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- Hilbert's_tenth_problem abstract "Hilbert's tenth problem is the tenth on the list of Hilbert's problems of 1900. Its statement is as follows:Given a Diophantine equation with any number of unknown quantities and with rational integral numerical coefficients: To devise a process according to which it can be determined in a finite number of operations whether the equation is solvable in rational integers.A Diophantine equation is an equation of the formwhere p is a polynomial with integer coefficients. It took many years for the problem to be solved with a negative answer. Today, it is known that no such algorithm exists in the general case. This result is the combined work of Martin Davis, Yuri Matiyasevich, Hilary Putnam and Julia Robinson which spans 21 years, with Yuri Matiyasevich completing the solution in 1970.".
- Hilbert's_tenth_problem wikiPageExternalLink Hilbert10.
- Hilbert's_tenth_problem wikiPageExternalLink htp.pdf.
- Hilbert's_tenth_problem wikiPageExternalLink 1612Hilbert_engl.html.
- Hilbert's_tenth_problem wikiPageID "101851".
- Hilbert's_tenth_problem wikiPageRevisionID "605406460".
- Hilbert's_tenth_problem hasPhotoCollection Hilbert's_tenth_problem.
- Hilbert's_tenth_problem subject Category:Diophantine_equations.
- Hilbert's_tenth_problem subject Category:Disproved_conjectures.
- Hilbert's_tenth_problem subject Category:Hilbert's_problems.
- Hilbert's_tenth_problem type Abstraction100002137.
- Hilbert's_tenth_problem type Attribute100024264.
- Hilbert's_tenth_problem type Communication100033020.
- Hilbert's_tenth_problem type Condition113920835.
- Hilbert's_tenth_problem type Difficulty114408086.
- Hilbert's_tenth_problem type DiophantineEquations.
- Hilbert's_tenth_problem type Equation106669864.
- Hilbert's_tenth_problem type Hilbert'sProblems.
- Hilbert's_tenth_problem type MathematicalStatement106732169.
- Hilbert's_tenth_problem type Message106598915.
- Hilbert's_tenth_problem type Problem114410605.
- Hilbert's_tenth_problem type State100024720.
- Hilbert's_tenth_problem type Statement106722453.
- Hilbert's_tenth_problem comment "Hilbert's tenth problem is the tenth on the list of Hilbert's problems of 1900. Its statement is as follows:Given a Diophantine equation with any number of unknown quantities and with rational integral numerical coefficients: To devise a process according to which it can be determined in a finite number of operations whether the equation is solvable in rational integers.A Diophantine equation is an equation of the formwhere p is a polynomial with integer coefficients.".
- Hilbert's_tenth_problem label "Dixième problème de Hilbert".
- Hilbert's_tenth_problem label "Décimo problema de Hilbert".
- Hilbert's_tenth_problem label "Décimo problema de Hilbert".
- Hilbert's_tenth_problem label "Hilbert's tenth problem".
- Hilbert's_tenth_problem label "Tiende probleem van Hilbert".
- Hilbert's_tenth_problem label "Десятая проблема Гильберта".
- Hilbert's_tenth_problem label "معضلة هيلبرت العاشرة".
- Hilbert's_tenth_problem label "丟番圖集".
- Hilbert's_tenth_problem sameAs Décimo_problema_de_Hilbert.
- Hilbert's_tenth_problem sameAs Dixième_problème_de_Hilbert.
- Hilbert's_tenth_problem sameAs Tiende_probleem_van_Hilbert.
- Hilbert's_tenth_problem sameAs Décimo_problema_de_Hilbert.
- Hilbert's_tenth_problem sameAs m.0ptm8.
- Hilbert's_tenth_problem sameAs Q986147.
- Hilbert's_tenth_problem sameAs Q986147.
- Hilbert's_tenth_problem sameAs Hilbert's_tenth_problem.
- Hilbert's_tenth_problem wasDerivedFrom Hilbert's_tenth_problem?oldid=605406460.
- Hilbert's_tenth_problem isPrimaryTopicOf Hilbert's_tenth_problem.