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100%: Laska, Michael: Elliptic Curves over Number Fields: With Prescribed Reduction Type (Aspects of Mathematics) (ISBN: 9783528085698) 1983. Ausgabe, in Deutsch, Taschenbuch.
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100%: Michael Laska: Elliptic Curves over Number Fields with Prescribed Reduction Type (ISBN: 9783322875990) in Deutsch, auch als eBook.
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Elliptic Curves over Number Fields: With Prescribed Reduction Type (Aspects of Mathematics)
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1
Elliptic Curves over Number Fields with Prescribed Reduction Type
DE PB NW
ISBN: 9783528085698 bzw. 352808569X, in Deutsch, Vieweg+Teubner, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
buecher.de GmbH & Co. KG, [1].
Let K be an algebraic number field. The function attaching to each elliptic curve over K its conductor is constant on isoger. y classes of elliptic curves over K (for the definitions see chapter 1). Ioreover, for a given ideal a in OK the number of isogeny classes of elliptic curves over K with conductor a is finite. In these notes we deal with the following problem: How can one explicitly construct a set of representatives for the isogeny classes of elliptic curves over K with conductor a for a given ideal a in OK? The conductor of an elliptic curve over K is a numerical invariant which measures, in some sense, the badness of the reduction of the elliptic curve modulo the prime ideals in OK' It plays an important role in the famous Weil-Langlands conjecture on the connection between elliptic curves over K and congruence subgroups in 5L2(OK) . In case K this connection can be stated as follows. For any ideal a = (N) in let ro(N) be the congruence subgroup ro(N) (: ) E 5L2 () c E (N) of 5L2 () and let 52 (fo (N be the space of cusp forms of weight 2 for r 0 (N) Now Weil conjectured that there exists a bijection between the rational normalized eigenforms in 52(ro(N for the Heckealgebra and the - 2 - Lsugny classes uf elliptic curves over with conductor a = (N) .213 S. 213S. 243 mmVersandfertig in 3-5 Tagen, Softcover.
buecher.de GmbH & Co. KG, [1].
Let K be an algebraic number field. The function attaching to each elliptic curve over K its conductor is constant on isoger. y classes of elliptic curves over K (for the definitions see chapter 1). Ioreover, for a given ideal a in OK the number of isogeny classes of elliptic curves over K with conductor a is finite. In these notes we deal with the following problem: How can one explicitly construct a set of representatives for the isogeny classes of elliptic curves over K with conductor a for a given ideal a in OK? The conductor of an elliptic curve over K is a numerical invariant which measures, in some sense, the badness of the reduction of the elliptic curve modulo the prime ideals in OK' It plays an important role in the famous Weil-Langlands conjecture on the connection between elliptic curves over K and congruence subgroups in 5L2(OK) . In case K this connection can be stated as follows. For any ideal a = (N) in let ro(N) be the congruence subgroup ro(N) (: ) E 5L2 () c E (N) of 5L2 () and let 52 (fo (N be the space of cusp forms of weight 2 for r 0 (N) Now Weil conjectured that there exists a bijection between the rational normalized eigenforms in 52(ro(N for the Heckealgebra and the - 2 - Lsugny classes uf elliptic curves over with conductor a = (N) .213 S. 213S. 243 mmVersandfertig in 3-5 Tagen, Softcover.
2
Symbolbild
Elliptic Curves Over Number Fields with Prescribed Reduction Type (Paperback) (1984)
DE PB NW RP
ISBN: 9783528085698 bzw. 352808569X, in Deutsch, Vieweg+Teubner Verlag, United States, Taschenbuch, neu, Nachdruck.
Lieferung aus: Deutschland, Versandkostenfrei.
Von Händler/Antiquariat, The Book Depository EURO [60485773], Slough, United Kingdom.
Language: German,English Brand New Book ***** Print on Demand *****.Let K be an algebraic number field. The function attaching to each elliptic curve over K its conductor is constant on isoger. y classes of elliptic curves over K (for the definitions see chapter 1). Ioreover, for a given ideal a in OK the number of isogeny classes of elliptic curves over K with conductor a is finite. In these notes we deal with the following problem: How can one explicitly construct a set of representatives for the isogeny classes of elliptic curves over K with conductor a for a given ideal a in OK? The conductor of an elliptic curve over K is a numerical invariant which measures, in some sense, the badness of the reduction of the elliptic curve modulo the prime ideals in OK It plays an important role in the famous Weil-Langlands conjecture on the connection between elliptic curves over K and congruence subgroups in 5L2(OK) In case K this connection can be stated as follows. For any ideal a = (N) in let ro(N) be the congruence subgroup ro(N) { (: ) E 5L2 ( ) c E (N) } of 5L2 ( ) and let 52 (fo (N- be the space of cusp forms of weight 2 for r 0 (N) Now Weil conjectured that there exists a bijection between the rational normalized eigenforms in 52(ro(N- for the Heckealgebra and the - 2 - Lsug ny classes uf elliptic curves over with conductor a = (N) .
Von Händler/Antiquariat, The Book Depository EURO [60485773], Slough, United Kingdom.
