. "[8D8311AB3913]" . . "Paper geometry in nine acts"@en . . . "1. Co lze skl\u00E1d\u00E1n\u00EDm pap\u00EDru z\u00EDskat? 2. Standardn\u00ED pap\u00EDrov\u00E9 skl\u00E1d\u00E1n\u00ED je ekvivalentn\u00ED geometrii, ve kter\u00E9 m\u016F\u017Eeme spojit dva dan\u00E9 body p\u0159\u00EDmkou a posouvat j\u00ED. 3. Takov\u00E1to geometrie m\u00E1 model, kter\u00FD spl\u0148uje v\u0161echny Hilbertovy axiomy a\u017E na axiom \u00FAplnosti. 4. Co lze zkonstruovat v takov\u00E9to geometrii? 5. Jak je lze zkonstruovat?. 6. \u0158e\u0161en\u00ED od E. Artina a O. Schreiera. 7. Konstruk\u010Dn\u00ED \u0159e\u0161en\u00ED A. Robinsona a G. Kreisela. 8. Slo\u017Eitost algoritmu. 9. Definitivn\u00ED \u0159e\u0161en\u00ED probl\u00E9mu?" . "Pap\u00EDrov\u00E1 geometrie v dev\u00EDti jedn\u00E1n\u00EDch"@cs . . "Pap\u00EDrov\u00E1 geometrie v dev\u00EDti jedn\u00E1n\u00EDch" . "Paper geometry in nine acts"@en . . . "219476" . . . "solvability of mathematical problems; 17th Hilbert problem; paper folding; geometry; history of 20th centrury mathematics"@en . "RIV/49777513:23330/11:43914869!RIV12-GA0-23330___" . . . "1"^^ . "Pap\u00EDrov\u00E1 geometrie v dev\u00EDti jedn\u00E1n\u00EDch"@cs . "Pap\u00EDrov\u00E1 geometrie v dev\u00EDti jedn\u00E1n\u00EDch" . "23330" . "RIV/49777513:23330/11:43914869" . "1. What can be done by paper folding? 2. Standard paper-folding is equivalent to the geometry, in which we can join two given points by a straight line and more a given straight line (%22standard%22) to a given place. 3. Such a geometry forms a model, which satisfies all the Hilbert axioms except the axiom of completeness. 4. What can be constructed in such geometry? 5. How it can be constructed? 6. Solution by E. Artin and O. Schreier. 7. Constructive solution by A. Robinson and G. Kreisel. 8. Complexity of algorithm. 9. Definitely solution of a problem"@en . . . "1"^^ . "1. Co lze skl\u00E1d\u00E1n\u00EDm pap\u00EDru z\u00EDskat? 2. Standardn\u00ED pap\u00EDrov\u00E9 skl\u00E1d\u00E1n\u00ED je ekvivalentn\u00ED geometrii, ve kter\u00E9 m\u016F\u017Eeme spojit dva dan\u00E9 body p\u0159\u00EDmkou a posouvat j\u00ED. 3. Takov\u00E1to geometrie m\u00E1 model, kter\u00FD spl\u0148uje v\u0161echny Hilbertovy axiomy a\u017E na axiom \u00FAplnosti. 4. Co lze zkonstruovat v takov\u00E9to geometrii? 5. Jak je lze zkonstruovat?. 6. \u0158e\u0161en\u00ED od E. Artina a O. Schreiera. 7. Konstruk\u010Dn\u00ED \u0159e\u0161en\u00ED A. Robinsona a G. Kreisela. 8. Slo\u017Eitost algoritmu. 9. Definitivn\u00ED \u0159e\u0161en\u00ED probl\u00E9mu?"@cs . "Fiala, Ji\u0159\u00ED" . . "P(GAP401/10/0690)" . . . . .