POLYMARKET · PREDICTION MARKET · WEATHER & CLIMATE

Will the highest temperature in Tokyo be 20°C on June 15?

YES · live
0.1¢
NO · live
100.0¢

▸ Advanced metrics · M2M bundle

polymarket · highest-temperature-in-tokyo-on-june-15-2026-20c · fresh · feed 0s old
24h sparkline · 60 pts
realized vol (ann.)
0.00%
max drawdown
0.00%
sharpe
ulcer index
0.00%
RMS drawdown
pain index
0.00%
mean drawdown
mod. VaR 95%
0.00%
Cornish-Fisher
martin ratio
ret / ulcer
CDaR 95%
0.00%
cond. drawdown
gain/pain
Σgain / Σ|loss|
sterling
ret / CDaR
omega (θ=0)
1.00
upside/downside
roll spread
0.0 bps
implied (price-only)
bars used
766
store
spread
24h Δ
flow lean
carry
flat
signalNEUTRALconfidence 20%
Same bundle via M2M API: /api/m2m/pm-highest-temperature-in-tokyo-on-june-15-2026-20c/bundle · venue execution: polymarket
LIVEPOLL0SRCFRESH10ms--:--:-- UTC8NEXT8.0sUP0s--:--HIST0/30
▶ STREAMING·HYPERLIQUID·POLYMARKET·0 POLLS·SRC FRESH·UPTIME 0s·NEXT POLL 8.0s·CC0 OPEN DATA·HYPO.MARKETS·▶ STREAMING·HYPERLIQUID·POLYMARKET·0 POLLS·SRC FRESH·UPTIME 0s·NEXT POLL 8.0s·CC0 OPEN DATA·HYPO.MARKETS·
YES · live
0.1¢
NO · live
100.0¢
YES price · live 24h
n=25 · μ=0.0498 · σ=0.0634 · range [0.0005, 0.1500] · R²=0.787 FALLING -99.67%σ EXTREME 127.27%LAST 0.00050.15000.11260.07520.03790.0005μ = 0.0498max 0.1500min 0.0005dataMA(5)OLS R²=0.79μ lineμ ± σ bandmaxminlive endpoint
25 ticks · last 0.05¢
YES / NO split · live
YES 0.1%NO 100.0%NO100.0%99.95¢ · odds 1/1.00
Σ 100.00% · fair
Σ-sides total = 100.00% (tight rounding)
H(p) entropy = 0.006 / 1.00 bits (1%) · informative — one side favoured
YES
0.1%0.1¢2000.00× +0.00pp
NO
100.0%100.0¢1.00× +0.00pp
Σ 100.00% · arb gap 0.00pp
Per-tick activity · |Δp| in basis points · live
n=24 · Σ=1,795 · μ=74.8 · σ=125.0 · CV=1.67BURSTY · concentratedcumulative energy ↗ · 50% by h=80125250375500μ = 7550050%h1h5h9h13h17h21#1 peak#2-3> μactivequietμ linecum energy
Σ 1795bp moved · peak 500bp · n=24 ticks
Live numerics · pulse on poll
LIVE NUMERICS8 metrics·POLL 0
snapshot age
10ms
YES mid
0.05¢ (0.05%)
NO mid
99.95¢ (99.95%)
ΣΣ sides
100.00%
arb gap
0.000pp
$24h vol $
$28.6k
liquidity $
$12.8k
history points
25 ticks (live)

§1 · 24h price history (YES + NO tokens)

YES price · CLOB mid
n=25 · μ=0.0498 · σ=0.0634 · range [0.0005, 0.1500] · R²=0.787 FALLING -99.67%σ EXTREME 127.27%LAST 0.00050.15000.11260.07520.03790.0005μ = 0.0498max 0.1500min 0.0005dataMA(5)OLS R²=0.79μ lineμ ± σ bandmaxmin
25 YES observations from clob.polymarket.com · last 0.05¢
NO price · CLOB mid
n=25 · μ=0.9502 · σ=0.0634 · range [0.8500, 0.9995] · R²=0.787 RISING +17.59%σ HIGH 6.67%LAST 0.99950.99950.96210.92470.88740.8500μ = 0.9502max 0.9995min 0.8500dataMA(5)OLS R²=0.79μ lineμ ± σ bandmaxmin
25 NO observations from clob.polymarket.com · last 99.95¢

