;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Clojure is Fast! ;; Paul Graham said that Common Lisp was two languages, one for writing programs ;; fast, and one for writing fast programs. ;; I've never tried to find Clojure's fast bits before, but I thought I'd give ;; it a try, using a simple example of a numerical algorithm that C and FORTRAN ;; would be very good for. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Let's try to integrate a differential equation. ;; Don't be scared! That means that we've got a number that needs to change over ;; time, and a function that tells us how much it needs to change by. ;; You've got a variable y, say it's 0 (feet). We start at time 0 (seconds). ;; We calculate f(0,0), lets say that's 0. (feet/second) ;; Then y has to change by 0 feet per second. So after a tenth of a second we ;; calculate that t should be 0.1 seconds, y should still be about 0 feet, and ;; that lets us work out roughly what f is now. ;; Say f is 0.1 : then y needs to change by 0.1 feet/second. So after another ;; tenth of a second, t is 0.2, y is roughly 0.01, and we can work out f again. ;; And repeat, for as many steps as you're interested in. ;; And that's how you find an approximate numerical solution to the differential ;; equation: ;; dy/dt = f(t,y) where f(t, y) = ty and y=0 when t=0. ;; using a step size of onetenth of a second. ;; This challenging procedure is known as Euler's Method, or sometimes as ;; firstorder RungeKutta. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; A Test Case ;; As it happens, we can work out by devious mathematical trickery that the ;; exact solution (which is what happens if you make the steps so small that you ;; can't tell they're steps any more, and everything is nice and smooth) to this ;; equation is y=e^(t)+t1 ;; So if we write our program correctly then when t is 1, ;; y should be close to (Math/exp 1) = 0.36787944117144233 ;; And it should get closer if we make our steps smaller. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; So that's the scene set. Here is the program in which I am interested: (defn f [t y] ( t y)) (defn solveit [t0 y0 h its] (if (> its 0) (let [t1 (+ t0 h) y1 (+ y0 (* h (f t0 y0)))] (recur t1 y1 h (dec its))) [t0 y0 h its])) ;; And here's an invocation: start from 0.0 at time 0.0, step size is 0.1, run for 10 iterations (solveit 0.0 0.0 0.1 10) ;; [0.9999999999999999 0.34867844010000004 0.1 0] ;; The answer tells us that after 10 steps t is 0.999..., or 1 as it's ;; traditionally known, and y is 0.348678.... The other two numbers are the ;; step size and the remaining iteration count, now down to 0 because the ;; process has done its ten steps. ;; In the exact answer, when t is 1, y should be e^1, or 0.36787944117144233. ;; So the answer's right to within 0.02, which is a good indicator that the ;; process works. ;; Let's have a look at the answers with different numbers of steps: (let [steps '(1 10 100 1000 10000 100000) results (map #(second (solveit 0.0 0.0 (/ 1.0 %) %)) steps ) errors (map #( (Math/exp 1) %) results)] (partition 3 (interleave steps results errors))) ;; steps result error ((1 0.0 0.36787944117144233) (10 0.34867844010000004 0.019201001071442292) (100 0.3660323412732297 0.001847099898212634) (1000 0.36769542477096434 1.8401640047799317E4) (10000 0.367861046432899 1.8394738543314748E5) (100000 0.3678776017662642 1.8394051781167597E6)) ;; Ten times more iterations leads to a ten times better result, which we'd ;; expect from theory. That's why it's called a first order method. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; For this program, I care how fast the iteration is. ;; What gets measured gets improved: (def *cpuspeed* 2.399) ;; My computer runs at 2.399 GHz ;; We can define a microbenchmarking macro which takes an expression ;; and the number of iterations that its calculation represents, and ;; tell us how many cpu cycles went into every iteration. (defmacro cyclesperit [expr its] `(let [start# (. System (nanoTime)) ret# ( ~@expr (/ 1.0 ~its) ~its ) finish# (. System (nanoTime))] (int (/ (* *cpuspeed* ( finish# start#)) ~its)))) ;; So here's an expression which times the loop over 100000 iterations. (cyclesperit (solveit 0.0 1.0) 1000000) ;; What are we expecting? Well, if modern computers work the same way as the ;; computers I used to write assembly language for, then we can estimate thus: ;; Here's the program again: (defn f [t y] ( t y)) (defn solveit [t0 y0 h its] (if (> its 0) (let [t1 (+ t0 h) y1 (+ y0 (* h (f t0 y0)))] (recur t1 y1 h (dec its))) [t0 y0 h its])) ;; For every go round the loop we have to: ;; compare its with 0, ;; branch depending on the result, ;; add t0 to h, ;; call f with t0 and