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Eutocius d'Ascalon : commentaire sur le traité des "Coniques" d'Apollonius de Perge (livres I-IV) / / par Micheline Decorps-Foulquier et Michel Federspiel
| Eutocius d'Ascalon : commentaire sur le traité des "Coniques" d'Apollonius de Perge (livres I-IV) / / par Micheline Decorps-Foulquier et Michel Federspiel |
| Autore | Decorps-Foulquier Micheline |
| Pubbl/distr/stampa | Berlin, Germany : , : De Gruyter, , 2014 |
| Descrizione fisica | 1 online resource (380 p.) |
| Disciplina | 516/.156 |
| Collana | Scientia Graeco-Arabica |
| Soggetto topico |
Mathematics, Greek
Conic sections Transmission of texts |
| Soggetto genere / forma | Electronic books. |
| ISBN |
3-11-037311-4
3-11-022729-0 |
| Formato | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | fre |
| Nota di contenuto | Frontmatter -- AVANT-PROPOS -- SOMMAIRE -- INTRODUCTION -- SIGLA -- TEXTE ET TRADUCTION -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΠΡΩΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU PREMIER LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΔΕΥΤΕΡΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU DEUXIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΤΡΙΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU TROISIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΤΕΤΑΡΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ <ΥΠΟΜΝΗΜΑ> / EUTOCIUS D'ASCALON. COMMENTAIRE DU QUATRIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- NOTES COMPLÉMENTAIRES -- INDEX -- OUVRAGES CITÉS -- APPENDICE. CORRIGENDA |
| Record Nr. | UNINA-9910459463303321 |
Decorps-Foulquier Micheline
|
||
| Berlin, Germany : , : De Gruyter, , 2014 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Eutocius d'Ascalon : commentaire sur le traité des "Coniques" d'Apollonius de Perge (livres I-IV) / / par Micheline Decorps-Foulquier et Michel Federspiel
| Eutocius d'Ascalon : commentaire sur le traité des "Coniques" d'Apollonius de Perge (livres I-IV) / / par Micheline Decorps-Foulquier et Michel Federspiel |
| Autore | Decorps-Foulquier Micheline |
| Pubbl/distr/stampa | Berlin, Germany : , : De Gruyter, , 2014 |
| Descrizione fisica | 1 online resource (380 p.) |
| Disciplina | 516/.156 |
| Collana | Scientia Graeco-Arabica |
| Soggetto topico |
Mathematics, Greek
Conic sections Transmission of texts |
| Soggetto non controllato |
Apollonius of Perge
Eutocius of Ascalon ancient mathematics conic sections |
| ISBN |
3-11-037311-4
3-11-022729-0 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | fre |
| Nota di contenuto | Frontmatter -- AVANT-PROPOS -- SOMMAIRE -- INTRODUCTION -- SIGLA -- TEXTE ET TRADUCTION -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΠΡΩΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU PREMIER LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΔΕΥΤΕΡΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU DEUXIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΤΡΙΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU TROISIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΤΕΤΑΡΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ <ΥΠΟΜΝΗΜΑ> / EUTOCIUS D'ASCALON. COMMENTAIRE DU QUATRIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- NOTES COMPLÉMENTAIRES -- INDEX -- OUVRAGES CITÉS -- APPENDICE. CORRIGENDA |
| Record Nr. | UNINA-9910787187403321 |
|