§2 · Distribution of Δp

Histogram of hourly increments
n=24 · 10 bins · μ=-0.0055 · σ=0.0124 · skew=-1.80 (left-skewed) · kurt=2.96 (leptokurtic (fat tails))13107301-4.70ppbin -4.70pp · n=1 · 7.7% peakbin -4.70pp · n=1 · 7.7% peak-4.10pp-3.50pp-2.90pp3-2.30ppbin -2.30pp · n=3 · 23.1% peakbin -2.30pp · n=3 · 23.1% peak1-1.70ppbin -1.70pp · n=1 · 7.7% peakbin -1.70pp · n=1 · 7.7% peak1-1.10ppbin -1.10pp · n=1 · 7.7% peakbin -1.10pp · n=1 · 7.7% peak3-0.50ppbin -0.50pp · n=3 · 23.1% peakbin -0.50pp · n=3 · 23.1% peak130.10ppbin 0.10pp · n=13 · 100.0% peakbin 0.10pp · n=13 · 100.0% peak20.70ppbin 0.70pp · n=2 · 15.4% peakbin 0.70pp · n=2 · 15.4% peakμΔ < 0 · loss barsΔ ≈ 0 · flatΔ > 0 · gain barsN(μ,σ²) referenceμ line · ±σ band shaded
n=24
Q-Q plot · standardised Δp vs N(0,1)
n=24 · skew=-1.87 · kurt=3.25 · near 8 / mid 15 / far 1 · OLS slope=0.87 intercept=-0.00LEPTOKURTIC — FAT TAILSTHIN UPPER TAILMILDLY HEAVY LOWER-3σ-3σ-2σ-2σ-1σ-1σ+0σ+0σ+1σ+1σ+2σ+2σ+3σ+3σsample ↓marginal: sample bars + theoretical N(0,1) curve →theoretical Φ⁻¹(p) →↑ sample z-quantile|Δ| < 0.3σ · on the line|Δ| < 1σ · moderate|Δ| ≥ 1σ · outliery = x refOLS fit
reference line = identity (perfect normality). Heavy upper-right tail = fat positive tail.

§3 · Sample moments

Descriptive statistics · 5-number summary · shape diagnostics
SAMPLE MOMENTS · N=25RIGHT-SKEWED (G₁=0.63)
μ MEAN4.98¢95% CI: [2.50¢, 7.46¢]
σ STD DEV6.34ppσ² = 40.172 · CV = 127.27%
med MEDIAN0.05¢Q₁ 0.05¢ · Q₃ 13.00¢
FIVE-NUMBER SUMMARY · BOX PLOTrange 14.95pp · IQR 12.95pp (1.349σ→8.55pp)
min 0.05¢Q₁ 0.05¢med 0.05¢Q₃ 13.00¢max 15.00¢μ
SKEWNESS · G₁0.630right-skewed
−3−10+1+3
EXCESS KURTOSIS · G₂-1.499platykurtic · thin tails
−30+2+4+6
μ ↔ medianμ > med · right-tailed|μ−med| / σ = 0.78
σ × 1.349 ↔ IQRdiverges from normalratio = 0.66
range ↔ σconcentrated (range < 4σ)range / σ = 2.36
μ = mean YES probability · σ = standard deviation · 95% CI = μ ± 1.96·SE. Skew/kurt diagnose departure from normality.

§5 · Time-series structure

Regime & autocorrelation diagnostics
TIME-SERIES STRUCTUREREGIME: TRENDING · variance ratio > 1
ρ(1) AUTOCORR+0.268within white-noise band
ρ(2) AUTOCORR+0.164lag-2 not significant
H · HURST EXPONENT1.208strongly persistent
OLS TREND · t-STAT-9.228significant @ α=0.05
HURST EXPONENT [0, 1]strongly persistent · H = 1.208
H = 1.208STRONGLY PERSISTENT
0
anti-persistent0.45
mean-reverting0.5
random walk0.55
persistent1
strongly trending
AUTOCORRELATION FUNCTION · ρ(k) for k=1..5WHITE NOISE · no significant lags
k=1+0.268k=2+0.164k=3+0.236k=4+0.220k=5-0.2000+1−1+0.410.41+ momentum (ρ > +0.41)− reversal (ρ < −0.41)noise (within band)±2/√n threshold
OLS TREND · t-STAT · [-5, +5]SIGNIFICANT @ 1% (|t|=9.23)
−5 reject−1.960 retain H₀+1.96+5 reject
REGIME CLASSIFICATIONTRENDING · variance ratio > 1from Hurst + ρ(1) joint diagnosis
PREDICTABILITY · score 1.00very high · strong structure|ρ(1)| + 2·|H − 0.5| heuristic
TREND SIGNIFICANCESIGNIFICANT @ 1% (|t|=9.23)α=0.05 critical |t|=1.96 · α=0.01 |t|=2.58
ρ(k) = lag-k sample autocorrelation · H = R/S Hurst exponent · t = OLS-trend t-statistic. Significance bands at ±2/√n approximate the 95% white-noise envelope. α=0.05 critical |t|=1.96; α=0.01 |t|=2.58.

