Everything attracted and excited his curiosity, his insatiable thirst for knowledge and his love of life. Mathematics, technics, art, music, really every expression of human creativity, fascinated him to the extent of desiring to master whatever subject he explored.

The aim of this book is to describe some of the developments in mathematics during this century which have had or are likely to have a significant impact on the work of a theoretical engineer or technologist. The material should therefore be regarded as supplementing the methods of classical analysis, algebra and geometry which are now the bread and butter of research workers. ...

The book opens with a discussion of elementary set theory, Lebesgue integration and Stieltjes integration and then goes on to the first major topic, the operator calculus, following the ideas of Mikusinski and others. The authors prove Titchmarsh's theorem, which is central to the theory, and include a number of worked examples. The next major topic is the theory of distributions. Here, after laying the groundwork, the authors discuss sequences, Fourier transforms and the regularization of functions, and conclude with a number of applications. The last topic in the book is the theory of non-linear ordinary differential equations, beginning with questions of existence consequences and stability. The structure of the solutions is then examined, including singular points and limit cycles, and the book concludes with an account of the elementary theory of non-linear oscillations.

Most textbooks with titles "Mathematical methods for engineers" (or for technicians, or for other users of mathematics at the elementary level) contain a mixture of topics which depend on the applications the author has in mind and on the mathematical background of the author. The unusual feature of this volume is the unified content: linear algebra, graph theory and network theory, with heavy reliance on linear algebra methods throughout.

The first section, comprising over half the book, deals with the theory of linear operators. The matters discussed are metric and normed spaces with particular reference to Hilbert spaces, Hahn-Banach theory, operators (including inverse, dual and compact operators) and eigenvalues and eigenvectors. The second section, which is over a quarter of the book, discusses linear integral equations. Amongst the topics covered are Volterra integral equations and their relation with ordinary differential equations, Fredholm equations, self-conjugate and non-self-conjugate integral operators, and the associated eigenvalue theory. The third section is on applications of integral equations. This covers topics such as the Green function technique for a one-dimensional Sturm-Liouville problem, and Dirichlet and Carl Neumann problems for the two- and three-dimensional Laplacian operator.

These three volumes complete the encyclopaedic work (roughly 1700 pages) by Fenyő and Stolle on the theory and application of linear integral equations. Their thesis is that the classical theory of linear integral equations produced many ideas for the later development of the theory of linear operators, and in turn functional analysis has helped the further development of integral equations.

An extremely cordial man, full of drive and initiative, he was a source of constant inspiration to those who had the good fortune of knowing him. He spoke several languages fluently and therefore was able to communicate directly, sharing the richness of his mind, with people of varied linguistic background. A brilliant conversationalist, with his lively anecdotal style he was able to captivate all who had the pleasure of talking to him.

... he was an extraordinarily eclectic spirit, as witnessed by the interest which, in his later years, he expressed in the mathematical aspects of Leonardo da Vinci's manuscripts. Such investigative curiosity is also clearly reflected in his mathematical studies. The soundness of his basic culture, coupled with his innate curiosity, led István Fenyő to seek the solution of problems in various areas of mathematics. Therefore it is not surprising to find, in addition to his scientific works in Mathematical Analysis, also works on the History of Mathematics, on the Philosophy of Science, and countless others on the applications of mathematics to Medicine, Engineering and Computer Science.