Decorps-Foulquier Micheline
|
||
| Berlin, Germany : , : De Gruyter, , 2014 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Eutocius d'Ascalon : commentaire sur le traité des "Coniques" d'Apollonius de Perge (livres I-IV) / / par Micheline Decorps-Foulquier et Michel Federspiel
| Eutocius d'Ascalon : commentaire sur le traité des "Coniques" d'Apollonius de Perge (livres I-IV) / / par Micheline Decorps-Foulquier et Michel Federspiel |
| Autore | Decorps-Foulquier Micheline |
| Pubbl/distr/stampa | Berlin, Germany : , : De Gruyter, , 2014 |
| Descrizione fisica | 1 online resource (380 p.) |
| Disciplina | 516/.156 |
| Collana | Scientia Graeco-Arabica |
| Soggetto topico |
Mathematics, Greek
Conic sections Transmission of texts |
| Soggetto non controllato |
Apollonius of Perge
Eutocius of Ascalon ancient mathematics conic sections |
| ISBN |
3-11-037311-4
3-11-022729-0 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | fre |
| Nota di contenuto | Frontmatter -- AVANT-PROPOS -- SOMMAIRE -- INTRODUCTION -- SIGLA -- TEXTE ET TRADUCTION -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΠΡΩΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU PREMIER LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΔΕΥΤΕΡΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU DEUXIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΤΡΙΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ ΥΠΟΜΝΗΜΑ / EUTOCIUS D'ASCALON. COMMENTAIRE DU TROISIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- ΕΥΤΟΚΙΟΥ ΑΣΚΑΛΩΝΙΤΟΥ ΕΙΣ ΤΟ ΤΕΤΑΡΤΟΝ ΤΩΝ ΑΠΟΛΛΩΝΙΟΥ ΚΩΝΙΚΩΝ ΤΗΣ ΚΑΤ᾿ ΑΥΤΟΝ ΕΚΔΟΣΕΩΣ <ΥΠΟΜΝΗΜΑ> / EUTOCIUS D'ASCALON. COMMENTAIRE DU QUATRIÈME LIVRE DES CONIQUES D'APOLLONIUS DANS L'ÉDITION D'EUTOCIUS D'ASCALON -- NOTES COMPLÉMENTAIRES -- INDEX -- OUVRAGES CITÉS -- APPENDICE. CORRIGENDA |
| Record Nr. | UNINA-9910827520603321 |
|
Decorps-Foulquier Micheline
|
||
| Berlin, Germany : , : De Gruyter, , 2014 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Origamics [[electronic resource] ] : mathematical explorations through paper folding / / Kazuo Haga ; edited and translated by Josefina C. Fonacier, Masami Isoda
| Origamics [[electronic resource] ] : mathematical explorations through paper folding / / Kazuo Haga ; edited and translated by Josefina C. Fonacier, Masami Isoda |
| Autore | Haga Kazuo <1934-> |
| Edizione | [[English ed.].] |
| Pubbl/distr/stampa | Hackensack, NJ, : World Scientific, c2008 |
| Descrizione fisica | 1 online resource (152 p.) |
| Disciplina | 516/.156 |
| Altri autori (Persone) |
FonacierJosefina
IsodaMasami |
| Soggetto topico |
Origami
Polyhedra - Models |
| Soggetto genere / forma | Electronic books. |
| ISBN | 981-283-491-5 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | eng |
| Nota di contenuto |
Introduction; Until the Publication of the English Edition; Acknowledgments; Preface for the English Edition; Contents; 1. A POINT OPENS THE DOOR TO ORIGAMICS; 1.1 Simple Questions About Origami; 1.2 Constructing a Pythagorean Triangle; 1.3 Dividing a Line Segment into Three Equal Parts Using no Tools; 1.4 Extending Toward a Generalization; 2. NEW FOLDS BRING OUT NEW THEOREMS; 2.1 Trisecting a Line Segment Using Haga's Second Theorem Fold; 2.2 The Position of Point F is Interesting; 2.3 Some Findings Related to Haga's Third Theorem Fold