§6 · Microstructure

Market quality · two-sided pricing · activity
MICROSTRUCTURE · MARKET QUALITYPERFECT · ARB-FREE Σ=100.00%
MARKET ID2528196
SLUGhighest-temperature-in-tokyo-on-june-15-2026-20c
CATEGORYWeather & Climate
TWO-SIDED PRICINGFAVOURS NO (100¢)
PRIMARY · YES0.05¢implied prob 0.05% · decimal odds 2000.00×
COUNTER · NO99.95¢implied prob 99.95% · decimal odds 1.00×
0.05¢
99.95¢
Σ-SIDES ARBITRAGE TESTPERFECT · ARB-FREE Σ=100.00%
0%50%100% · target110%
Σ = 100.00% · |1 − Σ| = 0.000pp
24H ACTIVITY · LIQUIDITYACTIVE
24H VOLUME28.57k USD 24h
LIQUIDITY12.79k USD
MARKET QUALITYPERFECT · ARB-FREE Σ=100.00%|1−Σ| ≤ 0.5pp ⇒ fair · > 2pp ⇒ inefficient
PRICING SKEWFAVOURS NO (100¢)|primary − counter| = 0.999 · entropy 0.006 bits
LIQUIDITY DEPTHACTIVE100k+ deep · 10k+ active · 1k+ modest · 100+ thin
Σ-sides = YES + NO implied probabilities. Perfect arb-free Σ = 100%. |1−Σ| > 2pp suggests synthetic outright arbitrage.

§7 · Position sizing & edge analysis

Probability split · YES vs NO · Kelly · entropy · arbitrage
FAIR MARKET · no edge
YES 0.1%NO 100.0%YES0.1%H = 0.006 / 1.00 bits
Probability scale (YES)
0%25%50%
fair75%100%
Implied decimal odds
YES2000.00×(0¢)NO1.00×(100¢)
Kelly bet-size (% of bankroll) K* = 0.00%
K* full
0.00%
½K half
0.00%
¼K quarter
0.00%
Entropy H(p̂) = 0.006 bits (1% of max) · informative — one side strongly favoured
0 (certain)0.250.50.751.00 (max)
Σ-sides = 100.00% · |1 − Σ| = 0.00pp · tight cross-venue rounding
K* full = (b·p − q)/b · ½K and ¼K are conservative fractions of the full-Kelly bet. Entropy in bits — log₂(2)=1 is maximum uncertainty for a binary market.

§8 · Time decay & θ projection

Time decay & theta projection
⏱ URGENCY · HIGHresolves 2026-06-15 12:00 UTC
0days
07hrs
29min
7.5 hours·θ = 31.051 pp/day
YES$1.00(P = 0.1%)
NO$0.00(P = 100.0%)
current: $0.0005 · expected return per side: $1.00 on YES hit · $0.00 on NO hit
0%25%50%75%100%YES $1NO $0NOW+3.7hRESOLVESP projection · σ=6.34% · path funnel to settle at YES=1 or NO=0
Theta progression · θ ∝ σ / √t_remainingθ_now = 31.051 pp/day
now7.49h left
31.051 pp/day×1.00
−25%5.62h left
35.854 pp/day×1.15
−50%3.74h left
43.912 pp/day×1.41
−75%1.87h left
62.101 pp/day×2.00
−90%0.75h left
98.190 pp/day×3.16
θ approximation: σ/√T (expected daily move magnitude). The cone shows ±√(p̂(1−p̂)) widening as time decays, funneling to {0, 1} at resolution. Theta accelerates as √(t_left)→0.