y0, ;; multiply h and the result, ;; add that to y0, ;; jump. ;; So if this was an assembly language program that worked the way you'd expect, ;; each loop would take 7 cycles. ;; This estimate turns out to have been a little optimistic. ;; On my desktop machine, the results of the timing expression (cyclesperit (solveit 0.0 1.0) 1000000) ;; over four trial runs are: 2382 2290 2278 2317 ;; So we're looking at a slowdown of about 300 times over what we could probably ;; achieve coding in assembler or in C with a good optimizing compiler (and of ;; course I'm assuming that floating point operations take one cycle each) ;; This is about the sort of speed that you'd expect from a dynamic language ;; without any optimization or type hinting. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; So how do we make it faster? ;; There's a fairly significant speedup to be had from killing off function ;; calls. I think this is because primitives don't make it through function ;; boundaries They need to be boxed and unboxed. ;; There is something a bit odd about a functional language where function calls ;; are inefficient, but I understand that great men are working on the problem, ;; so it will probably not be a problem for clojure 1.3 ;; In the meantime however, we'll inline f by hand and we'll create an internal ;; target for recur, using casts on the initial values to make sure that inside ;; the loop/recur, only the java primitives int and double are seen: (defn solveit2 [t0 y0 h its] (loop [t0 (double t0), y0 (double y0), h (double h), its (int its)] (if (> its 0) (let [t1 (+ t0 h) y1 (+ y0 (* h ( t0 y0)))] (recur t1 y1 h (dec its))) [t0 y0 h its]))) ;; Let's time that and see how it goes: (cyclesperit (solveit2 0.0 1.0) 10000000) 488 506 486 ;; That's much better. The slowdown is now about 70 times compared with the ;; program and CPU in my head. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; The first law of optimizing things is that you need a profiler to find out ;; where the slow bits are. ;; At this point, we'll bring in jvisualvm, an excellent piece of software that ;; can be installed on Ubuntu with: ;; # sudo aptget visualvm ;; and probably with something similar on any other system where Java will run. ;; Just run it. How it works should be fairly obvious. I'm sure there are ;; docs and stuff. I haven't looked. ;; When using jvisualvm, you should be careful to use the most strippeddown ;; clojure image possible. ;; I usually 'require' all of contrib on startup, and ;; this means that the poor profiler has to instrument something like 10000 ;; classes. This takes ages. ;; If you start with a clean image (it's ok to have everything on the classpath, ;; just don't load it if you don't need it), then it's only about 1000 classes, ;; and everything happens 10 times faster. You still need to wait about 10 ;; seconds while turning profiling on or off, but that's bearable. ;; Attach jvisualvm to your clojure, and then run (cyclesperit (solveit2 0.0 1.0) 1000000) ;; The profiling slows everything down to treacle, even the REPL, so remember to ;; deattach it before trying to do anything that might take noticeable time. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Results of profiling: ;; There are four innocent looking calls to add, minus, and multi, all with ;; signature (double, double). There's one to dec(int). But there's also one to ;; gt(int, Object). That only takes 20% of the time, apparently, but under it ;; there's a whole tree of other calls. Something is getting resolved at run ;; time, which is usually bad for speed. ;; The profiler suggest that function overload resolutions are being done every ;; time round the loop. Weirdly, it suggests that they're not very expensive ;; compared to add(double,double). I am suspicious, so I'm going to try ;; changing (> its 0) to (> its (int 0)). That should allow the compiler to work ;; out the type of the call to > at compile time, rather than every time round. (defn solveit3 [t0 y0 h its] (loop [t0 (double t0), y0 (double y0), h (double h), its (int its)] (if (> its (int 0)) (let [t1 (+ t0 h) y1 (+ y0 (* h ( t0 y0)))] (recur t1 y1 h (dec its))) [t0 y0 h its]))) ;; Let's time that: ;; Remember to detach the profiler! If you don't you'll get cycle counts in the 100000s (cyclesperit (solveit3 0.0 1.0) 1000000) 79 79 63 ;; Wow! That's made a vast difference. I don't understand why. ;; Apparently the literal 0 was being treated as a generic object. I can see why ;; that would be slow, but the profiler said that it was only 20% of the running ;; cost. It seems more likely that removing it has somehow decontaminated the ;; other calls. Maybe it's allowing the variables to stay in registers