Article Outline
Example Python program python_recursion_experiments (1).py
Methods
- def should_successfully_count_fewest_jumps_to_goal(fn, tests=[(9,2),(13,2),(19,4)],longer_tests=[(34,3),(43,5)]):
- def recursion_bottomup_goaltestpre(goal_distance=20, start_distance = 1, jump_lengths = [1,4,5,11]):
- def recurse(distance=start_distance, count=0):
- def recursion_bottomup_goaltestin(goal_distance=20, start_distance = 1, jump_lengths = [1,4,5,11]):
- def recurse(distance=start_distance, count=0):
- def recursion_cached_bottomup_goaltestin(goal_distance=20, start_distance=1, jump_lengths=[1,4,5,11], fewest_jumps={}):
- def recurse (distance=start_distance, count=0):
- def looping_cached_bottomup_goaltestin(goal_distance=20, start_distance=1, jump_lengths=[1,4,5,11], fewest_jumps={}):
def ensureValidStart(goal_distance,start_distance=1,jump_lengths=[1,4,5,11]):
Code
Python example
# Deep Dive into recursion and looping solutions for optimization problems
# Written to help me describe optimization functions' parts, and those parts' permutations,
# to facilitate both making choices between them and effectively articulating those choices
##
# Code Design
##
# - function parts broken down completely
# - only one thing can change per example. Even identical variable names describe identical things in all examples
# - full word variables to save limited working memory for learning (vs storing variable semantics)
# (1. all functions "jump" from "start_distance" to "goal_distance" in the "fewest_jumps" possible)
# (2. all functions "i" from "a" to "n" in the "x" possible)
# - only the minimum variables necessary for the permutation to run
# - all the code runs (tested with asserts in the file)
##
# Permutation Definitions
# NOTE: Each function has one permutation of all of these
# If you write a function I haven't added and/or think of a missing permutation, please add them to the comments.
##
# - PROGRESSION STRATEGY (Recursion|Looping)
# - CACHED (cached) - intermittent results are cached/memoized, or not
# - DIRECTION (bottom-up|top-down)
# - GOAL TEST LOCATION pre|in|post "loop"
# note that "loop" is used twice, once for the test location, and once for the "looping" strategy
# Please comment if you know better language that differentiates the two
# ... Permutations with names and concepts I'm still disentangling
# - ______ ? VARIABLE TYPES I don't know if there are standard names for different types of variables.
# e.g, distance is ____? count is ___? jump_lengths is ___? Maybe Independent vs dependent variables?
# - ______ ? VARIABLE PLACEMENT like dependent in an inner loop and independent in outer (if it matters)
# - _______? ROOT (one|multi) (from a graph standpoint, one or multiple nodes can be a start)
# - _______? TEST STRATEGY___? look behind vs look ahead when testing for the goal... or in recursion, when "wasted" function calls happen
# - _______? ENTRY CONDITIONS (still hashing out what I even mean by this)
# - ____anything-else____?
##
# Test (Just one, since all examples thus far do the same thing in different ways)
##
def should_successfully_count_fewest_jumps_to_goal(fn, tests=[(9,2),(13,2),(19,4)],longer_tests=[(34,3),(43,5)]):
for pair in tests:assert(fn(pair[0])==pair[1]);
for pair in longer_tests:assert(fn(pair[0])==pair[1]);
##
# Constants
##
BABY_JUMPS = 10000 # the number of jumps a baby took to go some distance. Used for defaults and worst case comparisons.
