I just wrote this code:
(defn parameters [transform-factory state] (lazy-seq (let [[r1 state] (uniform state) [r2 state] (uniform state) [t state] (transform-factory state)] (cons [t [r1 r2]] (parameters transform-factory state))))) (defn repeated-transform [mosaic n transform-factory state] (reduce transform-square mosaic (take n (parameters transform-factory state))))
parameters function generates a lazy sequence of values generated from the
state, which are used to parameterise a repeated transformation of something (a "mosaic" in this case).
it seems to me that
parameters shows a fairly common pattern which surfaces when you have some
state that must be carried around (in this case to generate random values). is there a name for this?
is there a better way to write the first function? related problems can often be solved with
reduce, which "carries along" the state, but here i have nothing to reduce. similarly,
reductions doesn't seem to fit. is this a good case for a monad? (from a theoretical pov i don't see how you define a way to combine multiple instances into one, but perhaps that doesn't change the practical application - it does seem like the kind of problem monads solve elsewhere, where some state needs to be carried around).
(ps i mentioned random numbers, but i can't replace this with a solution that uses mutable state behind the scenes - as "normal" random routines do - for reasons unrelated to the question).