11 KiB
Configurable Maximize Criteria Implementation Plan
For agentic workers: REQUIRED SUB-SKILL: Use superpowers:subagent-driven-development (recommended) or superpowers:executing-plans to implement this plan task-by-task. Steps use checkbox (
- [ ]) syntax for tracking.
Goal: Make the maximize criteria a parameter of solve(): a factors dict (E/B/S/C) plus a "product"/"sum" mode, defaulting to the current hardcoded E²·B·S² product.
Architecture: All changes live in solve.py. Module-level defaults (OBJECTIVE_FACTORS, OBJECTIVE_MODE) follow the existing INITIAL/FIXED_CHOICES pattern; solve() resolves None args to them (same convention as resource_constraints). The hand-chained AddMultiplicationEquality objective block is replaced by a generic fold (product mode) or a single linear Maximize (sum mode). Phase-1 ceilings are computed only for resources with a nonzero factor. _report prints the expression that was actually maximized.
Tech Stack: Python 3.13, Google OR-Tools CP-SAT (cp_model).
Spec: docs/superpowers/specs/2026-06-11-configurable-objective-design.md
Testing: Per user instruction, no automated tests — the user validates manually.
Task 1: Module-level defaults and validation helper
Files:
-
Modify:
solve.py(PARAMETERS section, afterRESOURCE_CONSTRAINTSat ~line 68) -
Step 1: Add the defaults and
_validate_objective
Insert after the RESOURCE_CONSTRAINTS = [] line:
# Maximize criteria for solve(). Factor = exponent in "product" mode,
# weight in "sum" mode. Keys: E, B, S, C; missing keys = 0 (resource
# excluded from the objective — it is NOT forced to zero). Negative
# factors are allowed only in "sum" mode (a negative exponent would mean
# division, which integer CP-SAT cannot express).
OBJECTIVE_FACTORS = {"E": 2, "B": 1, "S": 2}
OBJECTIVE_MODE = "product" # "product" or "sum"
def _validate_objective(factors, mode):
if mode not in ("product", "sum"):
raise ValueError(f"objective_mode must be 'product' or 'sum', got {mode!r}")
unknown = set(factors) - {"E", "B", "S", "C"}
if unknown:
raise ValueError(f"unknown objective_factors keys: {sorted(unknown)}")
for k, v in factors.items():
if not isinstance(v, int) or isinstance(v, bool):
raise ValueError(f"objective factor {k}={v!r} must be an int")
if mode == "product" and v < 0:
raise ValueError(
f"objective factor {k}={v} is negative; negative exponents "
"are not expressible in product mode"
)
if not any(factors.values()):
raise ValueError("objective_factors needs at least one nonzero factor")
(The isinstance(v, bool) check exists because bool is a subclass of int in Python; True as a factor is almost certainly a caller bug.)
- Step 2: Commit
git add solve.py
git commit -m "feat: add objective factors/mode defaults and validation"
Task 2: Accept and resolve the new solve() arguments
Files:
-
Modify:
solve.py—solve()signature (~line 981) and top of the function body -
Step 1: Extend the signature
Add two keyword args to solve() (after resource_constraints=None):
def solve(
*,
initial=INITIAL,
arrivals=ARRIVALS,
max_res=MAX_RES,
max_vat=MAX_VAT,
time_limit=60.0,
num_workers=8,
verbose=True,
fixed_choices=FIXED_CHOICES,
resource_constraints=None,
objective_factors=None,
objective_mode=None,
):
- Step 2: Resolve defaults and validate, first thing in the body
Insert at the very top of the function body, before the # ---- build the city list block, so bad input fails before any model construction:
if objective_factors is None:
objective_factors = OBJECTIVE_FACTORS
if objective_mode is None:
objective_mode = OBJECTIVE_MODE
_validate_objective(objective_factors, objective_mode)
# Normalized copy: every key present, missing keys = 0.
obj_factors = {k: objective_factors.get(k, 0) for k in "EBSC"}
- Step 3: Commit
git add solve.py
git commit -m "feat: solve() accepts objective_factors and objective_mode"
Task 3: Compute Phase-1 ceilings only for resources in the objective
Files:
-
Modify:
solve.py— Phase-1 block (~lines 1536-1554,def _ceilingthrough the threem.Add(final* <= cap*)lines) and the verbose ceilings print (~line 1596) -
Step 1: Replace the fixed capE/capB/capS computation with a caps dict
The existing line finalE, finalB, finalS = E[NUM_STEPS + 1], ... stays. Just below it, replace this block:
capE = _ceiling(finalE)
capB = _ceiling(finalB)
capS = _ceiling(finalS)
m.Add(finalE <= capE)
m.Add(finalB <= capB)
m.Add(finalS <= capS)
with (keeping def _ceiling(var): as is, above it):