§9 · Hourly return heatmap

24-hour signed Δp grid · green = up · red = down
HOURLY RETURN HEATMAP · n=24 bars · best 1.00% · worst -5.00% · typical |Δ| 0.75%BEARISH SESSION -14.95%BEST+1.00%5hWORST-5.00%8hTYPICAL |Δ|0.75%mean absoluteCUMULATIVE-14.95%Σ signed ΔSTREAK▬ 0flat-runASIA · 00-08 UTCμ -0.64% · Σ -4.50%EUROPE · 08-16 UTCμ -1.31% · Σ -10.45%US · 16-24 UTCμ +0.00% · Σ +0.00%CUMULATIVE Δ PATH · final -14.95%+0.00%-14.95%-0.50% · 1h-0.50% · 1h-0.50%1h0.50% · 2h0.50% · 2h0.50%2h-0.50% · 3h-0.50% · 3h-0.50%3h-1.50% · 4h-1.50% · 4h-1.50%4h1.00% · 5h1.00% · 5h1.00%5h★ BEST-1.00% · 6h-1.00% · 6h-1.00%6h-2.50% · 7h-2.50% · 7h-2.50%7h-5.00% · 8h-5.00% · 8h-5.00%8h▼ WORST0.00% · 9h0.00% · 9h·9h-2.55% · 10h-2.55% · 10h-2.55%10h-2.55% · 11h-2.55% · 11h-2.55%11h-0.35% · 12h-0.35% · 12h-0.35%12h0.00% · 13h0.00% · 13h·13h0.00% · 14h0.00% · 14h·14h0.00% · 15h0.00% · 15h·15h0.00% · 16h0.00% · 16h·16h0.00% · 17h0.00% · 17h·17h0.00% · 18h0.00% · 18h·18h0.00% · 19h0.00% · 19h·19h0.00% · 20h0.00% · 20h·20h0.00% · 21h0.00% · 21h·21h0.00% · 22h0.00% · 22h·22h0.00% · 23h0.00% · 23h·23h0.00% · 24h0.00% · 24h·24hTIME PATTERNUS-led (+0.00%)RUNSup max 1 · down max 3BREADTH8% up · 38% down · 54% flat
2 up bars · 9 down · best 1.00% · worst -5.00% · typical |Δ| 0.748%

§10 · Equity curve & underwater drawdown

Cumulative compounded return + running peak-to-trough
EQUITY & DRAWDOWN ANALYSIS · n=25 barsSEVERE DRAWDOWN -14.10%FINAL-14.10%MAX DD-14.10%RECOVERYONGOING · 24 barsMAX RUN-UP+0.00%UNDERWATER24/25 (96%)STREAK▬ 0EQUITY CURVE · end 0.8590 · peak 1.0000 · range [0.8590, 1.0000]1.00000.8590break-even = 1★ PEAK 1.0000UNDERWATER DRAWDOWN · max -14.10% · significant0%-14.10%▼ TROUGH -14.10%TOP DRAWDOWN PERIODS · 1 total#1 -14.10%bar 2-25 · 24 bars · ONGOINGDD SEVERITYsignificant (max -14.10%)RECOVERYongoing · 24 barsTIME UNDER WATER96% of session · 24/25 bars
final equity 0.8590 (-14.10%) · max DD -14.10% · time-under-water 24/25 bars

§11 · Rolling-window statistics (w = 6 bars)

