Reconstructing Quantum Mechanics Without Foundational Problems

TL;DR

This paper reconstructs quantum mechanics through a universal Hamiltonian action mechanics framework based on action-waves, resolving foundational issues like wavefunction collapse and nonlocality, and aligning with empirical data.

Contribution

It introduces a new action-wave equation that unifies classical and quantum mechanics, eliminating the wavefunction collapse problem and clarifying quantum entanglement.

Findings

Eliminates wavefunction collapse and measurement problem

Reconciles quantum entanglement with locality

Aligns with all empirical quantum data

Abstract

I present a reconstruction of general Hamiltonian action mechanics that eliminates all foundational problems of quantum mechanics. The key advance is the completion of Hamiltonian mechanics to the universal mechanics of particles based on action-waves, consistent with the inclusive validity of the principle of stationary action. It is found that irreducible indeterminism is intrinsic and universal at all scales of dynamics. The new action-wave equation is the complete description of single dynamical histories, dissolving the classical-quantum divide. The statistical theory of quantum mechanics emerges as the ensemble average of modified action dynamics. The ensemble average of the new action mechanics leads to a hybrid function consisting of the action-waves and the probability density of the ensemble. This hybrid wavefunction obeys the Schr\"odinger equation, which is not a single particle dynamical equation. The reconstructed mechanics without matter waves is free of the cardinal problem known as the collapse of the wavefunction and with that, the vexing issue of quantum measurement is resolved. Another significant advance is the correct decoding of quantum entanglement and purging of nonseparability and nonlocality in quantum correlations. The action-waves do not carry the burden of divergent zero-point energy. The reconstructed mechanics is in complete agreement with all empirical requirements and in harmony with credible physical ontology.