Mathematical Problems
BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY
CONTINUATION OF THE BULLETIN OF THE NEW YORK MATHEMATICAL SOCIETY.
A HISTORICAL AND CRITICAL REVIEW OF MATHEMATICAL SCIENCE
EDITED BY F.N. COLE, ALEXANDER ZIWET, F. MORLEY, E.O. LOVETT, C.L. BOUTON, D.E. SMITH.
VOL. VIII.
OCTOBER 1901 TO JULY 1902.
PUBLISHED FOR THE SOCIETY BY THE MACMILLAN COMPANY, LANCASTER, PA., AND NEW YORK, 1902.
LECTURE DELIVERED BEFORE THE INTERNATIONAL CONGRESS OF MATHEMATICIANS AT PARIS IN 1900.
BY PROFESSOR DAVID HILBERT.
Who of us would not be glad to lift the veil behind which the future lies hidden; to cast a glance at the next advances of our science and at the secrets of its development during future centuries? What particular goals will there be toward which the leading mathematical spirits of coming generations will strive? What new methods and new facts in the wide and rich field of mathematical thought will the new centuries disclose?
History teaches the continuity of the development of science. We know that every age has its own problems, which the following age either solves or casts aside as profitless and replaces by new ones. If we would obtain an idea of the probable development of mathematical knowledge in the immediate future, we must let the unsettled questions pass before our minds and look over the problems which the science of to-day sets and whose solution we expect from the future. To such a review of problems the present day, lying at the meeting of the centuries, seems to me well adapted. For the close of a great epoch not only invites us to look back into the past but also directs our thoughts to the unknown future.
The deep significance of certain problems for the advance of mathematical science in general and the important rôle which they play in the work of the individual investigator are not to be denied. As long as a branch of science offers an abundance of problems, so long is it alive; a lack of problems foreshadows extinction or the cessation of independent development. Just as every human undertaking pursues certain objects, so also mathematical research requires its problems. It is by the solution of problems that the investigator tests the temper of his steel; he finds new methods and new outlooks, and gains a wider and freer horizon.
David Hilbert
---
MATHEMATICAL PROBLEMS
CONTENTS
1. CANTOR'S PROBLEM OF THE CARDINAL NUMBER OF THE CONTINUUM.
2. THE COMPATIBILITY OF THE ARITHMETICAL AXIOMS.
3. THE EQUALITY OF THE VOLUMES OF TWO TETRAHEDRA OF EQUAL BASES AND EQUAL ALTITUDES.
4. PROBLEM OF THE STRAIGHT LINE AS THE SHORTEST DISTANCE BETWEEN TWO POINTS.
5. LIE'S CONCEPT OF A CONTINUOUS GROUP OF TRANSFORMATIONS WITHOUT THE ASSUMPTION OF THE DIFFERENTIABILITY OF THE FUNCTIONS DEFINING THE GROUP.
6. MATHEMATICAL TREATMENT OF THE AXIOMS OF PHYSICS.
7. IRRATIONALITY AND TRANSCENDENCE OF CERTAIN NUMBERS.
8. PROBLEMS OF PRIME NUMBERS.
9. PROOF OF THE MOST GENERAL LAW OF RECIPROCITY IN ANY NUMBER FIELD.
10. DETERMINATION OF THE SOLVABILITY OF A DIOPHANTINE EQUATION.
11. QUADRATIC FORMS WITH ANY ALGEBRAIC NUMERICAL COEFFICIENTS.
12. EXTENSION OF KRONECKER'S THEOREM ON ABELIAN FIELDS TO ANY ALGEBRAIC REALM OF RATIONALITY.
13. IMPOSSIBILITY OF THE SOLUTION OF THE GENERAL EQUATION OF THE 7TH DEGREE BY MEANS OF FUNCTIONS OF ONLY TWO ARGUMENTS.
14. PROOF OF THE FINITENESS OF CERTAIN COMPLETE SYSTEMS OF FUNCTIONS.
15. RIGOROUS FOUNDATION OF SCHUBERT'S ENUMERATIVE CALCULUS.
16. PROBLEM OF THE TOPOLOGY OF ALGEBRAIC CURVES AND SURFACES.
17. EXPRESSION OF DEFINITE FORMS BY SQUARES.
18. BUILDING UP OF SPACE FROM CONGRUENT POLYHEDRA.
19. ARE THE SOLUTIONS OF REGULAR PROBLEMS IN THE CALCULUS OF VARIATIONS ALWAYS NECESSARILY ANALYTIC?
20. THE GENERAL PROBLEM OF BOUNDARY VALVES.
21. PROOF OF THE EXISTENCE OF LINEAR DIFFERENTIAL EQUATIONS HAVING A PRESCRIBED MONODROMIC GROUP.
22. UNIFORMIZATIOM OF ANALYTIC RELATION'S BY MEANS OF AUTOMORPHIC FUNCTIONS.
23. FURTHER DEVELOPMENT OF THE METHODS OF THE CALCULUS OF VARIATIONS.