English

Operator Analysis of MACD

Mathematical Finance 2025-09-29 v1

Abstract

This paper develops a rigorous functional-analytic framework for the MACD (Moving Average Convergence Divergence) indicator, a classical tool in technical analysis. We show that MACD, commonly defined as the difference between two moving averages, can be precisely interpreted as a phase-corrected, smoothed derivative operator. By analyzing nested and recursive moving averages, we establish that MACD is structurally equivalent to a band-pass filter and derive exact formulas expressing it as a finite difference of delayed and doubly averaged signals. We prove new operator identities demonstrating that MACD corresponds to the derivative of a phase-centered, double-smoothed average, appropriately delayed to correct for asymmetries introduced by causal averaging. This characterization unifies MACD with concepts from harmonic analysis and operator theory, providing a principled basis for understanding its role in signal detection, filtering, and trend analysis. The framework naturally generalizes to recursive decompositions, culminating in an expansion that expresses MACD as a weighted sum of delayed, smoothed derivatives, thereby revealing the true analytical structure underlying this widely used yet traditionally heuristic indicator.

Cite

@article{arxiv.2509.21326,
  title  = {Operator Analysis of MACD},
  author = {Yuelong Li},
  journal= {arXiv preprint arXiv:2509.21326},
  year   = {2025}
}
R2 v1 2026-07-01T05:56:36.169Z