Related papers: A complex-linear reformulation of Hamilton--Jacobi theory and the emergence of quantum structure

A complex-linear reformulation of Hamilton--Jacobi theory and the emergence of quantum structure

URL: http://arxiv.org/abs/2601.22697v1
Date: Fri, 30 Jan 2026 08:14:55 GMT
Title: A complex-linear reformulation of Hamilton--Jacobi theory and the emergence of quantum structure
Authors: Yong Zhang,
Abstract summary: We develop a complementary formulation, the Hamilton-Jacobi-Schrdinger (HJS) theory, by embedding the pair $(R,S)$ into a single complex field.<n>Remarkably, when $mathrmRe()neq 0$, essential features of quantum mechanics, including superposition, operator algebra, commutators, the Heisenberg uncertainty principle, arise naturally as consistency conditions.
Score: 6.0523316051636025
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Classical mechanics admits multiple equivalent formulations, from Newton's equations to the variational Lagrange-Hamilton framework and the scalar Hamilton-Jacobi (HJ) theory. In the HJ formulation, classical ensembles evolve through the continuity equation for a real density $ρ= R^{2}$ coupled to Hamilton's principal function $S$. Here we develop a complementary formulation, the Hamilton-Jacobi-Schrödinger (HJS) theory, by embedding the pair $(R,S)$ into a single complex field. Starting from a completely general complex ansatz $ψ= f(R,S) e^{i g(R,S)}$, and imposing two minimal structural requirements, we obtain a unique map $ψ= R e^{iS/κ}$ together with a linear HJS equation whose $|κ| \to 0$ limit reproduces the HJ formulation exactly. Remarkably, when $\mathrm{Re}(κ)\neq 0$, essential features of quantum mechanics, including superposition, operator algebra, commutators, the Heisenberg uncertainty principle, Born's rule, and unitary evolution, arise naturally as consistency conditions. HJS thus provides a unified mathematical viewpoint in which classical and quantum dynamics appear as different limits of a single underlying structure.

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