Knopp left Germany in the spring of 1908 and travelled to Japan where he taught in Nagasaki in western Kyushu, at the Handelshochschule during 1908-09. He then travelled in India and China. In 1910 he returned to Germany and married the painter Gertrud Kressner (1879-1974), the daughter of Colonel Karl Kressner and Hedwig Rebling; they had one son and one daughter. Konrad and Gertrud Knopp then moved to Tsingtao, eastern Shantung province, China where he taught at the German-Chinese academy during 1910-11. Germany had occupied Tsingtao in 1897, modern port facilities had been installed and a modern European-style city had been created. In 1911 Knopp and his wife returned from Tsingtao to Germany and he taught at the Military Technical Academy and the Military Academy while working on his habilitation thesis which he submitted to Berlin University. Knopp became an officer in the army during World War I, being wounded in action near the beginning of the war.
After being wounded he was discharged from the army and by the autumn of 1914 he was teaching at Berlin University. In the following year he was appointed as an extraordinary professor at Königsberg, becoming an ordinary professor there in 1919. Examples of some papers he published during this period are: Bemerkungen zur Struktur einer linearen perfekten nirgends dichten Punktmenge Ⓣ (1916); Ein einfaches Verfahren zur Bildüng stetiger nirgends differenzierbarer Funktionen Ⓣ (1918); Mittelwertbildung und Reihentransformation Ⓣ (1920); and Über das Eulersche Summierungsverfahren Ⓣ (1923). He was appointed to a chair of mathematics at Tübingen University in 1926 and he remained there until he retired in 1950. Examples of publications during this time are Zur Theorie der Limitlerungsverfahren (1930); and Über die maximalen Abstände und Verhältnisse verschiedener Mittelwerte Ⓣ (1935).
Knopp worked on generalised limits and wrote excellent books on complex functions. Theorie und Anwendung der Unendlichen Reihen Ⓣ was published in 1922. Elemente der Funktionentheorie Ⓣ was published in 1936 with an English translation appearing in 1953. The chapters of the book are:
Chapter I: Complex numbers and their geometric representation.Details of three further textbooks by Knopp are given in the article: Texts by Knopp.
Chapter II: Linear functions.
Chapter III: Sets, sequences and power series.
Chapter IV: Analytic functions and conformal mapping.
Chapter V: Elementary functions.
He produced the sixth edition of Hans von Mangoldt's famous Höhere Mathematik: eine Einführung für Studierende und zum Selbststudium Ⓣ. The book continued to appear as a jointly authored text by von Mangoldt and Knopp, and the three volumes which were reprinted in 1990 were the seventeenth, sixteenth and fifteenth editions of these volumes respectively. Volume 1 covers numbers, functions, limits, analytic geometry, algebra, set theory; volume 2 covers differential calculus, infinite series, elements of differential geometry and of function theory; and volume 3 covers integral calculus and its applications, function theory, differential equations. Friedrich Lösch added a fourth volume in 1980 to cover more modern material: set theory, Lebesgue measure and integral, topological spaces, vector spaces, functional analysis, integral equations. The review of the 1990 reprint states:-
This famous and comprehensive introduction to analysis by von Mangoldt and Knopp has been popular for generations of German-speaking students, in mathematics, physics and other natural sciences, and engineering.He was the co-founder of Mathematische Zeitschrift in 1918, being the editor from 1934 to 1952.
After he retired Knopp continued to publish interesting papers such as Zwei Abelsche Sätze (1952) in which he proved abelian theorems for Laplace and Abel transforms which are closely related to the well-known Tauberian theorems of Karamata. He was invited to lecture in March 1952 at a meeting held in conjunction with the first meeting of the International Mathematical Union. He chose to give the expository lecture Folgenräume und Limitierungsverfahren. Ein Bericht über Tübinger Ergebnisse Ⓣ.
Article by: J J O'Connor and E F Robertson