a computation in the StateT monad. We then perform some arithmetic using the random numbers we grabbed along with the dex , con , and str stats from our Bot . We access these using the ^. combinator from the lens-family , using the Lens es we defined above.

Important note: We are producing the amount of damage a bot deals here. We will want to process events according to how much damage each bot receives, which we’ll handle in a minute.

Now that we can generate single events, we need a way of mapping them to specific bots. We’ll define a new function, genEventPair , to generate two events at once, corresponding to the player and the enemy in the game.

genEventPair :: StateT BotState IO ( Event , Event ) genEventPair = do p <- use player e <- use enemy zoom generator $ liftM2 switchDmgs (genEvent p) (genEvent e) where switchDmgs (a, b, c) (d, e, f) = ( (d, b, c), (a, e, f) )

There are a couple of new things at play here. First, on use :

Note the use of our Lens es player and enemy . To access the underlying state in a StateT , we typically call the function lift . Here instead we call the function use from Lens.Family2.State , which allows us to specify which piece of our BotState we want to get. We do just this in order to generate events for both the player and enemy , using the aforementioned Lens es.

Next, if you were looking closely you might have noticed that genEvent isn’t operating in the same monad as genEventPair , yet we use genEvent inside of genEventPair ! We are able do do this using the zoom combinator.

zoom lifts a stateful operation on one field to a stateful operation on the entire state. Here, we’re zooming into generator (a Lens on our StdGen ) and lifting the (stateful) generation of events for both the player and enemy into a (stateful) generation of two events while preserving player and enemy states. The fact that we can zoom into genEvent helps out the declaration immensely. It removes a lot of plumbing that we would have had to deal with in order to have genEvent operate on an underlying state of type BotState and allows the type of the computation to be more explicit.

Finally, Note the use of switchDmgs here: This was an ad hoc way to switch around damage dealt and damage sustained. genEventPair produces events harboring damage taken, which is what we need in order to process them in a nice way.

Processing Events

Now that we’re able to generate events and keep track of our game state, the next thing we need to do is actually process these events and update game state. We introduce resolveEvent to take care of this:

resolveEvent :: ( Monad m) => ( Event , Event ) -> StateT BotState m [( Bot , Event )] resolveEvent (p_evt, e_evt) = do zoom player (resolve p_evt) zoom enemy (resolve e_evt) p <- use player e <- use enemy return [(p, p_evt), (e, e_evt)] resolve :: ( Monad m) => Event -> StateT Bot m () resolve (dmg, ddg, blk) | ddg = return () | blk = hp -= dmg `div` 2 | otherwise = hp -= dmg

First let’s look at the resolve function. Here we are taking an event and updating a Bot ’s state based on that event. The implementation is straightforward, especially given that we have the -= Lens combinator at our disposal – this allows us to write imperative-looking code that does exactly what you would expect it to.

In the resolveEvent function, you should see some similarities to the above section. We can again use zoom and use in order to lift computations and retrieve state just as before, but we’re updating the main game state now. We produce two 2-tuples containing modified bots and their attached event that was processed during each turn.

At this point, the game logic is actually finished. We have ways to produce and deal with game events that modify game state, and provided that we can actually link these functions together (which we can, as we’ll see later), the game will actually run. All that we need to do now is handle IO and bot death. This is where Pipes comes in.

Pipes and IO

Let’s get the boring stuff out of the way first. I mentioned above that we have yet to deal with two major components of our game: IO and bot death. Let’s first define some simple functions to deal with these:

dead :: Bot -> Bool dead = ( <= 0 ) . view hp printBot :: Bot -> IO () printBot bot = putStrLn $ bot ^. name ++ " has " ++ show (bot ^. hp) ++ " hp remaining." printEvent :: Bot -> Event -> IO () printEvent bot (_, True , _) = putStrLn $ bot ^. name ++ " dodges the attack and takes no damage!" printEvent bot (d, _, True ) = putStrLn $ bot ^. name ++ " blocks and takes half (" ++ show (d `div` 2 ) ++ ") damage!" printEvent bot (d, _, _) = putStrLn $ bot ^. name ++ " takes " ++ show d ++ " damage."