3. EXTENSION OF THE HAGA'S THEOREMS TO SILVER RATIO RECTANGLES3.1 Mathematical Adventure by Folding a Copy Paper; 3.2 Mysteries Revealed from Horizontal Folding of Copy Paper; 3.3 Using Standard Copy Paper with Haga's Third Theorem; 4. X-LINES WITH LOTS OF SURPRISES; 4.1 We Begin with an Arbitrary Point; 4.2 Revelations Concerning the Points of Intersection; 4.3 The Center of the Circumcircle!; 4.4 How Does the Vertical Position of the Point of Intersection Vary?; 4.5 Wonders Still Continue; 4.6 Solving the Riddle of; 4.7 Another Wonder; 5. ""INTRASQUARESî AND ìEXTRASQUARES"" 5.1 Do Not Fold Exactly into Halves5.2 What Kind of Polygons Can You Get?; 5.3 How do You Get a Triangle or a Quadrilateral?; 5.4 Now to Making a Map; 5.5 This is the ìScienti c Methodî; 5.6 Completing the Map; 5.7 We Must Also Make the Map of the Outer Subdivision; 5.8 Let Us Calculate Areas; 6. A PETAL PATTERN FROM HEXAGONS?; 6.1 The Origamics Logo; 6.2 Folding a Piece of Paper by Concentrating the Four Vertices at One Point; 6.3 Remarks on Polygonal Figures of Type n; 6.4 An Approach to the Problem Using Group Study; 6.5 Reducing the Work of Paper Folding; One Eighth of the Square Will Do 6.6 Why Does the Petal Pattern Appear?6.7 What Are the Areas of the Regions?; 7. HEPTAGON REGIONS EXIST?; 7.1 Review of the Folding Procedure; 7.2 A Heptagon Appears!; 7.3 Experimenting with Rectangles with Different Ratios of Sides; 7.4 Try a Rhombus; 8. A WONDER OF ELEVEN STARS; 8.1 Experimenting with Paper Folding; 8.2 Discovering; 8.3 Proof; 8.4 More Revelations Regarding the Intersections of the Extensions of the Creases; 8.5 Proof of the Observation on the Intersection Points of Extended Edge-to-Line Creases; 8.6 The Joy of Discovering and the Excitement of Further Searching 9. WHERE TO GO AND WHOM TO MEET9.1 An Origamics Activity as a Game; 9.2 A Scenario: A Princess and Three Knights?; 9.3 The Rule: One Guest at a Time; 9.4 Cases Where no Interview is Possible; 9.5 Mapping the Neighborhood; 9.6 A Flower Pattern or an Insect Pattern; 9.7 A Different Rule: Group Meetings; 9.8 Are There Areas Where a Particular Male can have Exclusive Meetings with the Female?; 9.9 More Meetings through a ìHidden Doorî; 10. INSPIRATION FROM RECTANGULAR PAPER; 10.1 A Scenario: The Stern King of Origami Land 10.2 Begin with a Simpler Problem: How to Divide the Rectangle Horizontally and Vertically into 3 Equal Parts |
| Record Nr. | UNINA-9910455519603321 |
|
Haga Kazuo <1934->
|
||
| Hackensack, NJ, : World Scientific, c2008 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Origamics [[electronic resource] ] : mathematical explorations through paper folding / / Kazuo Haga ; edited and translated by Josefina C. Fonacier, Masami Isoda
| Origamics [[electronic resource] ] : mathematical explorations through paper folding / / Kazuo Haga ; edited and translated by Josefina C. Fonacier, Masami Isoda |
| Autore | Haga Kazuo <1934-> |
| Edizione | [[English ed.].] |
| Pubbl/distr/stampa | Hackensack, NJ, : World Scientific, c2008 |
| Descrizione fisica | 1 online resource (152 p.) |
| Disciplina | 516/.156 |
| Altri autori (Persone) |
FonacierJosefina
IsodaMasami |
| Soggetto topico |
Origami
Polyhedra - Models |
| ISBN | 981-283-491-5 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | eng |
| Nota di contenuto |
