However, Wirtinger was not a specialist who only worked on one problem and did not have a sense for the essentials of science. In his lectures he always stressed the historical context and had a remarkable interest in the philosophical basis of mathematics. He was economical with his publications, but every single paper - even if only a few pages long - does not only contain surprising thought of exceptional beauty but also proof that he could combine his perfect geometrical insight with his rare skill of mastering the mathematical symbolism.

The mathematician Wilhelm Wirtinger, who established his scientific reputation over 10 years ago with the solution of a difficult problem (the general theta function), reported today in the Academy of Sciences on "the development of some mathematical concepts in modern times." The definition of these terms is not always easy, as Wirtinger shows with the example of an infinite set: "Even Galileo had mentioned that the infinite set of integers seems to be far greater than the set of square numbers, since the square numbers are becoming increasingly rare the further one progresses along the series of numbers, while, on the other hand, the size of both sets would have to be the same because each number corresponds to a perfect square."

When the Austrian sub-committee of the Internationale mathematische Unterrichts-Kommission (IMUK) was established in 1909, Wirtinger was nominated as one of the three delegates and thus became a member of IMUK. He continued in this function until the dissolution in 1920. In 1936, after the reestablishment of IMUK, Wirtinger was elected an honorary member of the committee. For the IMUK meeting in Milan in 1911, he was a member of the committee preparing the reports on the mathematical training of students of the natural sciences and gave the report for Austria. In 1933, he published, together with Hans Hahn and Erwin Kruppa (1885-1967), the report on the training of mathematics teachers in Austria.