I'm using the beginning language with list abbreviations for DrRacket and want to make a powerset recursively but cannot figure out how to do it. I currently have this much
(define
(powerset aL)
(cond
[(empty? aL) (list)]
any help would be good.
What's in a powerset? A set's subsets!
An empty set is any set's subset,
so powerset of empty set's not empty.
Its (only) element it is an empty set:
(define
(powerset aL)
(cond
[(empty? aL) (list empty)]
[else
As for non-empty sets, there is a choice,
for each set's element, whether to be
or not to be included in subset
which is a member of a powerset.
We thus include both choices when combining
first element with smaller powerset,
that, which we get recursively applying
the same procedure to the rest of input:
(combine (first aL)
(powerset (rest aL)))]))
(define
(combine a r) ; `r` for Recursive Result
(cond
[(empty? r) empty] ; nothing to combine `a` with
[else
(cons (cons a (first r)) ; Both add `a` and
(cons (first r) ; don't add, to first subset in `r`
(combine ; and do the same
a ; with
(rest r))))])) ; the rest of `r`
"There are no answers, only choices". Rather,
the choices made, are what the answer's made of.
In Racket,
#lang racket
(define (power-set xs)
(cond
[(empty? xs) (list empty)] ; the empty set has only empty as subset
[(cons? xs) (define x (first xs)) ; a constructed list has a first element
(define ys (rest xs)) ; and a list of the remaining elements
;; There are two types of subsets of xs, thouse that
;; contain x and those without x.
(define with-out-x ; the power sets without x
(power-set ys))
(define with-x ; to get the power sets with x we
(cons-all x with-out-x)) ; we add x to the power sets without x
(append with-out-x with-x)])) ; Now both kind of subsets are returned.
(define (cons-all x xss)
; xss is a list of lists
; cons x onto all the lists in xss
(cond
[(empty? xss) empty]
[(cons? xss) (cons (cons x (first xss)) ; cons x to the first sublist
(cons-all x (rest xss)))])) ; and to the rest of the sublists
To test:
(power-set '(a b c))
Here's my implementation of power set (though I only tested it using standard Racket language, not Beginning Student):
(define (powerset lst)
(if (null? lst)
'(())
(append-map (lambda (x)
(list x (cons (car lst) x)))
(powerset (cdr lst)))))
(Thanks to samth for reminding me that flatmap is called append-map in Racket!)
Here's yet another implementation, after a couple of tests it appears to be faster than Chris' answer for larger lists. It was tested using standard Racket:
(define (powerset aL)
(if (empty? aL)
'(())
(let ((rst (powerset (rest aL))))
(append (map (lambda (x) (cons (first aL) x))
rst)
rst))))
You can just use side effect:
(define res '())
(define
(pow raw leaf)
(cond
[(empty? raw) (set! res (cons leaf res))
res]
[else (pow (cdr raw) leaf)
(pow (cdr raw) (cons (car raw) leaf))]))
(pow '(1 2 3) '())