Introduction; Until the Publication of the English Edition; Acknowledgments; Preface for the English Edition; Contents; 1. A POINT OPENS THE DOOR TO ORIGAMICS; 1.1 Simple Questions About Origami; 1.2 Constructing a Pythagorean Triangle; 1.3 Dividing a Line Segment into Three Equal Parts Using no Tools; 1.4 Extending Toward a Generalization; 2. NEW FOLDS BRING OUT NEW THEOREMS; 2.1 Trisecting a Line Segment Using Haga's Second Theorem Fold; 2.2 The Position of Point F is Interesting; 2.3 Some Findings Related to Haga's Third Theorem Fold
3. EXTENSION OF THE HAGA'S THEOREMS TO SILVER RATIO RECTANGLES3.1 Mathematical Adventure by Folding a Copy Paper; 3.2 Mysteries Revealed from Horizontal Folding of Copy Paper; 3.3 Using Standard Copy Paper with Haga's Third Theorem; 4. X-LINES WITH LOTS OF SURPRISES; 4.1 We Begin with an Arbitrary Point; 4.2 Revelations Concerning the Points of Intersection; 4.3 The Center of the Circumcircle!; 4.4 How Does the Vertical Position of the Point of Intersection Vary?; 4.5 Wonders Still Continue; 4.6 Solving the Riddle of; 4.7 Another Wonder; 5. ""INTRASQUARESî AND ìEXTRASQUARES"" 5.1 Do Not Fold Exactly into Halves5.2 What Kind of Polygons Can You Get?; 5.3 How do You Get a Triangle or a Quadrilateral?; 5.4 Now to Making a Map; 5.5 This is the ìScienti c Methodî; 5.6 Completing the Map; 5.7 We Must Also Make the Map of the Outer Subdivision; 5.8 Let Us Calculate Areas; 6. A PETAL PATTERN FROM HEXAGONS?; 6.1 The Origamics Logo; 6.2 Folding a Piece of Paper by Concentrating the Four Vertices at One Point; 6.3 Remarks on Polygonal Figures of Type n; 6.4 An Approach to the Problem Using Group Study; 6.5 Reducing the Work of Paper Folding; One Eighth of the Square Will Do 6.6 Why Does the Petal Pattern Appear?6.7 What Are the Areas of the Regions?; 7. HEPTAGON REGIONS EXIST?; 7.1 Review of the Folding Procedure; 7.2 A Heptagon Appears!; 7.3 Experimenting with Rectangles with Different Ratios of Sides; 7.4 Try a Rhombus; 8. A WONDER OF ELEVEN STARS; 8.1 Experimenting with Paper Folding; 8.2 Discovering; 8.3 Proof; 8.4 More Revelations Regarding the Intersections of the Extensions of the Creases; 8.5 Proof of the Observation on the Intersection Points of Extended Edge-to-Line Creases; 8.6 The Joy of Discovering and the Excitement of Further Searching 9. WHERE TO GO AND WHOM TO MEET9.1 An Origamics Activity as a Game; 9.2 A Scenario: A Princess and Three Knights?; 9.3 The Rule: One Guest at a Time; 9.4 Cases Where no Interview is Possible; 9.5 Mapping the Neighborhood; 9.6 A Flower Pattern or an Insect Pattern; 9.7 A Different Rule: Group Meetings; 9.8 Are There Areas Where a Particular Male can have Exclusive Meetings with the Female?; 9.9 More Meetings through a ìHidden Doorî; 10. INSPIRATION FROM RECTANGULAR PAPER; 10.1 A Scenario: The Stern King of Origami Land 10.2 Begin with a Simpler Problem: How to Divide the Rectangle Horizontally and Vertically into 3 Equal Parts |
| Record Nr. | UNINA-9910778080703321 |
|
Haga Kazuo <1934->
|
||
| Hackensack, NJ, : World Scientific, c2008 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Origamics [[electronic resource] ] : mathematical explorations through paper folding / / Kazuo Haga ; edited and translated by Josefina C. Fonacier, Masami Isoda
| Origamics [[electronic resource] ] : mathematical explorations through paper folding / / Kazuo Haga ; edited and translated by Josefina C. Fonacier, Masami Isoda |
| Autore | Haga Kazuo <1934-> |
| Edizione | [[English ed.].] |
| Pubbl/distr/stampa | Hackensack, NJ, : World Scientific, c2008 |
