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zbMath0988.13003MaRDI QIDQ2752919

Muhammad Zafrullah

Publication date: 15 July 2002

Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.

zbMATH Keywords

Bibliography \(t\)-operation PVMD \(w\)-operation star-operation \(t\)-class group

Mathematics Subject Classification ID

Ideals and multiplicative ideal theory in commutative rings (13A15) Divisibility and factorizations in commutative rings (13A05)

Related Items (34)

Unnamed Item ⋮ General w-ZPI-Rings and a Tool for Characterizing Certain Classes of Monoid Rings ⋮ Revisiting G-Dedekind domains ⋮ A note on perinormal domains ⋮ SEMIGROUP RINGS AS H-DOMAINS ⋮ \(t\)-invertibility and Bazzoni-like statements ⋮ Integral domains issued from associated primes ⋮ Almost Quasi-Schreier Domains ⋮ ∗-Almost super-homogeneous ideals in ∗-h-local domains ⋮ Integral domains of finite \(t\)-character ⋮ Invertibility, Semistar Operations, and the Ring of Finite Fractions ⋮ On a general theory of factorization in integral domains ⋮ Bazzoni’s conjecture and almost Prüfer domains ⋮ Every divisor class of Krull monoid domains contains a prime ideal ⋮ Unique representation domains. II. ⋮ Functorial Properties of Star Operations: New Developments ⋮ \(FT\)-domains and Gorenstein Prüfer \(v\)-multiplication domains ⋮ Some remarks on Prüfer \(\bigstar\)-multiplication domains and class groups ⋮ t-Schreier Domains ⋮ Weakly Krull and related domains of the form \(D+M, A+XB[X\) and \(A+X^2B[X]\)] ⋮ A ``\(v\)-operation free approach to Prüfer \(v\)-multiplication domains ⋮ Unnamed Item ⋮ \(w\)-divisorial domains ⋮ Almost splitting sets in integral domains ⋮ Characterizing domains of finite \(*\)-character ⋮ Unnamed Item ⋮ Star operations in extensions of integral domains ⋮ A property of weakly Krull domains ⋮ Almost Krull domains and their rings of integer-valued polynomials ⋮ Intersections of quotient rings and Prüfer v-multiplication domains ⋮ Riesz and pre-Riesz monoids ⋮ Star Almost Schreier Domains ⋮ On \(\star\)-potent domains and \(\star\)-homogeneous ideals ⋮ Domains whose ideals meet a universal restriction

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