1 / 17

Hilbert’s Problems

Hilbert’s Problems. By Sharjeel Khan. David Hilbert. Born in Königsberg, Russia Went to University of Königsberg Went on to teach at University of Königsberg Left Königsberg and went to University of Göttingen. David Hilbert’s Legacy.

oprah
Télécharger la présentation

Hilbert’s Problems

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Hilbert’s Problems By Sharjeel Khan

  2. David Hilbert • Born in Königsberg, Russia • Went to University of Königsberg • Went on to teach at University of Königsberg • Left Königsberg and went to University of Göttingen

  3. David Hilbert’s Legacy • One of the most influential mathematicians of the 19th and 20th century • His famous Basis Theorem in Invariant Theory • His famous 21 axioms in the axiomation of geometry • The Hilbert’s Space • Hilbert’s Program • 23 mathematical problems

  4. David Hilbert’s Legacy • One of the most influential mathematicians of the 19th and 20th century • His famous Basis Theorem in Invariant Theory • His famous 21 axioms in the axiomation of geometry • The Hilbert’s Space • 23 mathematical problems

  5. The 23 Mathematical Problems of Hilbert • The continuum hypothesis • Prove that the axioms of arithmetic are consistent. • Given any two polyhedra of equal volume, is it always possible to cut the first into finitely many polyhedral pieces which can be reassembled to yield the second? • Construct all metrics where lines are geodesics. • Are continuous groups automatically differential groups? • Mathematical treatment of the axioms of physics • Is a b transcendental, for algebraic a ≠ 0,1 and irrational algebraic b ? • The Riemann hypothesis ("the real part of any non-trivial zero of the Riemann zeta function is ½") and other prime number problems, among them Goldbach's conjecture and the twin prime conjecture • Find the most general law of the reciprocity theorem in any algebraic number field. • Find an algorithm to determine whether a given polynomial Diophantine equation with integer coefficients has an integer solution. • Solving quadratic forms with algebraic numerical coefficients. • Extend the Kronecker–Weber theorem on abelian extensions of the rational numbers to any base number field. • Solve 7-th degree equation using continuous functions of two parameters. • Is the ring of invariants of an algebraic group acting on a polynomial ring always finitely generated? • Rigorous foundation of Schubert's enumerative calculus. • Describe relative positions of ovals originating from a real algebraic curve and as limit cycles of a polynomial vector field on the plane. • Express a nonnegative rational function as quotient of sums of squares. • (a) Is there a polyhedron which admits only an anisohedral tiling in three dimensions?(b) What is the densest sphere packing? • Are the solutions of regular problems in the calculus of variations always necessarily analytic? • Do all variational problems with certain boundary conditions have solutions? • Proof of the existence of linear differential equations having a prescribed monodromic group • Uniformization of analytic relations by means of automorphic functions • Further development of the calculus of variations

  6. Consequences of Hilbert’s 23 problems

  7. Famous Hilbert Talk in 1900 • Presented the 23 problems for research • Talked about mathematics history • Showed expectations for the future of mathematics • Showed the necessity why to solve these problems • Gave a challenge and hope to mathematician through the 23 problems • Became the most influential speech in the study of mathematics

  8. Famous Hilbert Talk in 1900 • Presented the 23 problems for research • Talked about mathematics history • Showed expectations for the future of mathematics • Showed the necessity why to solve these problems • Gave a challenge and hope to mathematician through the 23 problems • Became the most influential speech in the study of mathematics Why give this talk?

  9. Mathematics right before the Talk • Mathematics in 19th century was growing • New theories were being found and many contributions were being made • The limits of mathematics were being explored • Foundations of mathematics became a problem with the rise of mathematical logic • Hilbert’s questions gave more incentive for people to explore these limits

  10. Hilbert’s 1st Problem (The Continuum Hypothesis) • It was created by the creator of Set Theory, Georg Cantor in 1878 • Hilbert used this hypothesis and agreed that it makes sense so he wanted someone to prove it right • Cardinality is same for two sets if they have a bijection • Cardinality of integers and natural numbers is countable and it is aleph zero • Cardinality of real numbers is uncountable and it is 2^(aleph zero) • Question was is there another set of infinite between integers and real numbers such that aleph_0 < |S| < 2^aleph_0

  11. Hilbert’s tenth Problem (Diophantine Equation) • Given a Diopantine equation, is it solvable in rational integers. Example: 15x^2 + 23z +45y = 0 • It took 21 years and 4 people to help solve this question where it was solved in 1970 • It was Yuri Matiyasevich who came up with solution. • The answer ended up being that it was impossible.

  12. Famous Hilbert Talk in 1900 • Presented the 23 problems for research • Talked about mathematics history • Showed expectations for the future of mathematics • Showed the necessity why to solve these problems • Gave a challenge and hope to mathematician through the 23 problems • Became the most influential speech in the study of mathematics Were they all solved?

  13. The state of the 23 problems • The continuum hypothesis (1963) • Prove that the axioms of arithmetic are consistent. • Given any two polyhedra of equal volume, is it always possible to cut the first into finitely many polyhedral pieces which can be reassembled to yield the second? (1900) • Construct all metrics where lines are geodesics. • Are continuous groups automatically differential groups? • Mathematical treatment of the axioms of physics • Is a b transcendental, for algebraic a ≠ 0,1 and irrational algebraic b ? (1935) • The Riemann hypothesis ("the real part of any non-trivial zero of the Riemann zeta function is ½") and other prime number problems, among them Goldbach's conjecture and the twin prime conjecture • Find the most general law of the reciprocity theorem in any algebraic number field. • Find an algorithm to determine whether a given polynomial Diophantine equation with integer coefficients has an integer solution. (1970) • Solving quadratic forms with algebraic numerical coefficients. • Extend the Kronecker–Weber theorem on abelian extensions of the rational numbers to any base number field. • Solve 7-th degree equation using continuous functions of two parameters. • Is the ring of invariants of an algebraic group acting on a polynomial ring always finitely generated? (1959) • Rigorous foundation of Schubert's enumerative calculus. • Describe relative positions of ovals originating from a real algebraic curve and as limit cycles of a polynomial vector field on the plane. • Express a nonnegative rational function as quotient of sums of squares. (1927) • (a) Is there a polyhedron which admits only an anisohedral tiling in three dimensions? (1928)(b) What is the densest sphere packing? (1928) • Are the solutions of regular problems in the calculus of variations always necessarily analytic? (1957) • Do all variational problems with certain boundary conditions have solutions? • Proof of the existence of linear differential equations having a prescribed monodromic group • Uniformization of analytic relations by means of automorphic functions • Further development of the calculus of variations Too Vague

  14. Effects of the 23 problems • Each solved problem became a huge thing as it further the mathematics field. • Motivated all mathematicians • Most questions were solved in the 20th century (less than 100 years after the talk) • Inspired people to challenge the general public to solve problems like Millennium Problems (which includes P vsNP problem)

  15. Secret Hilbert’s 24th Problem • This problem was not included in the original list but was in Hilbert’s notes • It was discovered by German historian Rudiger Thiele in 2000, 100 years after the talk. • Asks for criterion of simplicity in mathematical proofs and development of proof theory

  16. References • http://aleph0.clarku.edu/~djoyce/hilbert/problems.html • http://mathworld.wolfram.com/HilbertsProblems.html • http://www-history.mcs.st-andrews.ac.uk/Biographies/Hilbert.html • http://en.wikipedia.org/wiki/Hilbert%27s_problems

More Related