The algebraic cast of Poincar\'e's M\'ethodes nouvelles de la m\'ecanique c\'eleste

TL;DR

This paper analyzes Poincaré's celestial mechanics approach as an algebraic 'cast', highlighting its collective cultural roots and individual creativity within 19th-century algebraic practices, especially relating to linear equations and transformations.

Contribution

It reveals the algebraic foundations of Poincaré's methods, linking his innovations to broader 19th-century algebraic culture and practices rooted in Hermite and Jordan's theories.

Findings

Poincaré's strategy reflects shared algebraic culture of the 19th century.

The algebraic cast influenced the development of new celestial mechanics methods.

Poincaré's creativity was shaped by acculturation to Jordan's algebraic practices.

Abstract

This paper aims at shedding a new light on the novelty of Poincar\'e's M\'ethodes nouvelles de la m\'ecanique c\'eleste. The latter's approach to the three-body-problem has often been celebrated as a starting point of chaos theory in relation to the investigation of dynamical systems. Yet, the novelty of Poincar\'e's strategy can also be analyzed as having been cast out some specific algebraic practices for manipulating systems of linear equations. As the structure of a cast-iron building may be less noticeable than its creative fa\c{c}ade, the algebraic cast of Poincar\'e's strategy was broken out of the mold in generating the new methods of celestial mechanics. But as the various components that are mixed in some casting process can still be detected in the resulting alloy, this algebraic cast points to some collective dimensions of the M\'ethodes nouvelles. It thus allow to analyze Poincar\'e's individual creativity in regard with the collective dimensions of some algebraic cultures. At a global scale, Poincar\'e's strategy is a testimony of the pervading influence of what used to play the role of a shared algebraic culture in the 19th century, i.e., much before the development of linear algebra as a specific discipline. This shared culture was usually identified by references to the ''equation to the secular inequalities in planetary theory.'' This form of identification highlights the long shadow of the great treatises of mechanics published at the end of the 18th century. At a more local scale, Poincar\'e's approach can be analyzed in regard with the specific evolution that Hermite's algebraic theory of forms impulsed to the culture of the secular equation. Moreover, this papers shows that some specific aspects of Poincar\'e's own creativity result from a process of acculturation of the latter to Jordan's practices of reductions of linear substitutions within the local algebraic culture anchored in Hermite's legacy .