Constructive algorithm for arbitrage-free caplet volatility stripping via time-value interpolation, data outlier correction, and new compact-kernel bootstrap interpolants.
Faster Monotone Implied Volatility Solver
2 Pith papers cite this work. Polarity classification is still indexing.
abstract
We present ThiopheneIV, a Black-Scholes implied-volatility solver with a monotone core and explicit production guards. The solver starts from the simple Choi-Huh-Su L3 lower-bound seed and applies three Euler-Chebyshev steps on a lower branch and three Halley steps on the remaining upper branch. We prove that, in exact arithmetic, the seed lies below the root and both maps increase monotonically without overshooting. We also detail the practical challenges encountered for a double-precision implementation: parity normalisation, microscopic Bachelier-limit handling, saturated price treatment, and an optional J\"ackel-Newton polish. Across standard grids, market-like data, high-volatility cases, and adversarial corners, ThiopheneIV agrees closely with multiprecision Black reference prices at low latency. We provide detailed comparisons with recent solvers, including J\"ackel's Let's Be Rational. The broader lesson is that a convergence proof gives a clean core, but robust production inversion still depends on boundary handling and on the pricing objective one chooses to match.
fields
q-fin.CP 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
FlashIV is a new Black-Scholes implied volatility solver using input normalization, erfcx residual, and fixed Householder refinement that runs faster than Jäckel's Let's Be Rational while staying close to its reference price.
citing papers explorer
-
A Practical Guide to Strip Caplet Volatilities
Constructive algorithm for arbitrage-free caplet volatility stripping via time-value interpolation, data outlier correction, and new compact-kernel bootstrap interpolants.
-
Implying Volatility: How Fast Can We Go?
FlashIV is a new Black-Scholes implied volatility solver using input normalization, erfcx residual, and fixed Householder refinement that runs faster than Jäckel's Let's Be Rational while staying close to its reference price.