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Halter-Koch, Franz - Institut für Mathematik und Wissenschaftliches Rechnen, Karl-Franzens-Universität Graz
CLIFFORD SEMIGROUPS OF IDEALS IN MONOIDS AND DOMAINS FRANZ HALTER-KOCH
Commutative Algebra and Applications, 112 de Gruyter 2009 Mixed invertibility and Prfer-like monoids and domains
CHARACTERIZATION OF PR UFER-LIKE MONOIDS AND DOMAINS BY GCD-THEORIES
Idealtheorie kommutativer Ringe und Monoide Franz Halter-Koch
Ubungen zu Algebraische Zahlentheorie / Zahlentheorie 1. Let K L, M K be fields, and suppose that K/K is algebraic.
Multiplicative ideal theory in the context of commutative monoids
Ubungen zu Algebraische Zahlentheorie / Zahlentheorie 26. Let R be a Dedekind domain, p P(R), K = q(R) and L/K a finite separable
NON-UNIQUE FACTORIZATIONS OF ALGEBRAIC INTEGERS FRANZ HALTER-KOCH
IDEAL SEMIGROUPS OF NOETHERIAN DOMAINS AND PONIZOVSKI DECOMPOSITIONS
THE TAME DEGREE AND RELATED INVARIANTS OF NON-UNIQUE FACTORIZATIONS
POLYNOMIAL PARAMETRIZATION OF THE SOLUTIONS OF CERTAIN SYSTEMS OF DIOPHANTINE EQUATIONS
DIOPHANTINE EQUATIONS OF PELLIAN TYPE FRANZ HALTER-KOCH
Algebraic Number Theory Franz Halter-Koch
Module theory By a ring we always mean a ring with 1, and by a module we always mean an unitary left-module.