Rolling annualised Sharpe ratio · green positive · red negative
n=19 · +0 / −12 (0% positive) · μ=-43.59 · σ=40.44UNPROFITABLE STRATEGYLAST 0.00 (+1.08σ vs μ)124.8962.440.00-62.44-124.89μ = -43.59-33.51-33.51-48.33-48.33-72.82-72.82-66.93-66.93-73.22-73.22-124.89-124.89-111.45-111.45-81.65-81.65-66.48-66.48-66.48-66.48-44.26-44.26-38.21-38.210.000.000.000.000.000.000.000.000.000.000.000.000.000.00v > 0 · positivev < 0 · negativeμ mean lineμ ± σ bandlatest bar (outlined)
latest 0.000 · range [-124.89, 0.00] · μ -43.591 · positive Sharpe = excess-return-per-risk earned by buying-and-holding through this window
Rolling annualised volatility (%)
n=19 · μ=87.3188 · σ=81.3967 · range [0.0000, 200.3838] · R²=0.676 FALLING -100.00%σ EXTREME 93.22%LAST 0.0000200.3838150.2878100.191950.09590.0000μ = 87.3188max 200.3838min 0.0000dataMA(3)OLS R²=0.68μ lineμ ± σ bandmaxmin
latest 0.00% · range [0.00%, 200.38%] · μ 87.32% · σ̂ scaled to annualised (×√8760)
Rolling lag-1 autocorrelation ρ(1)
n=19 · +4 / −8 (21% positive) · μ=-0.056 · σ=0.244MEAN-REVERSIONLAST 0.000 (+0.23σ vs μ)0.5830.2920.000-0.292-0.583μ = -0.056-0.583-0.583-0.153-0.1530.2130.213-0.045-0.045-0.133-0.133-0.445-0.445-0.399-0.399-0.257-0.2570.1980.1980.4810.4810.0940.094-0.033-0.0330.0000.0000.0000.0000.0000.0000.0000.0000.0000.0000.0000.0000.0000.000v > 0 · positivev < 0 · negativeμ mean lineμ ± σ bandlatest bar (outlined)
latest 0.000 · |ρ| > 0.3 ⇒ regime with persistence (ρ > 0) or reversal (ρ < 0) · |ρ| ≤ 0.1 = consistent with random walk

§12 · Hypothesis tests (α = 0.05)

Formal inference at 5% significance
2 of 6 REJECT · mixed evidence2 reject·4 pass·α = 0.05
𝒩

Jarque-Bera

REJECT H₀***

H₀: Δp ~ Normal(μ, σ²)

STATISTIC
34.7956
p-VALUE (log scale)
< 0.0001
α
10⁻⁴10⁻³10⁻²10⁻¹1
p < α · rejection zonenon-normal · fat tails or skew present
ρ

Ljung-Box(h=5)

FAIL TO REJECTns

H₀: No serial autocorrelation up to lag 5

STATISTIC
7.1891
p-VALUE (log scale)
0.2058
α
10⁻⁴10⁻³10⁻²10⁻¹1
p ≥ α · null retainedconsistent with white noise
Ψ

Dickey-Fuller (τ_μ)

FAIL TO REJECTns

H₀: p has a unit root (non-stationary)

STATISTIC
-1.5165
p-VALUE (log scale)
0.5255
α
10⁻⁴10⁻³10⁻²10⁻¹1
p ≥ α · null retainedrandom-walk behaviour (crit ≈ -2.86)
±

Wald-Wolfowitz runs

FAIL TO REJECTns

H₀: Sign sequence of Δ is random

STATISTIC
0.8433
p-VALUE (log scale)
0.3991
α
10⁻⁴10⁻³10⁻²10⁻¹1
p ≥ α · null retainedsigns appear random (5 runs)
χ

KPSS (μ stationarity)

REJECT H₀**

H₀: p IS level-stationary

STATISTIC
0.7813
p-VALUE (log scale)
0.0079
α
10⁻⁴10⁻³10⁻²10⁻¹1
p < α · rejection zonenon-stationary (crit 0.463)
χ

Variance ratio q=3

FAIL TO REJECTns

H₀: Δp is a random walk · VR = 1

STATISTIC
1.8746
p-VALUE (log scale)
0.0609
α
10⁻⁴10⁻³10⁻²10⁻¹1
p ≥ α · null retainedVR 1.570 ≈ 1 (RW behaviour)
Each row states an explicit null H₀, the test statistic, an approximated p-value, and the decision. REJECT means evidence against H₀. KPSS complements ADF (rejecting both ⇒ ambiguous; rejecting one ⇒ clean verdict).

