Kurt Gödel : results on foundations

Kurt Goedel (1906-1978) gained world-wide fame by his incompleteness theorem of 1931. Later, he set as his aim to solve what are known as Hilbert's first and second problems, namely Cantor's continuum hypothesis about the cardinality of real numbers, and secondly the consistency of the theory of real numbers and functions. By 1940, he was halfway through the first problem, in what was his last published result in logic and foundations. His intense attempts thereafter at solving these two problems have remained behind the veil of a forgotten German shorthand he used in all of his writing. Results on Foundations is a set of four shorthand notebooks written in 1940-42 that collect results Goedel considered finished. Its main topic is set theory in which Goedel anticipated several decades of development. Secondly, Goedel completed his 1933 program of establishing the connections between intuitionistic and modal logic, by methods and results that today are at the same time new and 80 years old. The present edition of Goedel's four notebooks encompasses the 368 numbered pages and 126 numbered theorems of the Results on Foundations, together with a list of 74 problems on set theory Goedel prepared in 1946, and a list of an unknown date titled "The grand program of my research in ca. hundred questions.''

Preface.- Part I. Goedel's Results on Foundations.- Part II. Resultats on Foundations.- Part III. Additional Items and Problem Lists.- Index of names in the Resultate Grundlagen.