# Tail recursion with Groovy

I coded 3 factorial algorithms:

1. First, I expect to fail by Stack Overflow. No problem.
2. Second, I try tail recusive call, convert previous algorithm from recursive to iterative. It doesn't work but I don't understand why.
3. Third, I use `trampoline()` method and works fine as I expect.

``````def factorial

factorial = { BigInteger n ->
if (n == 1) return 1
n * factorial(n - 1)
}
factorial(1000)  // Stack Overflow

factorial = { Integer n, BigInteger acc = 1 ->
if (n == 1) return acc
factorial(n - 1, n * acc)
}
factorial(1000)  // Stack Overflow, why???

factorial = { Integer n, BigInteger acc = 1 ->
if (n == 1) return acc
factorial.trampoline(n - 1, n * acc)
}.trampoline()
factorial(1000)  // It works
``````
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## 1 Answer

There is no tail recursion in Java, and hence there is none in Groovy either (without using something like `trampoline()` as you have shown)

The closest I have seen to this, is an AST transformation which cleverly wraps the return recursion into a while loop

Edit

You're right, Java (and hence Groovy) do support this sort of tail-call iteration, however, it doesn't seem to work with Closures...

This code however (using a method rather than a closure for the `fact` call):

``````public class Test {
BigInteger fact( Integer a, BigInteger acc = 1 ) {
if( a == 1 ) return acc
fact( a - 1, a * acc )
}
static main( args ) {
def t = new Test()
println "\${t.fact( 1000 )}"
}
}
``````

When saved as `Test.groovy` and executed with `groovy Test.groovy` runs, and prints the answer:

``````402387260077093773543702433923003985719374864210714632543799910429938512398629020592044208486969404800479988610197196058631666872994808558901323829669944590997424504087073759918823627727188732519779505950995276120874975462497043601418278094646496291056393887437886487337119181045825783647849977012476632889835955735432513185323958463075557409114262417474349347553428646576611667797396668820291207379143853719588249808126867838374559731746136085379534524221586593201928090878297308431392844403281231558611036976801357304216168747609675871348312025478589320767169132448426236131412508780208000261683151027341827977704784635868170164365024153691398281264810213092761244896359928705114964975419909342221566832572080821333186116811553615836546984046708975602900950537616475847728421889679646244945160765353408198901385442487984959953319101723355556602139450399736280750137837615307127761926849034352625200015888535147331611702103968175921510907788019393178114194545257223865541461062892187960223838971476088506276862967146674697562911234082439208160153780889893964518263243671616762179168909779911903754031274622289988005195444414282012187361745992642956581746628302955570299024324153181617210465832036786906117260158783520751516284225540265170483304226143974286933061690897968482590125458327168226458066526769958652682272807075781391858178889652208164348344825993266043367660176999612831860788386150279465955131156552036093988180612138558600301435694527224206344631797460594682573103790084024432438465657245014402821885252470935190620929023136493273497565513958720559654228749774011413346962715422845862377387538230483865688976461927383814900140767310446640259899490222221765904339901886018566526485061799702356193897017860040811889729918311021171229845901641921068884387121855646124960798722908519296819372388642614839657382291123125024186649353143970137428531926649875337218940694281434118520158014123344828015051399694290153483077644569099073152433278288269864602789864321139083506217095002597389863554277196742822248757586765752344220207573630569498825087968928162753848863396909959826280956121450994871701244516461260379029309120889086942028510640182154399457156805941872748998094254742173582401063677404595741785160829230135358081840096996372524230560855903700624271243416909004153690105933983835777939410970027753472000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000
``````

As a guess, I would say that the JVM does not know how to optimise closures (like it does with methods), so this tail call does not get optimised out in the bytecode before it is executed

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JVM has limitations in tail recursion but there are tail recursion in Java if you implemented, like me in the second option –  Arturo Herrero Sep 10 '11 at 23:13
@Arturo You're right of course... I have updated my answer with some extra findings... –  tim_yates Sep 11 '11 at 0:19
I have the same problem but now with methods instead of closures. Try your example with the recursive approach and works! –  Arturo Herrero Sep 11 '11 at 0:43
–  cdeszaq Apr 19 '12 at 19:16
If you replace `1000` with `50000` this example still throws a `StackOverflowError` for me (Java 7). Using a loop works fine with `50000`. –  micha Nov 17 '13 at 16:55
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