| Descrizione fisica | 1 online resource (152 p.) |
| Disciplina | 516/.156 |
| Altri autori (Persone) |
FonacierJosefina
IsodaMasami |
| Soggetto topico |
Origami
Polyhedra - Models |
| ISBN | 981-283-491-5 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | eng |
| Nota di contenuto |
Introduction; Until the Publication of the English Edition; Acknowledgments; Preface for the English Edition; Contents; 1. A POINT OPENS THE DOOR TO ORIGAMICS; 1.1 Simple Questions About Origami; 1.2 Constructing a Pythagorean Triangle; 1.3 Dividing a Line Segment into Three Equal Parts Using no Tools; 1.4 Extending Toward a Generalization; 2. NEW FOLDS BRING OUT NEW THEOREMS; 2.1 Trisecting a Line Segment Using Haga's Second Theorem Fold; 2.2 The Position of Point F is Interesting; 2.3 Some Findings Related to Haga's Third Theorem Fold
3. EXTENSION OF THE HAGA'S THEOREMS TO SILVER RATIO RECTANGLES3.1 Mathematical Adventure by Folding a Copy Paper; 3.2 Mysteries Revealed from Horizontal Folding of Copy Paper; 3.3 Using Standard Copy Paper with Haga's Third Theorem; 4. X-LINES WITH LOTS OF SURPRISES; 4.1 We Begin with an Arbitrary Point; 4.2 Revelations Concerning the Points of Intersection; 4.3 The Center of the Circumcircle!; 4.4 How Does the Vertical Position of the Point of Intersection Vary?; 4.5 Wonders Still Continue; 4.6 Solving the Riddle of; 4.7 Another Wonder; 5. ""INTRASQUARESî AND ìEXTRASQUARES"" 5.1 Do Not Fold Exactly into Halves5.2 What Kind of Polygons Can You Get?; 5.3 How do You Get a Triangle or a Quadrilateral?; 5.4 Now to Making a Map; 5.5 This is the ìScienti c Methodî; 5.6 Completing the Map; 5.7 We Must Also Make the Map of the Outer Subdivision; 5.8 Let Us Calculate Areas; 6. A PETAL PATTERN FROM HEXAGONS?; 6.1 The Origamics Logo; 6.2 Folding a Piece of Paper by Concentrating the Four Vertices at One Point; 6.3 Remarks on Polygonal Figures of Type n; 6.4 An Approach to the Problem Using Group Study; 6.5 Reducing the Work of Paper Folding; One Eighth of the Square Will Do 6.6 Why Does the Petal Pattern Appear?6.7 What Are the Areas of the Regions?; 7. HEPTAGON REGIONS EXIST?; 7.1 Review of the Folding Procedure; 7.2 A Heptagon Appears!; 7.3 Experimenting with Rectangles with Different Ratios of Sides; 7.4 Try a Rhombus; 8. A WONDER OF ELEVEN STARS; 8.1 Experimenting with Paper Folding; 8.2 Discovering; 8.3 Proof; 8.4 More Revelations Regarding the Intersections of the Extensions of the Creases; 8.5 Proof of the Observation on the Intersection Points of Extended Edge-to-Line Creases; 8.6 The Joy of Discovering and the Excitement of Further Searching 9. WHERE TO GO AND WHOM TO MEET9.1 An Origamics Activity as a Game; 9.2 A Scenario: A Princess and Three Knights?; 9.3 The Rule: One Guest at a Time; 9.4 Cases Where no Interview is Possible; 9.5 Mapping the Neighborhood; 9.6 A Flower Pattern or an Insect Pattern; 9.7 A Different Rule: Group Meetings; 9.8 Are There Areas Where a Particular Male can have Exclusive Meetings with the Female?; 9.9 More Meetings through a ìHidden Doorî; 10. INSPIRATION FROM RECTANGULAR PAPER; 10.1 A Scenario: The Stern King of Origami Land 10.2 Begin with a Simpler Problem: How to Divide the Rectangle Horizontally and Vertically into 3 Equal Parts |
| Record Nr. | UNINA-9910814656803321 |
|
Haga Kazuo <1934->
|
||
| Hackensack, NJ, : World Scientific, c2008 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Quasi-linear perturbations of Hamiltonian Klein-Gordon equations on spheres / / J.-M. Delort