where ;; before they were being pushed out back onto the heap, or something? ;; I wonder if there's a way to examine the code that clojure generates for a ;; function? ;; At any rate, the loop is now about six times faster than it was. ;; Let's have another look with the profiler: ;; Attach it and run: (cyclesperit (solveit3 0.0 1.0) 1000000) ;; Again, the profiling looks about what you'd expect, except that a method ;; called RT.intCast is being called just as often as the multiplies, minuses, ;; and decs that I'm expecting to see. The profiler claims that it's not taking ;; up much time, but let's try to get rid of it by making an explicit local ;; variable for zero. For some reason this reminds me of ZX81 BASIC. (defn solveit4 [t0 y0 h its] (let [zero (int 0)] (loop [t0 (double t0) y0 (double y0) h (double h) its (int its)] (if (> its zero) (let [t1 (+ t0 h) y1 (+ y0 (* h ( t0 y0)))] (recur t1 y1 h (dec its))) [t0 y0 h its])))) ;; Remove the profiler and retime: (cyclesperit (solveit4 0.0 1.0) 100000000) 23 23 23 ;; Doing the (int 0) outside the loop again seems to have tripled the speed of ;; the loop again. ;; The profiler is now telling me that there are: 2 adds(double,double), 1 ;; gt(int,int), 1 minus(double, double), 1 dec(int) and 1 multiply(double, ;; double) in every loop, which is what I'd expect if I was writing C or Java to ;; do this, but I'm suspicious that it can tell! Presumably there's still some ;; dispatching going on? These should be single assembler instructions, and ;; invisible to a profiler working at function level. ;; With 4 floating point, 1 gt, 1 dec, and 1 conditional branch I'd imagine that ;; 7 cycles/loop would be as fast as this loop could be made to run without being clever. ;; So it appears that there's now only around a factor of 3 between this loop as ;; written, and what I'd expect from a C, Java or assembler program. ;; In absolute terms: "Elapsed time: 1019.442664 msecs" [1.0000000022898672 0.7357588790870762 1.0E8 0] (time (solveit4 0.0 1.0 (/ 1.0 100000000) 100000000)) ;; 1 second to do 100 000 000 iterations on my desktop, at about 23 cycles/loop ;; I'm pretty happy with that, especially given that the loop is still readable! ;; It's only slightly more complicated than the original. Optimizing Common Lisp ;; tends to make it look horrible. ;; Does anyone have any ideas how to squeeze a few more cycles out of the loop? ;; One more thing. We can make it go pretty fast. Does it still work? ;; Remember y(1) should approximate e^1 0.36787944117144233, and our vast ;; speedup means that it's now not unreasonable to throw 1 000 000 000 ;; iterations at the problem. (let [steps '(1 10 100 1000 10000 100000 1000000 10000000 100000000 1000000000) results (map #(second (solveit4 0.0 0.0 (/ 1.0 %) %)) steps ) errors (map #( (Math/exp 1) %) results)] (partition 3 (interleave steps results errors))) ((1 0.0 0.36787944117144233) (10 0.34867844010000004 0.019201001071442292) (100 0.3660323412732297 0.001847099898212634) (1000 0.36769542477096434 1.8401640047799317E4) (10000 0.367861046432899 1.8394738543314748E5) (100000 0.3678776017662642 1.8394051781167597E6) (1000000 0.3678792572317447 1.8393969763996765E7) (10000000 0.3678794227282174 1.8443224947262138E8) (100000000 0.3678794397549051 1.4165372208552185E9) (1000000000 0.3678794410553999 1.1604245342411446E10)) ;; Cool! Accuracy improves as predicted, and with 10^9 steps we get nine ;; significant figures in about ten seconds. (time (solveit4 0.0 1.0 (/ 1.0 1000000000) 1000000000)) ;; Note: ;; ;; Just in order to keep my credibility as a numerical analyst intact, I ought ;; to point out that if I really was trying to solve a smooth ODE (instead of ;; investigating how fast I could make some simple numeric code in Clojure), I ;; wouldn't be using Euler's method. Optimize your algorithm before you optimize ;; your code. ;; No differential equations were harmed in the making of this blogpost. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Conclusion ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;; Clojure is a fast language, if you write so that your intentions are clear to ;; the compiler. Something tells me that as clojure gets older, it will be ;; getting better at working out what your intentions are. ;; It would not surprise me in the slightest if very soon, the code as originally ;; written runs as fast or faster than my speeded up version. ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
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Thursday, September 16, 2010
Clojure is Fast
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Have you thought of trying the unchecked* functions? That might get you slightly faster performance.
