I am confused about something. I wanted to generate an example (in Clojure) demonstrating how a fixed point combinator could be used to evaluate the fixed point of a sequence that mathematically converges after an infinite number of applications but would, in fact, converge after a finite number of steps due to finite precision of floating points. I am apparently missing something here.
(defn Y [r] ((fn [f] (f f)) (fn [f] (r (fn [x] ((f f) x)))))) (defn simple-convergent [func] (fn [x] (if (zero? x) 0.0 (* 0.5 (func x)))))
I can then get
user=> ((Y simple-convergent) 0.) 0.0 user=> ((Y simple-convergent) 0.2) java.lang.StackOverflowError (NO_SOURCE_FILE:0)
I don't understand this stack overflow. More generally, related to my earlier post, I am wondering if someone can present a "correct" version of a fixed point combinator which can be used to approximate fixed points of sequences in this fashion.