| Quasi-linear perturbations of Hamiltonian Klein-Gordon equations on spheres / / J.-M. Delort |
| Autore | Delort Jean-Marc <1961-> |
| Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , 2014 |
| Descrizione fisica | 1 online resource (80 p.) |
| Disciplina | 516/.156 |
| Collana | Memoirs of the American Mathematical Society |
| Soggetto topico |
Hamiltonian systems
Klein-Gordon equation Wave equation Sphere |
| Soggetto genere / forma | Electronic books. |
| ISBN | 1-4704-2030-9 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | eng |
| Nota di contenuto | ""Cover""; ""Title page""; ""Chapter 0. Introduction""; ""Chapter 1. Statement of the main theorem""; ""Chapter 2. Symbolic calculus""; ""Chapter 3. Quasi-linear Birkhoff normal forms method""; ""Chapter 4. Proof of the main theorem""; ""A. Appendix""; ""Bibliography""; ""Back Cover"" |
| Record Nr. | UNINA-9910478914003321 |
|
Delort Jean-Marc <1961->
|
||
| Providence, Rhode Island : , : American Mathematical Society, , 2014 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Quasi-linear perturbations of Hamiltonian Klein-Gordon equations on spheres / / J.-M. Delort
| Quasi-linear perturbations of Hamiltonian Klein-Gordon equations on spheres / / J.-M. Delort |
| Autore | Delort Jean-Marc <1961-> |
| Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , 2014 |
| Descrizione fisica | 1 online resource (80 p.) |
| Disciplina | 516/.156 |
| Collana | Memoirs of the American Mathematical Society |
| Soggetto topico |
Hamiltonian systems
Klein-Gordon equation Wave equation Sphere |
| ISBN | 1-4704-2030-9 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | eng |
| Nota di contenuto | ""Cover""; ""Title page""; ""Chapter 0. Introduction""; ""Chapter 1. Statement of the main theorem""; ""Chapter 2. Symbolic calculus""; ""Chapter 3. Quasi-linear Birkhoff normal forms method""; ""Chapter 4. Proof of the main theorem""; ""A. Appendix""; ""Bibliography""; ""Back Cover"" |
| Record Nr. | UNINA-9910797017403321 |
|
Delort Jean-Marc <1961->
|
||
| Providence, Rhode Island : , : American Mathematical Society, , 2014 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||
Quasi-linear perturbations of Hamiltonian Klein-Gordon equations on spheres / / J.-M. Delort
| Quasi-linear perturbations of Hamiltonian Klein-Gordon equations on spheres / / J.-M. Delort |
| Autore | Delort Jean-Marc <1961-> |
| Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , 2014 |
| Descrizione fisica | 1 online resource (80 p.) |
| Disciplina | 516/.156 |
| Collana | Memoirs of the American Mathematical Society |
| Soggetto topico |
Hamiltonian systems
Klein-Gordon equation Wave equation Sphere |
| ISBN | 1-4704-2030-9 |
| Formato | Materiale a stampa |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione | eng |
| Nota di contenuto | ""Cover""; ""Title page""; ""Chapter 0. Introduction""; ""Chapter 1. Statement of the main theorem""; ""Chapter 2. Symbolic calculus""; ""Chapter 3. Quasi-linear Birkhoff normal forms method""; ""Chapter 4. Proof of the main theorem""; ""A. Appendix""; ""Bibliography""; ""Back Cover"" |
| Record Nr. | UNINA-9910826589603321 |
|
Delort Jean-Marc <1961->
|
||
| Providence, Rhode Island : , : American Mathematical Society, , 2014 | ||
| Materiale a stampa | ||
| Lo trovi qui: Univ. Federico II | ||
| ||