Here we again make use of our Lens es (these are handy, huh?). We use the view function in order to get the health of our bot in dead , and check whether its hp is less than 0 in the usual fashion. view is just a prefix synonym for the infix ^. that we’ve been using all this time. Speaking of which, we use the ^. combinator heavily in both printEvent and printBot to handle the string-handling plumbing. Since these functions essentially tell you what they’re doing implicitly, I’ll omit an extensive explanation.

Now that we have ways to print Bot s and Event s and check for bot death, the last thing we need to do is actually perform these things the context of our game. A Consumer from the Pipes library will handle this nicely for us:

printGame :: Consumer [( Bot , Event )] ( StateT BotState IO ) () printGame = do botEvents @ [(b1, e1), (b2, e2)] <- await (lift . lift) $ do forM_ botEvents $ \be @ (bot, event) -> do uncurry printEvent be printBot bot threadDelay 500000 when (dead bot) $ putStrLn $ bot ^. name ++ " died!" putStrLn $ case (dead b1, dead b2) of ( True , True ) -> "It was a tie!" ( True , False ) -> b2 ^. name ++ " wins!" ( False , True ) -> b1 ^. name ++ " wins!" _ -> "-----------------" unless (any (dead . fst) botEvents) printGame

We await two (Bot, Event) s (from where, you might ask? We’ll see in a moment.) and essentially handle all of the plumbing here. For each pair of bots and events, we print the event, print the bot, then wait half a second with threadDelay (otherwise the game would run too quickly and we wouldn’t see it play out). With a Consumer like this, we need to loop until we’ve consumed all of the input we want, so we use the when and unless functions from Control.Monad as indicators of when to do so. If a bot dies, we stop – we also print out some information about who died and who won the game.

Running the Game

Okay, so I say that we have everything we need now, but you might ask…how do I run this? Let’s take a look at a program that pits two bots – a good guy and a bad guy – against one another, and we’ll dissect it.

runGame :: IO () runGame = do gen <- R.getStdGen let player = Bot "The Good Guy" 19 13 12 200 enemy = Bot "The Bad Guy" 14 6 10 200 startState = (gen, (player, enemy)) flip evalStateT startState $ runEffect $ lift (genEventPair >>= resolveEvent) >~ printGame

In the first few lines, we simply set up an initial state for the game. The real “stuff” happens in the line starting with flip evalStateT . We’ll work through this at a type level from the inside-out. First, we perform genEventPair >>= resolveEvent , which effectively handles the logic we talked about earlier and produces a StateT BotState IO [(Bot, Event)] . From here, we lift the computation into an Effect (StateT BotState IO) [(Bot, Event)] , which we then repeatedly pipe into printGame with >~ . After all of this, we runEffect to extract the StateT BotState IO [(Bot, Event)] from the computation, and finally evaluate the function using evalStateT . Phew!

In any case, we can now run our program and execute the game…

*Main> runGame The Good Guy takes 15 damage. The Good Guy has 285 hp remaining. The Bad Guy takes 29 damage. The Bad Guy has 171 hp remaining. ----------------- The Good Guy dodges the attack and takes no damage! The Good Guy has 285 hp remaining. The Bad Guy takes 20 damage. The Bad Guy has 151 hp remaining. ----------------- The Good Guy blocks and takes half ( 24 ) damage! The Good Guy has 261 hp remaining. The Bad Guy takes 34 damage. The Bad Guy has 117 hp remaining. ----------------- The Good Guy takes 46 damage. The Good Guy has 215 hp remaining. The Bad Guy takes 19 damage. The Bad Guy has 98 hp remaining. ----------------- The Good Guy takes 32 damage. The Good Guy has 183 hp remaining. The Bad Guy takes 37 damage. The Bad Guy has 61 hp remaining. ----------------- The Good Guy dodges the attack and takes no damage! The Good Guy has 183 hp remaining. The Bad Guy takes 12 damage. The Bad Guy has 49 hp remaining. ----------------- The Good Guy takes 24 damage. The Good Guy has 159 hp remaining. The Bad Guy takes 23 damage. The Bad Guy has 26 hp remaining. ----------------- The Good Guy dodges the attack and takes no damage! The Good Guy has 159 hp remaining. The Bad Guy takes 36 damage. The Bad Guy has - 10 hp remaining. The Bad Guy died! The Good Guy wins!

…and behold, the good guy wins (this time)!

View full source on GitHub.

- Ben