§13 · Spectral analysis (DFT periodogram)

Power spectrum of Δp · ‖X̂(k)‖²/n
n=12 bins · noise floor μ=1.71e-4 · top T=24.00h (32.1%) · top-3 cover 58.9%1 SIGNIFICANT CYCLEcumulative energy ↗ (1 bin above 2× noise)6.6e-44.9e-43.3e-41.6e-40.0e+0μ noise floor2× noise (significance)period 24.0 · power 6.58e-4 · 32.1% energyperiod 24.0 · power 6.58e-4 · 32.1% energyperiod 12.0 · power 2.73e-4 · 13.3% energyperiod 12.0 · power 2.73e-4 · 13.3% energyperiod 8.0 · power 8.69e-5 · 4.2% energyperiod 8.0 · power 8.69e-5 · 4.2% energyperiod 6.0 · power 1.68e-5 · 0.8% energyperiod 6.0 · power 1.68e-5 · 0.8% energyperiod 4.8 · power 5.94e-5 · 2.9% energyperiod 4.8 · power 5.94e-5 · 2.9% energyperiod 4.0 · power 2.13e-4 · 10.4% energyperiod 4.0 · power 2.13e-4 · 10.4% energyperiod 3.4 · power 2.77e-4 · 13.5% energyperiod 3.4 · power 2.77e-4 · 13.5% energyperiod 3.0 · power 9.52e-5 · 4.6% energyperiod 3.0 · power 9.52e-5 · 4.6% energyperiod 2.7 · power 2.63e-5 · 1.3% energyperiod 2.7 · power 2.63e-5 · 1.3% energyperiod 2.4 · power 1.22e-4 · 6.0% energyperiod 2.4 · power 1.22e-4 · 6.0% energyperiod 2.2 · power 1.27e-4 · 6.2% energyperiod 2.2 · power 1.27e-4 · 6.2% energyperiod 2.0 · power 9.80e-5 · 4.8% energyperiod 2.0 · power 9.80e-5 · 4.8% energy50% by T=6.0h#1 dominantT=24.00h#2T=3.43h#3T=12.00hT=2hT=3hT=4hT=6hT=8hT=12hT=16hT=24h← shorter cycle (high freq · Nyquist=½) · period T (bars per cycle) · longer cycle (low freq · 1/n) →#1 dominant#2 peak#3 peak> 2× noisenoiseμ floor2μ sig.cum energy
dominant period ≈ 24.00h (freq 0.042) · concentrates 32.1% of total energy · Σ|X̂|²/n = 2.052e-3

▸ Depth section using sovereign-store price series (766 bars · effective 1753395 bars/year) — annualisation reflects native polling cadence, not upstream timeframes.

§14 · Honest position analytics

A binary-market analytics module framed in horizon time (days to resolution, not annualised). Estimators that need a model probability q as a first-class input (Kelly, KL divergence, Bayesian posterior, Mark-to-Market MC) only render when q is provided externally. Sweep an exploratory q at the interactive simulator →

§15 · Horizon returns

Returns · per bar / per day / per horizon
Horizon 0.3 d · σ/bar 0.000pp · expected |Δp| over horizon 0.00ppterminal variance p(1−p) = 0.0005 · n = 766n = 766
μ per bar
+0.000pp
average Δp · drift
σ per bar
0.000pp
one-bar volatility · logit-free
Per-day movedaily
0.00pp
σ × √24
Per-horizon move0d
0.00pp
σ × √7.4868644444444445
Terminal variancebinary
0.0005
p(1−p) at resolution
Current pricep
0.1¢
latest snapshot
Note: annualised Sharpe/Sortino are omitted — they are not meaningful for a bounded fixed-horizon binary contract that snaps to {0, 1} at resolution.
Annualised metrics are intentionally omitted — they don't apply to bounded probability series that resolve at a fixed date.

§16 · Tail risk

VaR · ES · max drawdown
VaR₉₅ 0.00pp · ES₉₅ 0.00pp · method parametric · drift-correcteddrift +0.000pp/bar · quantised: yes · median step 0.00pp · unique ratio 0.00n = 766
VaR 95%
0.00pp
1.645·σ (parametric) of Δp
ES 95%
0.00pp
mean of the tail
Max drawdown
0.0pp
peak 0.1¢ → trough 0.1¢
Median step
0.00pp
price bucket granularity
Price series is bucketed (cent grid). Empirical quantiles collapse to grid points — parametric N(0, σ²) used instead.
Empirical quantiles unless the price series is bucketed (PM cent grid), in which case parametric N(0, σ²) is used to avoid grid collapse.

