Neville's principal areas of expertise were geometrical, with
differential geometry dominating much of his early work. Early on in his Trinity fellowship, in a dissertation on moving axes, he extended
Darboux's method of the moving triad and coefficients of spin by removing the restriction of the orthogonal frame. He published
The Fourth Dimension (1921) to develop geometrical methods in
four-dimensional space. During his time in Cambridge, he had been greatly influenced by
Bertrand Russell's work on the logical
foundations of mathematics and in 1922 he published his
Prolegomena to Analytical Geometry. It is a detailed treatise on foundations of
analytical geometry, including
complex geometry, providing an axiomatic development of the subject. In 1914, as a visiting lecturer, he travelled to India, where, in response to a request from Hardy, he managed to persuade the Indian mathematician
Ramanujan to accompany him back to England, thus playing a vital role in the initiation of one of the most celebrated mathematical collaborations of the last hundred years. Ramanujan later befriended Hardy.
Neville's algorithm for
polynomial interpolation is widely used. Neville did not join the army when the
First World War erupted in the summer of 1914. Poor eyesight would have prevented him from active service, but he declared his opposition to the conflict and refused to fight. It was probably this
pacifist declaration that resulted in the non-renewal of his Trinity fellowship in 1919. ==Chairmanship at Reading==