finals = {"E": finalE, "B": finalB, "S": finalS, "C": C[NUM_STEPS + 1]}
# Ceilings only for resources that appear in the objective: each
# ceiling solve costs up to 20s, and only objective resources need
# bounds (product mode) / benefit from the redundant cap constraint.
caps = {}
for k, var in finals.items():
if obj_factors[k] != 0:
caps[k] = _ceiling(var)
m.Add(var <= caps[k])
- Step 2: Update the verbose ceilings print
Replace:
print(f"(resource ceilings used: E<={capE} B<={capB} S<={capS})")
with:
caps_str = " ".join(f"{k}<={v}" for k, v in caps.items())
print(f"(resource ceilings used: {caps_str})")
- Step 3: Commit
git add solve.py
git commit -m "feat: compute resource ceilings only for objective resources"
Task 4: Generic objective builder (product fold / linear sum)
Files:
-
Modify:
solve.py— the "OBJECTIVE IS SET HERE" block (~lines 1556-1578) -
Step 1: Replace the hardcoded objective block
Delete the whole block from def Eprod(v): through m.Maximize(obj) (including Eprod/Bprod/Sprod and the prodEE/prodSS/prodBB/prodEB/obj variables) and replace with:
# ======================================================================
# OBJECTIVE IS SET HERE
# ======================================================================
if objective_mode == "sum":
# Linear: CP-SAT takes weighted sums (negative weights included)
# directly, no auxiliary variables needed.
m.Maximize(sum(f * finals[k] for k, f in obj_factors.items() if f))
else:
# Product: maximize prod(finals[k] ** obj_factors[k]). Expand the
# exponents into a flat factor list and fold pairwise, carrying a
# running upper bound from the Phase-1 caps.
factor_keys = [k for k, f in obj_factors.items() for _ in range(f)]
obj = finals[factor_keys[0]]
bound = caps[factor_keys[0]]
for k in factor_keys[1:]:
bound *= caps[k]
nxt = m.NewIntVar(0, bound, "")
m.AddMultiplicationEquality(nxt, [obj, finals[k]])
obj = nxt
m.Maximize(obj)
Notes for the implementer:
-
factor_keysfor the default{"E": 2, "B": 1, "S": 2}is["E", "E", "B", "S", "S"], reproducing the oldE²·B·S²objective. -
A single-factor product (e.g.
{"E": 1}) skips the loop entirely and maximizesfinalEdirectly — that's correct. -
Every key in
factor_keyshas a nonzero factor, socaps[k]always exists (Task 3 computed caps for exactly those keys). -
Step 2: Commit
git add solve.py
git commit -m "feat: build objective from factors dict in product or sum mode"
Task 5: Report the actually-maximized objective
Files:
-
Modify:
solve.py—_report()signature (~line 1651) and its FINAL print (~lines 1854-1858); the_report(...)call insidesolve()(~line 1597) -
Step 1: Add objective params to
_report's signature
Append two keyword params after baron_deposits=None:
baron_deposits=None,
obj_factors=None,
obj_mode=None,
):
- Step 2: Replace the FINAL print
Replace:
fe, fb, fs = solver.Value(finalE), solver.Value(finalB), solver.Value(finalS)
print(
f"\nFINAL E={fe / 10:.1f} B={fb / 10:.1f} S={fs / 10:.1f} "
f"product(scaled) = {fe * fb * fs / 1000} sum = {(fe + fb + fs) / 10:.1f}"
)
with:
fe, fb, fs = solver.Value(finalE), solver.Value(finalB), solver.Value(finalS)
vals = {"E": fe, "B": fb, "S": fs, "C": solver.Value(C[NUM_STEPS + 1])}
if obj_factors is None:
# Legacy fallback: old hardcoded E*B*S display.
obj_str = f"product(scaled) = {fe * fb * fs / 1000}"
elif obj_mode == "sum":
terms = [
f"{f}{k}" if abs(f) != 1 else (k if f > 0 else f"-{k}")
for k, f in obj_factors.items()
if f
]
expr = " + ".join(terms).replace("+ -", "- ")
raw = sum(f * vals[k] for k, f in obj_factors.items())
obj_str = f"objective {expr} = {raw / 10:.1f}"
else:
expr = "*".join(
k if f == 1 else f"{k}^{f}" for k, f in obj_factors.items() if f
)
raw, n = 1, 0
for k, f in obj_factors.items():
raw *= vals[k] ** f
n += f
# Resource values are x10-scaled, so descale by 10^(sum of exponents).
obj_str = f"objective {expr} = {raw / 10**n}"
print(
f"\nFINAL E={fe / 10:.1f} B={fb / 10:.1f} S={fs / 10:.1f} "
f"{obj_str} sum = {(fe + fb + fs) / 10:.1f}"
)
Display examples: product {"E": 2, "B": 1, "S": 2} → objective E^2*B*S^2 = ... descaled by 10^5; sum {"E": 2, "B": 1, "S": -1} → objective 2E + B - S = ... descaled by 10.
- Step 3: Pass the objective through from
solve()
At the _report(...) call inside solve(), append two keyword arguments after baron_deposits,:
baron_deposits,
obj_factors=obj_factors,
obj_mode=objective_mode,
)
- Step 4: Commit
git add solve.py
git commit -m "feat: report prints the actually maximized objective"
Task 6: Smoke check (user validation)
Per user instruction there are no automated tests. A quick way to confirm the default path is byte-for-byte behavior-compatible:
- Step 1: Syntax check
Run: uv run python -c "import solve"
Expected: no output, exit 0.
- Step 2: Hand off to user
The user validates solver behavior themselves (e.g. uv run python solve.py should produce the same plan/objective as before the change, now printing objective E^2*B*S^2 = ...).