Anders Olsson
a6e008f8ff
New public types:
- ConvergenceOptions { max_iter, epsilon } — config for the loop
- ConvergenceReport { iterations, final_step, log_evidence, converged,
per_iteration_time, slices_skipped } — post-hoc summary
History and HistoryBuilder gain a third generic parameter
O: Observer<T> = NullObserver. Builder methods:
- .convergence(opts) sets the ConvergenceOptions
- .observer(o) plugs in an Observer (reshapes the builder's O param)
History::converge() runs the existing iteration loop driven by the
stored opts, emits observer callbacks on each iteration end and on
completion, and returns Result<ConvergenceReport, InferenceError>.
The old convergence(iters, eps, verbose) stays — gets removed in
Task 20 after tests are translated.
Part of T2 of docs/superpowers/specs/2026-04-23-trueskill-engine-redesign-design.md.
TrueSkill - Through Time
Rust port of TrueSkillThroughTime.py.
Other implementations
- ttt-scala
- ChessAnalysis #F
- TrueSkillThroughTime.jl
- TrueSkillThroughTime.R
- TrueSkill Through Time: Revisiting the History of Chess
- TrueSkill Through Time. The full scientific documentation
Drift
Skill drift models how a player's true skill can change between appearances. Each time a player reappears after a gap, their skill uncertainty is widened by the drift model before the new evidence is incorporated.
Drift is represented by the Drift trait:
pub trait Drift: Copy + Debug {
fn variance_delta(&self, elapsed: i64) -> f64;
}
variance_delta returns the amount to add to σ² given the elapsed time since the player last played. Internally, Gaussian::forget uses this to compute the new sigma: σ_new = sqrt(σ² + variance_delta).
ConstantDrift
The built-in ConstantDrift implements a linear random walk — skill uncertainty grows proportionally to time:
variance_delta = elapsed * γ²
This is the standard TrueSkill Through Time model. Use it by passing a ConstantDrift(gamma) when constructing a Player:
use trueskill_tt::{Player, Gaussian, drift::ConstantDrift};
// gamma = 0.1 means skill can shift ~0.1 per time unit
let player = Player::new(Gaussian::from_ms(0.0, 6.0), 1.0, ConstantDrift(0.1));
Custom drift
Implement Drift to express any other model. For example, a drift that saturates after a long absence (uncertainty grows with the square root of elapsed time instead of linearly):
use trueskill_tt::drift::Drift;
#[derive(Clone, Copy, Debug)]
struct SqrtDrift {
gamma: f64,
}
impl Drift for SqrtDrift {
fn variance_delta(&self, elapsed: i64) -> f64 {
(elapsed as f64).sqrt() * self.gamma * self.gamma
}
}
let player = Player::new(Gaussian::from_ms(0.0, 6.0), 1.0, SqrtDrift { gamma: 0.5 });
To use a custom drift type with History, use the .drift() builder method instead of .gamma():
let h = History::builder()
.drift(SqrtDrift { gamma: 0.5 })
.build();
Todo
- Implement approx for Gaussian
- Add more tests from
TrueSkillThroughTime.jl - Add tests for
quality()(Use sublee/trueskill as reference) - Benchmark Batch::iteration()
- Time needs to be an enum so we can have multiple states (see
batch::compute_elapsed()) - Add examples (use same TrueSkillThroughTime.(py|jl))
- Add Observer (see argmin for inspiration)