I am using Scheme language to take the derivative of an inputted expression, and for the most part I believe my table driven function is working well enough but now I'd like to create a few expressions to handle simplifying the output.
For Example:
(d '(* (+ x 1) (+ x -1))) -> '(* 2 x) Rather than -> '(+ (* (+ x 1) (+ 1 0)) (* (+ 1 0) (+ x -1)))
I am rather new to Scheme so I know this is just a matter of being able to recursively parse lists but I'm not sure where to start, any idea how to achieve this?
Here is my code for the function
(define lookup (lambda (x alist) (cadr (assoc x alist))))
;-----------------------------------------------------
(define d
(lambda (e)
(cond ((number? e) 0)
((equal? e 'x) 1)
(else
(let ((op (car e)) (args (cdr e)))
(apply (lookup op d-op-table) args))))))
(define d-op-table
(list(list '+ (lambda (u v)(list '+ (d u) (d v))))
(list '- (lambda (u v)(list '- (d u) (d v))))
(list '* (lambda (u v)(list '+ (list '* u (d v))(list '* (d u) v))))
(list 'sin (lambda (u)(list '*( list 'cos (d u)))))
(list 'cos (lambda (u)(list '*( list '-sin (d u)))))
(list 'log (lambda (u)(list '* (list '/ 1 u) (d u))))
(list 'exp (lambda (u)(list '* (d u)(list 'exp u))))
(list 'expt (lambda (u v) (list 'expt (list '* v u) (- v 1))))))
(+ anything 0)
simplifies toanything
.(define simplify ...)
and then you do(simplify (d '(...))
d
:(simplify (apply (lookup op d-op-table) args))