DOIAbstract
AbstractWe generalize the Wiener-Hopf factorization of Laurent series to more general commutative coefficient rings, and we give explicit formulas for the decomposition. We emphasize the algebraic nature of this factorization
AbstractWe generalize the Wiener-Hopf factorization of Laurent series to more general commutative coefficient rings, and we give explicit formulas for the decomposition. We emphasize the algebraic nature of this factorization
A generalization of L{\"u}roth's theorem expresses that every transcendence degree 1 subfield of the...
AbstractThis paper presents an algebraic theory for the factorization of an invertible element x = r...
AbstractIt is proved that the unital Banach algebra of almost periodic functions of several variable...
AbstractWe generalize the Wiener-Hopf factorization of Laurent series to more general commutative co...
AbstractWe discuss analytic issues associated with a refinement of triangular factorization for the ...
We define the eñe product for the multiplicative group of polynomials and formal power series with c...
AbstractIf f = Σn=−∞∞ antn is a formal Laurent series with certain restrictions on the an, then f = ...
AbstractIn this article, we study the representation of a group of automorphisms into the ℓ-adic coh...
AbstractGiven a map f:X→Y of compact Hausdorff spaces, the Mardešić Factorization Theorem provides u...
We study the ring of polyfunctions over $\mathbb Z/n\mathbb Z$. The ring of polyfunctions over a com...
AbstractWe give a direct algorithmic proof of the implication “A seminormal implies A[X] seminormal”
AbstractFor a commutative ring R with many units, we describe the kernel of H3(inc):H3(GL2(R),Z)→H3(...
summary:In this paper we investigate commutativity of rings with unity satisfying any one of the pro...
Dolgachev proves that the ring naturally associated to a generic Laurent polynomial in d variables, ...
AbstractA p-adic method for the constructive factorization of monic polynomials over a dedekind ring...
A generalization of L{\"u}roth's theorem expresses that every transcendence degree 1 subfield of the...
AbstractThis paper presents an algebraic theory for the factorization of an invertible element x = r...
AbstractIt is proved that the unital Banach algebra of almost periodic functions of several variable...
AbstractWe generalize the Wiener-Hopf factorization of Laurent series to more general commutative co...
AbstractWe discuss analytic issues associated with a refinement of triangular factorization for the ...
We define the eñe product for the multiplicative group of polynomials and formal power series with c...
AbstractIf f = Σn=−∞∞ antn is a formal Laurent series with certain restrictions on the an, then f = ...
AbstractIn this article, we study the representation of a group of automorphisms into the ℓ-adic coh...
AbstractGiven a map f:X→Y of compact Hausdorff spaces, the Mardešić Factorization Theorem provides u...
We study the ring of polyfunctions over $\mathbb Z/n\mathbb Z$. The ring of polyfunctions over a com...
AbstractWe give a direct algorithmic proof of the implication “A seminormal implies A[X] seminormal”
AbstractFor a commutative ring R with many units, we describe the kernel of H3(inc):H3(GL2(R),Z)→H3(...
summary:In this paper we investigate commutativity of rings with unity satisfying any one of the pro...
Dolgachev proves that the ring naturally associated to a generic Laurent polynomial in d variables, ...
AbstractA p-adic method for the constructive factorization of monic polynomials over a dedekind ring...
A generalization of L{\"u}roth's theorem expresses that every transcendence degree 1 subfield of the...
AbstractThis paper presents an algebraic theory for the factorization of an invertible element x = r...
AbstractIt is proved that the unital Banach algebra of almost periodic functions of several variable...
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