Geometric Dynamical Systems

TL;DR

This paper reviews the evolution of integrable Hamiltonian systems from classical topological classifications to modern geometric frameworks involving Lie groupoids, algebroids, and quantum models, highlighting a unified approach across disciplines.

Contribution

It introduces a comprehensive research program unifying classical and modern integrable systems through topology, geometry, and analysis, including new topological molecules and singularity classifications.

Findings

Extended Fomenko theory to new integrable systems on so(4)

Constructed novel topological molecules and described singularities

Unified classical and modern integrable system frameworks

Abstract

This article provides a conceptual and historical review of the evolution of integrable Hamiltonian systems from the Moscow School of A. T. Fomenko to the emerging Azarbaijan School of Geometric Dynamical Systems founded by the author. Beginning with the topological classification of integrable systems through Liouville foliations, atoms, and molecular invariants, the paper traces how these geometric ideas evolved into modern frameworks based on Lie groupoids, Lie algebroids, and fractional calculus. The author s doctoral dissertation at Moscow State University extended 2004 the Fomenko theory to new integrable systems on so(4), constructing novel topological molecules and describing the hierarchy of singularities and bifurcations. Upon his return to Iran, he established a comprehensive research program at Azarbaijan Shahid Madani University, integrating topology, geometry, and analysis to form a coherent Iranian branch of the global theory of integrable systems. This program unifies the classical and the modern: from the Euler Poincare and Hamilton Jacobi formalisms on Lie groupoids and algebroids, to fractional and quantum mechanical models involving Hopf and C algebras. The paper emphasizes conceptual synthesis over computation, showing how integrable geometry has transformed from a purely mechanical theory into a universal language connecting topology, control theory, and quantum structures.