# ^^ Please ignore ethics and practicality of getting a baby to jump. That many times.
##
# Functions
##
## Permutation: recursion|bottom-up|goal-test-pre
def recursion_bottomup_goaltestpre(goal_distance=20, start_distance = 1, jump_lengths = [1,4,5,11]):
def recurse(distance=start_distance, count=0):
if(distance == goal_distance): return count
if(distance > goal_distance): return BABY_JUMPS
return min(recurse(distance + jump, count + 1) for jump in jump_lengths)
jumps_to_goal = recurse()
return jumps_to_goal
should_successfully_count_fewest_jumps_to_goal(recurseBottomUpGoalTestPreLoop,longer_tests=[])
## Permutation: recursion|bottom-up|goal-test-in
def recursion_bottomup_goaltestin(goal_distance=20, start_distance = 1, jump_lengths = [1,4,5,11]):
def recurse(distance=start_distance, count=0):
if(distance == goal_distance): return count
return min(recurse((distance+jump,count+1) for jump in jump_lengths if distance+jump <= goal_distance),default=BABY_JUMPS)
jumps_to_goal = recurse()
return jumps_to_goal
should_successfully_count_fewest_jumps_to_goal(recursion_bottomup_goaltestin,longer_tests=[])
## Permutation: recursion|bottom-up|goal-test-post
## Permutation: recursion|top-down|goal-test-pre
## Permutation: recursion|top-down|goal-test-in
## Permutation: recursion|top-down|goal-test-post
## Permutation: (impossible) looping|bottom-up|goal-test-pre
## Permutation: (impossible) looping|bottom-up|goal-test-in
## Permutation: (impossible) looping|bottom-up|goal-test-post
## Permutation: (impossible) looping|top-down|goal-test-pre
## Permutation: (impossible) looping|top-down|goal-test-in
## Permutation: (impossible) looping|top-down|goal-test-post
# These ^^ looping permutations are impossible to get consistent optimal results from.
# Without a cache, they form greedy functions. Why do the recursive ones yield optimal results?
# Recursively nested function scopes implicitly cache all results along their recursion path.
# Each min() call compares the results at each cache distance. (like the combine phase of merge sort)
## Permutation: cached|recursion|bottom-up|goal-test-pre
## Permutation: cached|recursion|bottom-up|goal-test-in
def recursion_cached_bottomup_goaltestin(goal_distance=20, start_distance=1, jump_lengths=[1,4,5,11], fewest_jumps={}):
should_cache = lambda distance,count: distance not in fewest_jumps or count<fewest_jumps[distance]
def recurse (distance=start_distance, count=0):
fewest_jumps[distance] = count
if(distance==goal):return count
return min((recurse(distance+jump, count+1) for jump in jump_lengths if distance<=goal and should_cache(distance+jump,count+1)),default=BABY_JUMPS)
jumps_to_goal = recurse()
return jumps_to_goal
should_successfully_count_fewest_jumps_to_goal(recursion_cached_bottomup_goaltestin)
## Permutation: cached|recursion|bottom-up|goal-test-post
## Permutation: cached|recursion|top-down|goal-test-pre
## Permutation: cached|recursion|top-down|goal-test-in
## Permutation: cached|recursion|top-down|goal-test-post
## Permutation: cached|looping|bottom-up|goal-test-pre
## Permutation: cached|looping|bottom-up|goal-test-in
def looping_cached_bottomup_goaltestin(goal_distance=20, start_distance=1, jump_lengths=[1,4,5,11], fewest_jumps={}):
should_cache = lambda distance,count: distance not in fewest_jumps or count<fewest_jumps[distance]
fewest_jumps[start_distance]=0
for distance in range(start_distance,goal_distance+1):
count=fewest_jumps[distance]
for jump in jump_lengths:
if should_cache(distance+jump, count+1): fewest_jumps[distance+jump]=count+1
jumps_to_goal = fewest_jumps[goal_distance]
return jumps_to_goal
should_successfully_count_fewest_jumps_to_goal(looping_cached_bottomup_goaltestin)
## Permutation: cached|looping|bottom-up|goal-test-post
## Permutation: cached|looping|top-down|goal-test-pre
## Permutation: cached|looping|top-down|goal-test-in
## Permutation: cached|looping|top-down|goal-test-post
#
# def ensureValidStart(goal_distance,start_distance=1,jump_lengths=[1,4,5,11]):
# if(start_distance < 0 or start_distance > goal_distance): raise ValueError("start must be in interval [0,n]")
# if(len(jump_lengths)==0): raise ValueError("jump_lengths cannot be empty")
# if not min(goal_distance % jump for jump in jump_lengths) == 0:
# raise ValueError("goal_distance not reachable from given jump_lengths")
# jump_lengths = sorted(jump_lengths)
# if(goal_distance<jump_lengths[0]): raise ValueError("goal_distance must be >= the smallest jump_length")
#
# BABY_JUMPS = 10000 # the number of jumps a baby took to get to ___ (used for defaults and worst cases)
# cache = {}
# return goal_distance,start_distance,jump_lengths,BABY_JUMPS,cache
Useful Links
- Articles: https://python-commandments.org/
- Python shell: https://bsdnerds.org/learn-python/
- Tutorial: https://pythonprogramminglanguage.com/