ReplyDeleteintressting post :)
ReplyDeleteThe (int 0) thing could be handled by the compiler but I think befor ClojureinClojure the compiler want be optimized mutch more.
Who wants to do stuff like that in Java :)
@chewy, as I understand it uncheckedadd is for ints rather than doubles.
ReplyDeleteNice to see that the development of clojure proceeds.
ReplyDeletevery cool explanation. As for you confusion:
ReplyDeletethe (int) 0 thing hints clojure to emit bytecode that uses a java int (primitive) on the call stack. The HotSpot hit then makes sure the registers stay put as well for plain ints. By default, number literals are instantiated as big N Number on the heap and autoboxed. This allows a system where "everything is an object" along with other goodness. The (int) hint is explicit but you'll notice that you can't do certain things (like toString for example).
Now the bit about pulling it out of the loop. The language is fully dynamic. The loop recur structure implements iteration (linear time, constant space). by jumping back up and rebinding the innermost context. The (int)0 form may have been a more complex form that needed reevaluation. The design stance on that is that the hotpost jit should do the optimizations, the clojure bytcode emitting should stay simple.
hope that clears things up. BTW 23 cycles is quite cool! There's the syscall call overhead for getting the time twice that you then amortize over the number of iterations in your cyclesperit calculation. I'm also not sure what kind of skew guarantee the nanoTime call gives you. The native java platform just has a getTimeInMillis(). Depending how the jit compiles stuff to native, theres also overhead on setting up the outermost call stack (1time cost with a potential with a memory stall though unlikely given your numbers).
Theres also a potential stall on the eslecase of the if branch (last time through) before it can 'recur to its next iteration. I'm assuming the code emitted defaults to stuffing the 'true case code into the pipeline and doesn't stall. Instead it flushes when it realizes that it went 1 iteration too far before it finally can 'recur.
There might also be a slight pipeline bubble to avoid a datahazard on multiplication.
With all that being said there's still lot's of reasons why your effective clock rate isn't simply 2.399. Hyperthreading, multicores with tlb shootdowns depending on what else was going on in your OS, speed step or some other voltage regulating scheme... :) once you're down to 23 cycles you're well within the range of error and need HW counters to figure out whats going on.
Shawn, Thank you! Very interesting indeed. Can you tell me how you worked all that out? In particular how do I get a look at the bytecode? Just a reference to an article would be cool.
ReplyDeletethis is still helpful, but an update with 1.3 would be interesting to read as well...
ReplyDeleteJohn
ReplyDeleteJust came across this blog, and tried solveit4 using Clojure 1.3 and it consistently takes 8 cycles on a 2.0 GHz MacBook. That's pretty amazing!
Thanks for writing this post. I look forward to reading the rest of the posts here.
I have just tried this with clojure 1.3 and solveit2 is as fast as solveit4, which is even more amazing
ReplyDeleteHaha  looks like ZX81 basic  like it :)
ReplyDeletereporting from clojure 1.6.0 , solveit2 is faster than solveit4 now and it doesn't matter whether I use f or  . My cpu is Intel(R) Core(TM) i33110M CPU @ 2.40GHz (4 CPUs), ~2.4GHz
ReplyDelete