Checking for Proper Subsets

I need a function that can check if a list `a` is a proper subset of a list `b`. My code so far is:

``````(defun proper-subset (a b)
(cond
(( or (null b)(null b)) nil)
((equal a b) nil)
((find (car a) b) (proper-subset (cdr a) b))
)
)
``````

`find` checks that each element of `a` is in `b`. I know the null arguments need some work as well, but I am trying to figure out how to determine when every element of `a` is found in `b` and `b` has another element. There are built in functions that can make this a lot easier however this a homework question so I have to write my own. Any hints or suggestions would be greatly appreciated.

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Did you make any progress with this? Since it's a homework assignment (clarified in the comments), I expect that you eventually had to turn in something. Perhaps (without giving away the exact answer) you can post an answer that would help someone who finds this question in the future? –  Joshua Taylor Sep 26 '13 at 14:44

The below only adds `if` to the set of operations you mention, but this is really an atrocious way to do it. If that's what they teach you (you didn't volunteer for it). It's about time you get some good book on Lisp and study it yourself. This exercise is really pointless in my opinion.

``````(defun purge (element from-list)
(if (null from-list) nil
(if (equal element (car from-list))
(purge element (cdr from-list))
(cons (car from-list) (purge element (cdr from-list))))))

(defun proper-subset-p (suspect of)
(if (null suspect) (not (null of))
(if (not (equal (purge (car suspect) of) of))
(proper-subset-p
(purge (car suspect) suspect)
(purge (car suspect) of)) nil)))
``````

Same thing, but with `cond`

``````(defun purge (element from-list)
(cond
((null from-list) nil)
((equal element (car from-list)) (purge element (cdr from-list)))
(t (cons (car from-list) (purge element (cdr from-list))))))

(defun proper-subset-p (suspect of)
(cond
((null suspect) (not (null of)))
((not (equal (purge (car suspect) of) of))
(proper-subset-p (purge (car suspect) suspect) (purge (car suspect) of)))
(t nil)))
``````
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Thanks, this is the direction I was thinking. I am however having some trouble converting it to work with cond. Mainly figuring out the base case for the proper-subset-p. The way I read it is if after the first element of supsect is removed from of and not equal to of then call a recursive call on proper-subset-p and removing the first element of suspect from suspect and of and then returning nill? I'm sorry if that sounded confusing I am just having trouble following it I think. We didn't go over if so that may just be why I am having a hard time. –  Shrp91 Sep 27 '13 at 20:56
@user2802966 It might sound strange, but I should really discourage you from using the code above :) It is written in this way only to meet the strange requirement you have. Put in plain English, it first checks that if you remove the first element of the `suspect` from `of`, `of` becomes smaller (which will confirm that it had the first element of `suspect` at least once). If after this step there are no more elements in `of`, you've confirmed that `suspect` is a proper subset. If both lists aren't `nil`, repeat the procedure. –  user797257 Sep 27 '13 at 21:42
The problems with the approach above are as follows: lists are not suited to represent sets, they allow repetition of elements, they also algorithmically poorly suited because of growing time needed to access elements. In real life, using a `hash-table` is in most cases the best straight-forward way to represent sets. You would never use lists to do what this task implies, unless lists are very short and the performance isn't important (source code manipulations for example). –  user797257 Sep 27 '13 at 21:48
It is just a very brief overview of LISP so I assume the lack of time to go over in-depth the built in functions is why it must be done in such an inefficient way. Thank you for the help though. I think I can get it work with cond. –  Shrp91 Sep 27 '13 at 21:55
@user2802966 well, for starters, `(if a b c)` is equivalent to `(cond (a b) (t c))`, so you could just mechanically replace `if` with `cond` where you need it. –  user797257 Sep 27 '13 at 22:33

Common Lisp defines a number of functions for working with lists as sets, so you don't need to write your own. In particular, the useful functions appear at the bottom of The Conses Dictionary. The particularly useful ones are

`subsetp` almost does what you want, but it's checking for non-proper subsets. However, observe that you can use these functions to compute what you need. The most direct way would be to check if A is a subset of B, and whether B - A ≠ {}. This matches your description, "every element of a is found in b and b has another element".

``````(defun proper-subsetp (a b)
(and (subsetp a b)                       ; every element of a is found in b
(not (endp (set-difference b a))))) ; b has another element
``````
``````CL-USER> (proper-subsetp '(1 2 3) '(1 2 3 4))
T
CL-USER> (proper-subsetp '(1 2 3 4) '(1 2 3 4))
NIL
``````

Since these functions actually take some parameters that let you determine how elements are compared. You can add these in by using an `&rest` argument and apply:

``````(defun proper-subsetp (a b &rest keys)
(and (apply 'subsetp a b keys )
(not (endp (apply 'set-difference b a keys)))))
``````

Using this, you could, rather than comparing the elements directly, compare their lengths:

``````CL-USER> (proper-subsetp '("a" "bb" "ccc") '("1" "22" "333") :key 'length)
NIL
CL-USER> (proper-subsetp '("a" "bb" "ccc") '("1" "22" "333" "4444") :key 'length)
T
``````
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I'm sorry I should have provided more information. This is a homework assignment so that is why I am trying to write my own. The functions we have at our disposal are (atom not null car cdr list cons append equal). I thought of maybe writing a remove function that removes all elements found in both lists and check to see if b is not null but I haven't gotten anywhere with it. –  Shrp91 Sep 22 '13 at 23:31
You should update your question with this information. It significantly changes the types of answers that you're looking for. Also, people often respond negatively to homework questions that aren't labelled as such. –  Joshua Taylor Sep 23 '13 at 0:53
Edited it with the changes. Sorry, wasn't trying to mislead anyone. –  Shrp91 Sep 23 '13 at 2:46
@user2802966 your goal is not possible to achieve because the vocabulary of terms you listed does not include any conditional constructs, neither it has any means to process lists of arbitrary length. You need to either extend the vocabulary with something like `if` or `cond` and allow to at least declare custom functions (so that you could recursively traverse lists). –  user797257 Sep 23 '13 at 9:20
@wvxvw I suspect, given the code that user2802966 already has, that `cond` is allowed. Oftentimes, the distinction between functions and macros and special operators isn't clear to beginners, or isn't made clear by casual instructors, but in this case, the list atom, not, null, car, cdr, list, cons, append, and equal actually is a list of functions. It looks like `defun` and `or` are also allowed. ;) –  Joshua Taylor Sep 23 '13 at 13:09