Schoute was a typical geometer. In his early work he investigated quadrics, algebraic curves, complexes, and congruences in the spirit of nineteenth-century projective, metrical, and enumerative geometry.

Schläfli's work of the 1850's was brought to the Netherlands by Pieter Hendrik Schoute (1846-1913) who, in three papers beginning in 1893 and in his elegant two-volume textbook on many-dimensional geometry 'Mehrdimensionale Geometrie' (2 volumes 1902, 1905), studied the sections and projections of regular polytopes and compound polyhedra. ... Alicia Boole Stott (1870-1940), George Boole's third daughter (of five), ... studied sections of four- and higher-dimensional polytopes after her husband showed her Schoute's 1893 paper, and Schoute later (in his last papers) gave an analytic treatment of her constructions.

According to the preface, the author was forced, for lack of space, to compress his manuscript into about three-fourths of the original number of pages; and this accounts for the occasionally rather too compact form of the argument. The subject-matter corresponds roughly to the work given, for ordinary space, in such books as Nixon's 'Geometry in Space'. The book contains extensions of Euler's theorem, of the theory of regular polyhedra, of spherical geometry, and so on; the work is well illustrated by numerous carefully drawn figures. We may mention specially the figures, for ordinary space, of the regular and semi-regular solids.

This paper may be regarded as a continuation of [On the Angles of the Regular Polytopes of Four-Dimensional Space]; it is concerned with polytopes of $S^{4}$ characterized by the property of admitting one kind of vertex and one length of edge, which polytopes will be called "semiregular." These polytopes, corresponding to the Archimedian semiregular polyhedra of ordinary space, have been deduced from the regular ones by very simple geometrical operations called "expansions" and "contractions" in a masterly memoir of A Boole Stott; they will be indicated here by the symbols introduced in that memoir. It follows immediately from the property of admitting one kind of vertex and one length of edge that the portion of four-dimensional space occupied by a semiregular polytope at any vertex is the same for all the vertices of that polytope.

We are happy to mention the decided advancement of the 'Repertoire bibliographique des Sciences mathématique', and in this connection, to applaud the interesting publication, due to a group of mathematicians in Holland, especially P H Schoute, which is entitled 'Revue Semestrielle des Publications Mathématique'.

The question of the reclamation of land now covered by the Zuiderzee is no new one, but it is only recently that a thoroughly practicable scheme has been matured for the accomplishment of this great engineering feat. In 1886 a Committee was appointed to consider and report upon the question ...

Recently (8 September 1892) the Dutch Government has appointed a new Committee to report upon the scheme worked out by the Committee of 1886 ...