-- | DFOV (Digital Field of View) implemented according to specification at . -- This fast version of the algorithm, based on PFOV, has AFAIK -- never been described nor implemented before. -- -- The map is processed in depth-first-search manner, that is, as soon -- as we detect on obstacle we move away from the viewer up to the -- FOV radius and then restart on the other side of the obstacle. -- This has better cache behaviour than breadth-firsts-search, -- where we would process all tiles equally distant from the viewer -- in the same round, because then we'd need to keep the many convex hulls -- and edges, not just a single set, and we'd potentially traverse all -- of them each round. module Game.LambdaHack.Server.FovDigital ( scan -- * Scanning coordinate system , Bump(..) -- * Assorted minor operations #ifdef EXPOSE_INTERNAL -- * Current scan parameters , Distance, Progress -- * Geometry in system @Bump@ , LineOrdering, Line(..), ConvexHull(..), CHull(..), Edge, EdgeInterval -- * Internal operations , steepestInHull, foldlCHull', addToHull, addToHullGo , createLine, steepness, intersect , _debugSteeper, _debugLine #endif ) where import Prelude () import Game.LambdaHack.Core.Prelude hiding (intersect) import Game.LambdaHack.Common.Point (PointI) -- | Distance from the (0, 0) point where FOV originates. type Distance = Int -- | Progress along an arc with a constant distance from (0, 0). type Progress = Int -- | Rotated and translated coordinates of 2D points, so that the points fit -- in a single quadrant area (e, g., quadrant I for Permissive FOV, hence both -- coordinates positive; adjacent diagonal halves of quadrant I and II -- for Digital FOV, hence y positive). -- The special coordinates are written using the standard mathematical -- coordinate setup, where quadrant I, with x and y positive, -- is on the upper right. data Bump = B { bx :: Int , by :: Int } deriving Show -- | Two strict orderings of lines with a common point. data LineOrdering = Steeper | Shallower -- | Straight line between points. data Line = Line Bump Bump deriving Show -- | Convex hull represented as a non-empty list of points. data ConvexHull = ConvexHull Bump CHull deriving Show data CHull = CHNil | CHCons Bump CHull deriving Show -- | An edge (comprising of a line and a convex hull) of the area to be scanned. type Edge = (Line, ConvexHull) -- | The contiguous area left to be scanned, delimited by edges. type EdgeInterval = (Edge, Edge) -- | Calculates the list of tiles visible from (0, 0) within the given -- sight range. scan :: Distance -- ^ visiblity distance -> (PointI -> Bool) -- ^ visually clear position predicate -> (Bump -> PointI) -- ^ coordinate transformation -> [PointI] {-# INLINE scan #-} scan !r isClear tr = #ifdef WITH_EXPENSIVE_ASSERTIONS assert (r > 0 `blame` r) $ -- not really expensive, but obfuscates Core #endif -- The scanned area is a square, which is a sphere in the chessboard metric. dscan 1 ( (Line (B 1 0) (B (-r) r), ConvexHull (B 0 0) CHNil) , (Line (B 0 0) (B (r+1) r), ConvexHull (B 1 0) CHNil) ) where dscan :: Distance -> EdgeInterval -> [PointI] {-# INLINE dscan #-} dscan !d ( (sl{-shallow line-}, sHull), (el{-steep line-}, eHull) ) = dgo d sl sHull el eHull -- Speed (mosty JS) and generally convincing GHC to unbox stuff. dgo :: Distance -> Line -> ConvexHull -> Line -> ConvexHull -> [PointI] dgo !d !sl sHull !el eHull = -- @sHull@ and @eHull@ may be unused let !ps0 = let (n, k) = intersect sl d -- minimal progress to consider in n `div` k !pe = let (n, k) = intersect el d -- maximal progress to consider -- Corners obstruct view, so the steep line, constructed -- from corners, is