§17 · Odds conversion

Odds conversion · every dialect a bettor thinks in
Implied probabilityP
0.1%
= price
Decimal oddsEU
2000.000
total return per $1
AmericanUS
+199900
$100 wins $199900
FractionalUK
1999.00 / 1
profit per $1 risked
Profit per $100stake
+$199900.00
clean dollar framing
-1000-5000+500+1000020406080100you · 0.1%implied probability (%)American odds
underdog (+)favorite (-)your price
Price → implied probability → decimal odds → American moneyline → fractional. Five views of the same number, plus the moneyline curve.

§18 · Binary entropy

Binary entropy · uncertainty as bits of information
Market entropyH(p)
0.006 bit
max 1.0 at p = 0.5
Your entropyH(q)
0.006 bit
Δ +0.000 bit vs market
Surprise · YES−log₂ p
10.97 bit
self-information
Surprise · NO−log₂(1−p)
0.00 bit
self-information
0.000.260.530.791.050.00.20.40.60.81.0marketmodelprobabilityH (bits)
Market entropy only — model entropy requires an external q.

§19 · Model-dependent surfaces

§ Edge / Kelly / KL · no model probability provided

External model required

The position-economics, Kelly, KL-divergence, Bayesian and Monte-Carlo surfaces require a model probability q as input — a number independent of the market price p.

The previous build defaulted q to a tape-momentum heuristic derived from p; that produces apparent edge that is structurally guaranteed to be small and is not a useful skill signal. The auto-derived path has been removed.

To explore these surfaces with a hypothetical q, open the interactive simulator and drag the MODEL P(YES) slider. To wire a real model, POST to the NOSTRADAMUS hook (TBD) or pass ?q=… on the simulator URL.

§∞ · Provenance & attestation

Upstream (snapshot)
gamma-api.polymarket.com
Upstream (history)
clob.polymarket.com
YES token ID
107548883382654832143167245790946751279229882720974974232878417388658319023057
NO token ID
104797106651120324980924191089202446952761433263335782742501529963344210832818
Snapshot fetched
2026-06-15 04:30:47 UTC
Snapshot age
10ms
History points
25 CLOB mids
Page rendered
2026-06-15 04:30:47 UTC
Storage policy
no persistence — fetched on every request
SHA-256 attestation
31127f46b9bff606e9f03311f3ed390e406bf14bbb40f2300010a1cef3355d23 · deterministic hash of source snapshot
Open data licence
CC0 / public domain

§∞-2 · Related markets · explore more

HL PREDSweden99.9¢HL PREDSpain91.6¢HL PREDUruguay65.8¢POLYMARKETUS x Iran permanent peace deal by June 15, 2026?82¢POLYMARKETWill Sweden win on 2026-06-14?100¢POLYMARKETWill Australia win the 2026 FIFA World Cup?HL PERPBTC-USD perpetual$65,665.5HL PERPETH-USD perpetual$1,717.35HL PERPHYPE-USD perpetual$65.19

Also see: /arb opportunities · RSS feed · more in Weather & Climate

Market depth

live order book · Polymarket YES
Depth within 1bp
$0
bid $0 · ask $0
Depth within 5bp
$0
bid $0 · ask $0
Depth within 10bp
$0
bid $0 · ask $0
Depth within 50bp
$0
bid $0 · ask $0
Mid price
(best bid + best ask) / 2
Spread
(bestAsk − bestBid) / mid
Imbalance (whole book)
-1.000
ask-heavy
Imbalance (top-5)
-1.000
ask-heavy top-of-book

Slippage scenarios

live book walk · Polymarket YES

Simulating a market order at three notionals against the live book. Slippage = avg execution price vs. mid, in basis points. Worst fill = price of the deepest level touched. Live JSON: /api/asset/pm-highest-temperature-in-tokyo-on-june-15-2026-20c/slippage?size=10000&side=buy

SideNotionalAvg fillSlippageWorst fillLevelsStatus
BUY$1.00KERR
BUY$10.00KERR
BUY$100.00KERR
SELL$1.00KERR
SELL$10.00KERR
SELL$100.00KERR

Risk metrics

sovereign store · 766 barsperiods/year ≈ 1.75M
Realized vol (annualised)
0.00%
σ per bar = 0.000000
Mean return (annualised)
0.00%
μ per bar = 0.000000
Sharpe (rf=0)
0.00
annualised; risk-free assumed zero
Max drawdown
0.00%
peak 0.00 → trough 0.00 over 0 bars

/api/asset/pm-highest-temperature-in-tokyo-on-june-15-2026-20c/risk · same metrics, JSON