Add to ORKGLet $A$ be a Dedekind domain, $K$ the fraction field of $A$, and $f\in A[x]$ a monic irreducible separable polynomial. For a given non-zero prime ideal $\mathfrak{p}$ of $A$ we present in this paper a new method to compute a $\mathfrak{p}$-integral basis of the extension of $K$ determined by $f$. Our method is based on the use of simple multipliers that can be constructed with the data that occurs along the flow of the Montes Algorithm. Our construction of a $\mathfrak{p}$-integral basis is significantly faster than the similar approach from $[7]$ and provides in many cases a priori a triangular basis
AbstractLet R be a Dedekind ring, K its quotient field, L a separable finite extension over K, and O...
AbstractLet R be a Dedekind domain with field of fractions K, L = K(α) a finite separable extension ...
AbstractLet K be an algebraic function field of one variable over a finite field of characteristic p...
Let $A$ be a Dedekind domain, $K$ the fraction field of $A$, and $f\in A[x]$ a monic irreducible sep...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain whose field of fractions K is a global field. Let p be a non-zero prime i...
Let $K$ be the number field determined by a monic irreducible polynomial $f(x)$ with integer coeffic...
Let K be the number field determined by a monic irreducible polynomial f(x) with integer coefficient...
Algebraic number theory is essentially the study of number fields, which are subfields of the comple...
summary:Let $L = K(\alpha )$ be an extension of a number field $K$, where $\alpha $ satisfies the mo...
AbstractLet R be a Dedekind domain with field of fractions K, L = K(α) a finite separable extension ...
AbstractLet R be a Dedekind ring, K its quotient field, L a separable finite extension over K, and O...
AbstractLet R be a Dedekind domain with field of fractions K, L = K(α) a finite separable extension ...
AbstractLet K be an algebraic function field of one variable over a finite field of characteristic p...
Let $A$ be a Dedekind domain, $K$ the fraction field of $A$, and $f\in A[x]$ a monic irreducible sep...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
Let A be a Dedekind domain whose field of fractions K is a global field. Let p be a non-zero prime i...
Let $K$ be the number field determined by a monic irreducible polynomial $f(x)$ with integer coeffic...
Let K be the number field determined by a monic irreducible polynomial f(x) with integer coefficient...
Algebraic number theory is essentially the study of number fields, which are subfields of the comple...
summary:Let $L = K(\alpha )$ be an extension of a number field $K$, where $\alpha $ satisfies the mo...
AbstractLet R be a Dedekind domain with field of fractions K, L = K(α) a finite separable extension ...
AbstractLet R be a Dedekind ring, K its quotient field, L a separable finite extension over K, and O...
AbstractLet R be a Dedekind domain with field of fractions K, L = K(α) a finite separable extension ...
AbstractLet K be an algebraic function field of one variable over a finite field of characteristic p...