Language: German,English Brand New Book ***** Print on Demand *****.Let K be an algebraic number field. The function attaching to each elliptic curve over K its conductor is constant on isoger. y classes of elliptic curves over K (for the definitions see chapter 1). Ioreover, for a given ideal a in OK the number of isogeny classes of elliptic curves over K with conductor a is finite. In these notes we deal with the following problem: How can one explicitly construct a set of representatives for the isogeny classes of elliptic curves over K with conductor a for a given ideal a in OK? The conductor of an elliptic curve over K is a numerical invariant which measures, in some sense, the badness of the reduction of the elliptic curve modulo the prime ideals in OK It plays an important role in the famous Weil-Langlands conjecture on the connection between elliptic curves over K and congruence subgroups in 5L2(OK) In case K this connection can be stated as follows. For any ideal a = (N) in let ro(N) be the congruence subgroup ro(N) { (: ) E 5L2 ( ) c E (N) } of 5L2 ( ) and let 52 (fo (N- be the space of cusp forms of weight 2 for r 0 (N) Now Weil conjectured that there exists a bijection between the rational normalized eigenforms in 52(ro(N- for the Heckealgebra and the - 2 - Lsug ny classes uf elliptic curves over with conductor a = (N) .
3
Elliptic Curves over Number Fields with Prescribed Reduction Type
DE NW
ISBN: 9783322875990 bzw. 3322875997, in Deutsch, Teubner, Leipzig, Deutschland, neu.
Lieferung aus: Deutschland, Lagernd.
Let K be an algebraic number field. The function attaching to each elliptic curve over K its conductor is constant on isoger. y classes of elliptic curves over K (for the definitions see chapter 1). ~Ioreover, for a given ideal a in OK the number of isogeny classes of elliptic curves over K with conductor a is finite. In these notes we deal with the following problem: How can one explicitly construct a set of representatives for the isogeny classes of elliptic curves over K with conductor a for a given ideal a in OK? The conductor of an elliptic curve over K is a numerical invariant which measures, in some sense, the badness of the reduction of the elliptic curve modulo the prime ideals in OK' It plays an important role in the famous Weil-Langlands conjecture on the connection between elliptic curves over K and congruence subgroups in 5L2(OK) • In case K ~ this connection can be stated as follows. For any ideal a = (N) in ~ let ro(N) be the congruence subgroup ro(N) { (: ~) E 5L2 (~) c E (N) } of 5L2 (~) and let 52 (fo (N» be the space of cusp forms of weight 2 for r 0 (N) Now Weil conjectured that there exists a bijection between the rational normalized eigenforms in 52(ro(N» for the Heckealgebra and the - 2 - Lsug~ny classes uf elliptic curves over ~ with conductor a = (N) .
Let K be an algebraic number field. The function attaching to each elliptic curve over K its conductor is constant on isoger. y classes of elliptic curves over K (for the definitions see chapter 1). ~Ioreover, for a given ideal a in OK the number of isogeny classes of elliptic curves over K with conductor a is finite. In these notes we deal with the following problem: How can one explicitly construct a set of representatives for the isogeny classes of elliptic curves over K with conductor a for a given ideal a in OK? The conductor of an elliptic curve over K is a numerical invariant which measures, in some sense, the badness of the reduction of the elliptic curve modulo the prime ideals in OK' It plays an important role in the famous Weil-Langlands conjecture on the connection between elliptic curves over K and congruence subgroups in 5L2(OK) • In case K ~ this connection can be stated as follows. For any ideal a = (N) in ~ let ro(N) be the congruence subgroup ro(N) { (: ~) E 5L2 (~) c E (N) } of 5L2 (~) and let 52 (fo (N» be the space of cusp forms of weight 2 for r 0 (N) Now Weil conjectured that there exists a bijection between the rational normalized eigenforms in 52(ro(N» for the Heckealgebra and the - 2 - Lsug~ny classes uf elliptic curves over ~ with conductor a = (N) .
4
Elliptic Curves over Number Fields with Prescribed Reduction Type (Aspects of Mathematics) (1983)
DE PB NW
ISBN: 9783528085698 bzw. 352808569X, in Deutsch, 213 Seiten, 1983. Ausgabe, Vieweg+Teubner Verlag, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandfertig in 1 - 2 Werktagen.
Von Händler/Antiquariat, BOOKS_ANY_USA.
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Von Händler/Antiquariat, BOOKS_ANY_USA.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen
6
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Elliptic Curves over Number Fields: With Prescribed Reduction Type (1983)
DE PB US
ISBN: 9783528085698 bzw. 352808569X, in Deutsch, Vieweg, Braunschweig/Wiesbaden, Deutschland, Taschenbuch, gebraucht.
Von Händler/Antiquariat, Black Oak Books Holdings Corp. [53531808], Berkeley, CA, U.S.A.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen
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7
Elliptic Curves over Number Fields with Prescribed Reduction Type
DE NW EB
ISBN: 9783322875990 bzw. 3322875997, in Deutsch, Springer Nature, neu, E-Book.
Lieferung aus: Vereinigte Staaten von Amerika, Lagernd.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen
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