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I am currently trying to write this function in J: T(n)=\sum_{i=1}^{n-1}\binom{n}{i}\times T(n-i) (T(1)=1)

My code is:

ints=: }.&i.          NB. list from 1 to n-1
chs =: ints !/ [      NB. list of binomials
subi=: - ints         NB. list from n-1 to 1
T=: +/(($: @: subi) * chs) ^: (1&<)

the functions work as they should, but the recursive call fails because T is called with a list, which then tries to generate a list of ints on a list.

How do I solve this or how could the function be written otherwise?

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1 Answer 1

up vote 2 down vote accepted

The general form for a recursive verb is:

T =: main_body`default_value  @. main_or_default_check

The default value and check are easy here:

default_value =: 1"_
main_or_default_check =: 1 = ]

binomial is also standard, we can write it as

binom =: 4 : '(!x)%((!y)*(!x-y))'

the form of main_body is main_body =: sum binomial(n,i) * T n-i. We can use a helper verb f for the inner part of sum, to make things clearer:

f =: 4 :'(x binom y) * T x - y'

or in tacit form: f =: binom * [: T -.

n is fixed for each iteration of sum, whereas i goes from 1 to n-1 (>:i.n-1) so:

sum =: 3 :'+/(y&f)"0 >:i.y-1'

Putting the above together:

T =: 3 : '+/(y&f)"0 >:i.y-1'`(1"_)@.(1 = ])

T each >:i.8
┌─┬─┬─┬──┬───┬────┬─────┬──────┐
│1│2│9│52│375│3246│32781│378344│
└─┴─┴─┴──┴───┴────┴─────┴──────┘
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1  
Thanks, func"0 list, which is like list.map(func) was what I was missing, now my original function also works: T=: +/@(T"0@subi * chs) ^: (1&<)! –  tehdog May 24 '14 at 14:20

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