itself not a part of the view, -- so if its intersection with the horizonstal line at distance -- @d@ is only at a corner, we choose the position leading -- to a smaller view. in -1 + n `divUp` k outside = if d < r then let !trBump = bump ps0 in if isClear trBump then trBump : mscanVisible sl sHull (ps0+1) -- start visible else trBump : mscanShadowed (ps0+1) -- start in shadow else map bump [ps0..pe] bump :: Progress -> PointI bump !px = tr $ B px d -- We're in a visible interval. mscanVisible :: Line -> ConvexHull -> Progress -> [PointI] mscanVisible line hull = goVisible where goVisible :: Progress -> [PointI] goVisible !ps = if ps <= pe then let !trBump = bump ps in if isClear trBump -- not entering shadow then trBump : goVisible (ps+1) else let steepBump = B ps d nep = steepestInHull Shallower steepBump hull neLine = createLine nep steepBump neHull = addToHull Shallower steepBump eHull in trBump : dgo (d+1) line hull neLine neHull ++ mscanShadowed (ps+1) -- note how we recursively scan more and more -- distant tiles, up to the FOV radius, -- before starting to process the shadow else dgo (d+1) line hull el eHull -- reached end, scan next row -- We're in a shadowed interval. mscanShadowed :: Progress -> [PointI] mscanShadowed !ps = if ps <= pe then let !trBump = bump ps in if not $ isClear trBump -- not moving out of shadow then trBump : mscanShadowed (ps+1) else let shallowBump = B ps d nsp = steepestInHull Steeper shallowBump eHull nsLine = createLine nsp shallowBump nsHull = addToHull Steeper shallowBump sHull in trBump : mscanVisible nsLine nsHull (ps+1) else [] -- reached end while in shadow in #ifdef WITH_EXPENSIVE_ASSERTIONS assert (r >= d && d >= 0 && pe >= ps0 `blame` (r,d,sl,sHull,el,eHull,ps0,pe)) #endif outside -- | Specialized implementation for speed in the inner loop. Not partial. steepestInHull :: LineOrdering -> Bump -> ConvexHull -> Bump {-# NOINLINE steepestInHull #-} steepestInHull !lineOrdering !new (ConvexHull !b !ch) = foldlCHull' max' b ch where max' !x !y = if steepness lineOrdering new x y then x else y -- | Standard @foldl'@ over @CHull@. foldlCHull' :: (a -> Bump -> a) -> a -> CHull -> a {-# INLINE foldlCHull' #-} foldlCHull' f = fgo where fgo !z CHNil = z fgo z (CHCons b ch) = fgo (f z b) ch -- | Extends a convex hull of bumps with a new bump. The new bump makes -- some old bumps unnecessary, e.g. those that are joined with the new steep -- bump with lines that are not shallower than any newer lines in the hull. -- Removing such unnecessary bumps slightly speeds up computation -- of 'steepestInHull'. -- -- Recursion in @addToHullGo@ seems spurious, but it's called each time with -- potentially different comparison predicate, so it's necessary. addToHull :: LineOrdering -- ^ the line ordering to use -> Bump -- ^ a new bump to consider -> ConvexHull -- ^ a convex hull of bumps represented as a list -> ConvexHull {-# INLINE addToHull #-} addToHull lineOrdering new (ConvexHull old ch) = ConvexHull new $ addToHullGo lineOrdering new $ CHCons old ch -- This worker is needed to avoid Core returning a pair (new, result) -- and also Bump-packing new (steepBump/shallowBump) twice, losing sharing. addToHullGo :: LineOrdering -> Bump -> CHull -> CHull {-# NOINLINE addToHullGo #-} addToHullGo !lineOrdering !new = hgo where hgo :: CHull -> CHull hgo (CHCons a ch@(CHCons b _)) | not (steepness lineOrdering new b a) = hgo ch hgo ch = ch -- | Create a line from two points. -- -- Debug: check if well-defined. createLine :: Bump -> Bump -> Line {-# INLINE createLine #-} createLine p1 p2 = let line = Line p1 p2 in #ifdef WITH_EXPENSIVE_ASSERTIONS assert (uncurry blame $ _debugLine line) #endif line -- | Strictly compare steepness of lines @(b1, bf)@ and @(b2, bf)@, -- according to the @LineOrdering@ given. This is related to comparing -- the slope (gradient, angle) of two lines, but simplified wrt signs -- to work fast in this particular setup. -- -- Debug: Verify that the results of 2 independent checks are equal. steepness :: LineOrdering -> Bump -> Bump -> Bump -> Bool {-# INLINE steepness #-} steepness lineOrdering (B xf yf) (B x1 y1) (B x2 y2) = let y2x1 = (yf - y2) * (xf - x1) y1x2 = (yf - y1) * (xf - x2) res = case lineOrdering of Steeper -> y2x1 > y1x2 Shallower -> y2x1 < y1x2 in #ifdef WITH_EXPENSIVE_ASSERTIONS assert (res == _debugSteeper lineOrdering (B xf yf) (B x1 y1) (B x2 y2)) #endif res {- | A pair @(a, b)@ such that @a@ divided by @b@ is the X coordinate of the intersection of a given line and the horizontal line at distance @d@ above the X axis. Derivation of the formula: The intersection point @(xt, yt)@ satisfies the following equalities: > yt = d > (yt - y) (xf - x) = (xt - x) (yf - y) hence > (yt - y) (xf - x) = (xt - x) (yf - y) > (d - y) (xf - x) = (xt - x) (yf - y) > (d - y) (xf - x) + x (yf - y) = xt (yf - y) > xt = ((d - y) (xf - x) + x (yf - y)) / (yf - y) General remarks: The FOV agrees with physical properties of tiles as diamonds and visibility from any point to any point. A diamond is denoted by the left corner of it's encompassing tile. Hero is at (0, 0). Order of processing in the first quadrant rotated by 45 degrees is > 45678 > 123 > @ so the first processed diamond is at (-1, 1). The order is similar as for the restrictive shadow casting algorithm and reversed wrt PFOV. The fast moving line when scanning is called the shallow line, and it's the one that delimits the view from the left, while the steep line is on the right, opposite to PFOV. We start scanning from the left. The 'PointI' ('Enum' representation of @Point@) coordinates are cartesian. The 'Bump' coordinates are cartesian, translated so that the hero is at (0, 0) and rotated so that he always looks at the first (rotated 45 degrees) quadrant. The ('Progress', 'Distance') cordinates coincide with the @Bump@ coordinates, unlike in PFOV. Debug: check that the line fits in the upper half-plane. -} intersect :: Line -> Distance -> (Int, Int) {-# INLINE intersect #-} intersect (Line (B x y) (B xf yf)) d = #ifdef WITH_EXPENSIVE_ASSERTIONS assert (allB (>= 0) [y, yf]) #endif ((d - y)*(xf - x) + x*(yf - y), yf - y) -- | Debug functions for DFOV: -- | Debug: calculate steepness for DFOV in another way and compare results. _debugSteeper :: LineOrdering -> Bump -> Bump -> Bump -> Bool {-# INLINE _debugSteeper #-} _debugSteeper lineOrdering f@(B _xf yf) p1@(B _x1 y1) p2@(B _x2 y2) = assert (allB (>= 0) [yf, y1, y2]) $ let (n1, k1) = intersect (Line p1 f) 0 (n2, k2) = intersect (Line p2 f) 0 sign = case lineOrdering of Steeper -> GT Shallower -> LT in compare (k1 * n2) (n1 * k2) == sign -- | Debug: check if a view border line for DFOV is legal. _debugLine :: Line -> (Bool, String) {-# INLINE _debugLine #-} _debugLine line@(Line (B x1 y1) (B x2 y2)) | not (allB (>= 0) [y1, y2]) = (False, "negative Y coordinates: " ++ show line) | y1 == y2 && x1 == x2 = (False, "ill-defined line: " ++ show line) | y1 == y2 = (False, "horizontal line: " ++ show line) | crossL0 = (False, "crosses the X axis below 0: " ++ show line) | crossG1 = (False, "crosses the X axis above 1: " ++ show line) | otherwise = (True, "") where (n, k) = line `intersect` 0 (q, r) = if k == 0 then (0, 0) else n `divMod` k crossL0 = q < 0 -- q truncated toward negative infinity crossG1 = q >= 1 && (q > 1 || r /= 0)