Schläfli did pioneering research in the geometry of spaces of more than three dimensions, recorded in a treatise
Theorie der vielfachen Kontinuität that he wrote between 1850 and 1852. It was rejected by both the
Austrian Academy of Sciences and the
Berlin Academy of Science, and published in full only in 1901, after Schläfli's death. Only then was its importance recognized, for instance by
Pieter Hendrik Schoute, who wrote that "This treatise surpasses in scientific value a good portion of everything that has been published up to the present day in the field of multidimensional geometry." In this work, Schläfli identified and classified the
regular polytopes of all higher dimensional Euclidean spaces, and classified them using a notation that is still widely used, the
Schläfli symbol. He described and provided constructions for the six regular convex
4-polytopes, the dimensional analogues of the five
Platonic solids. Among these he discovered the unique
24-cell,
600-cell and
120-cell, the 4-dimensional analogues of the
cuboctahedron,
icosahedron and
dodecahedron respectively, as well as the
analogues of the tetrahedron,
octahedron and
cube which occur in all dimensions. At around the same time, he clarified the formulation of three-dimensional
spherical geometry by observing that it could be interpreted as the geometry of a
hypersphere in four-dimensional space. The Schläfli functions, giving the volume of a spherical or Euclidean
simplex in terms of its
dihedral angles, and the
Schläfli orthoscheme, a special simplex with a path of right-angled dihedrals, come from Schläfli's work on higher dimensions. Among the many topics of Schläfli's other later works were the discovery of the
Schläfli double six from Cayley's 27 lines on a
cubic surface, a series of papers on
special functions, work on the
modular group prefiguring later discoveries of Dirichlet, and work on
Weber modular functions and
class field theory prefiguring later discoveries of
Heinrich Martin Weber. ==Recognition==