De Aguilon (1567-1617) had published 'Opticorum Libri Sex' (1613), an influential book on optics and binocular vision. St Vincent's first mathematical investigations deal with problems related to refraction and reflection.

'Theses de cometis' (Louvain, 1619) and 'Theses mechanicae' (Antwerp, 1620) were defended by his student Jean Charles de la Faille, who later made them the basis of his highly regarded 'Theoremata de centro gravitatis' (1632).

... elaborated the theory of conic sections on the basis of Commandino's editions of Archimedes (1558), Apollonius (1566), and Pappus (1588). He also developed a fruitful method of infinitesimals. His students Gualterus van Aelst and Johann Ciermans defended his 'Theoremata mathematica scientiae staticae' (Louvain, 1624); and two other students, Guillaume Boelmans and Ignaz Derkennis, aided him in preparing the 'Problema Austriacum', a quadrature of the circle, which Gregorius regarded as his most important result. He requested permission from Rome to print his manuscript, but the general of the order, Mutio Vitelleschi, hesitated to grant it. Vitelleschi's doubts were strengthened by the opinion that Christoph Grienberger (Clavius's successor) rendered on the basis of preliminary material sent from Louvain.

St Vincent's first investigations had to do with reflection and refraction. One of the problems which arose was the trisection of an angle. In searching for ways to obtain a trisection, St Vincent came across the series
     $\large\frac{1}{1}\normalsize - \large\frac{1}{2}\normalsize + \large\frac{1}{4}\normalsize - \large\frac{1}{8}\normalsize +$ ....
This series according to St Vincent equals $\large\frac{2}{3}\normalsize$, which he called the terminus. In contrast with classical Greek mathematics, St Vincent thus accepts, for the first time in the history of mathematics, the existence of a limit. While Euclid writes that "one will obtain at last something smaller than the smallest quantity", St Vincent goes further and boldly writes: "the quantity will be exhausted"

[Saint-Vincent] is essentially a man of one book: 'Opus geometricum'. But what a book! It contains more than 1200 pages (in folio), and thousands of figures. It was printed in Antwerp in 1647, but was never republished. One thing about the book immediately stirred some uneasiness: the addition to the title, namely: 'quadraturae circuli'. The engraved frontispiece shows sunrays inscribed in a square frame being arranged by graceful angels to produce a circle on the ground: 'mutat quadrata rotundis'. There was uneasiness in the learned world because no one in that world still believed that under the specific Greek rules the quadrature of a circle could possibly be effected, and few relished the thought of trying to locate an error, or errors, in 1200 pages of text. Four years later, in 1651, Christiaan Huygens found a serious defect in the last book of 'Opus geometricum', namely in Proposition 39 of Book X, on page 1121. This gave the book a bad reputation.

Basically these procedures are closely related to the development of the integral calculus and the numerical methods which were subsequently developed for the calculation of logarithms form a fascinating study.

Unfortunately the delayed publication of the 'Opus geometricum' prevented it from receiving the attention it would certainly have merited had it appeared twenty years earlier. In 1647, ten years after the publication of Descartes' 'La Géométrie', algebraic methods were rapidly gaining ground and the form and manner of presentation of Grégoire's work was not such as to make it easy reading. Those who obtained the book did so mainly to study the faulty circle quadrature. many who read it, however, became fascinated by the geometric integration methods and went on to make a deeper study of the entire work. Amongst those who gained much from the 'Opus geometricum' should be counted Blaise Pascal whose 'Traité des trilignes rectangles et leurs onglets' is based essentially on the 'ungula' of Grégoire. Huygens recommended the section on geometric series to Leibniz who later came to make a thorough study of the entire work. Tschirnhaus, friend and associate of Leibniz during his Paris years, found in the 'ductus in planum' a valuable foundation for the development of his own algebraic integration methods.