Ziegler

Results: 830



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731THE ADDITIVE UNIT STRUCTURE OF COMPLEX BI-QUADRATIC FIELDS VOLKER ZIEGLER Abstract. We determine which rings of the form Z[α] are generated by their units, where α is a root of the polynomial X 4 − BX 2 + D such that

THE ADDITIVE UNIT STRUCTURE OF COMPLEX BI-QUADRATIC FIELDS VOLKER ZIEGLER Abstract. We determine which rings of the form Z[α] are generated by their units, where α is a root of the polynomial X 4 − BX 2 + D such that

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Source URL: finanz.math.tu-graz.ac.at

Language: English - Date: 2010-09-29 02:35:13
732ON THUE EQUATIONS OF SPLITTING TYPE OVER FUNCTION FIELDS VOLKER ZIEGLER Abstract. In this paper we consider Thue equations of splitting type over the ring k[T ], i.e. they have the form

ON THUE EQUATIONS OF SPLITTING TYPE OVER FUNCTION FIELDS VOLKER ZIEGLER Abstract. In this paper we consider Thue equations of splitting type over the ring k[T ], i.e. they have the form

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Source URL: finanz.math.tu-graz.ac.at

Language: English - Date: 2010-09-29 02:35:11
    733ON A FAMILY OF THUE EQUATIONS OF DEGREE 16 VOLKER ZIEGLER Abstract. We consider a parameterized family of Thue equations of degree 16. By reducing this family to a system of Pell equations and linear relations, we are ab

    ON A FAMILY OF THUE EQUATIONS OF DEGREE 16 VOLKER ZIEGLER Abstract. We consider a parameterized family of Thue equations of degree 16. By reducing this family to a system of Pell equations and linear relations, we are ab

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    Source URL: finanz.math.tu-graz.ac.at

    Language: English - Date: 2010-09-29 02:35:13
    734ON ARITHMETIC PROGRESSIONS IN RECURRENCES A NEW CHARACTERIZATION OF THE FIBONACCI SEQUENCE ´ ´ AND VOLKER ZIEGLER AKOS PINTER

    ON ARITHMETIC PROGRESSIONS IN RECURRENCES A NEW CHARACTERIZATION OF THE FIBONACCI SEQUENCE ´ ´ AND VOLKER ZIEGLER AKOS PINTER

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    Source URL: finanz.math.tu-graz.ac.at

    Language: English - Date: 2010-09-29 02:35:09
    735ON GEOMETRIC PROGRESSIONS ON PELL EQUATIONS AND LUCAS SEQUENCES ´ ATTILA BERCZES AND VOLKER ZIEGLER

    ON GEOMETRIC PROGRESSIONS ON PELL EQUATIONS AND LUCAS SEQUENCES ´ ATTILA BERCZES AND VOLKER ZIEGLER

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    Source URL: finanz.math.tu-graz.ac.at

    Language: English - Date: 2012-04-10 02:05:29
    736ON THE UNIFORM DISTRIBUTION MODULO 1 OF MULTIDIMENSIONAL LS-SEQUENCES CHRISTOPH AISTLEITNER, MARKUS HOFER, AND VOLKER ZIEGLER Abstract. Ingrid Carbone introduced the notion of so-called LS-sequences of points, which are

    ON THE UNIFORM DISTRIBUTION MODULO 1 OF MULTIDIMENSIONAL LS-SEQUENCES CHRISTOPH AISTLEITNER, MARKUS HOFER, AND VOLKER ZIEGLER Abstract. Ingrid Carbone introduced the notion of so-called LS-sequences of points, which are

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    Source URL: finanz.math.tu-graz.ac.at

    Language: English - Date: 2013-02-04 09:21:15
    737Journal de Th´eorie des Nombres de Bordeaux 00 (XXXX), 000–000 Thomas’ conjecture over Function Fields par Volker Ziegler‡ ´sume

    Journal de Th´eorie des Nombres de Bordeaux 00 (XXXX), 000–000 Thomas’ conjecture over Function Fields par Volker Ziegler‡ ´sume

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    Source URL: finanz.math.tu-graz.ac.at

    Language: English - Date: 2010-09-29 02:35:14
    738A NOTE ON THE NUMBER OF S-DIOPHANTINE QUADRUPLES FLORIAN LUCA AND VOLKER ZIEGLER Abstract. Let (a1 , . . . , am ) be an m-tuple of positive, pairwise distinct integers. If for all 1 ≤ i < j ≤ m the prime divisors of

    A NOTE ON THE NUMBER OF S-DIOPHANTINE QUADRUPLES FLORIAN LUCA AND VOLKER ZIEGLER Abstract. Let (a1 , . . . , am ) be an m-tuple of positive, pairwise distinct integers. If for all 1 ≤ i < j ≤ m the prime divisors of

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    Source URL: finanz.math.tu-graz.ac.at

    Language: English - Date: 2014-03-24 08:36:15
      739S-DIOPHANTINE QUADRUPLES WITH TWO PRIMES CONGRUENT 3 MODULO 4 ´ ´ SZALAY AND VOLKER ZIEGLER LASZL O

      S-DIOPHANTINE QUADRUPLES WITH TWO PRIMES CONGRUENT 3 MODULO 4 ´ ´ SZALAY AND VOLKER ZIEGLER LASZL O

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      Source URL: finanz.math.tu-graz.ac.at

      Language: English - Date: 2013-09-09 08:12:48
      740√ ON UNIT POWER INTEGRAL BASES OF Z[ 4 m] VOLKER ZIEGLER Abstract. Let m 6= 0 be an integer which is not a perfect square and consider √ number fields of the form Q( 4 m). We characterize all orders of the form

      √ ON UNIT POWER INTEGRAL BASES OF Z[ 4 m] VOLKER ZIEGLER Abstract. Let m 6= 0 be an integer which is not a perfect square and consider √ number fields of the form Q( 4 m). We characterize all orders of the form

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      Source URL: finanz.math.tu-graz.ac.at

      Language: English - Date: 2010-09-29 02:35:10