AbstractLet K be any number field, and let E be a quadratic or a biquadratic extension of K. We give necessary conditions for the existence of a field N, respectively, cyclic of degree 4, dihedral or quaternionian of degree 8, over K, which admits a normal integral basis over E. When the class number of K is h(K) = 1, we prove that these conditions are also sufficient, and we provide explicit formulae to construct normal integral bases of N over E
Let L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], [formula...
AbstractLet p be an odd prime number, K an imaginary abelian field with ζp∈K×, and K∞/K the cyclotom...
AbstractSuppose thatL⊃Kare abelian extensions of the rationalsQwith Galois groups (Z/qsZ)nand (Z/qrZ...
AbstractLet K be any number field, and let E be a quadratic or a biquadratic extension of K. We give...
Let L be a quartic number field with a quadratic subfield K. In 1986 Kawamoto gave a necessary and s...
AbstractLet K/F be a Kummer cyclic extension of number fields. In the case when the degree is a prim...
Let $K/F$ be a Kummer cyclic extension of number fields. In the case when the degree is a prime n...
Abstract. Cyclic quartic fields possessing a unique normal integral basis are characterized and the ...
AbstractLet K be a cyclic Galois extension of Q of finite degree. We give two algorithms to construc...
Abstract. We present a very accurate formula for counting norms of normal integral bases in tame abe...
If E/F is a finite-dimensional Galois extension with Galois group G, then, by the Normal Basis Theor...
If E/F is a finite-dimensional Galois extension with Galois group G, then, by the Normal Basis Theor...
AbstractLet L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], ...
AbstractLet L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], ...
Explicit normal integral bases are given for some cyclic quintic fields defined by Emma Lehmer’s par...
Let L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], [formula...
AbstractLet p be an odd prime number, K an imaginary abelian field with ζp∈K×, and K∞/K the cyclotom...
AbstractSuppose thatL⊃Kare abelian extensions of the rationalsQwith Galois groups (Z/qsZ)nand (Z/qrZ...
AbstractLet K be any number field, and let E be a quadratic or a biquadratic extension of K. We give...
Let L be a quartic number field with a quadratic subfield K. In 1986 Kawamoto gave a necessary and s...
AbstractLet K/F be a Kummer cyclic extension of number fields. In the case when the degree is a prim...
Let $K/F$ be a Kummer cyclic extension of number fields. In the case when the degree is a prime n...
Abstract. Cyclic quartic fields possessing a unique normal integral basis are characterized and the ...
AbstractLet K be a cyclic Galois extension of Q of finite degree. We give two algorithms to construc...
Abstract. We present a very accurate formula for counting norms of normal integral bases in tame abe...
If E/F is a finite-dimensional Galois extension with Galois group G, then, by the Normal Basis Theor...
If E/F is a finite-dimensional Galois extension with Galois group G, then, by the Normal Basis Theor...
AbstractLet L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], ...
AbstractLet L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], ...
Explicit normal integral bases are given for some cyclic quintic fields defined by Emma Lehmer’s par...
Let L be a quartic number field with quadratic subfield Q([formula]). Then L = Q([formula], [formula...
AbstractLet p be an odd prime number, K an imaginary abelian field with ζp∈K×, and K∞/K the cyclotom...
AbstractSuppose thatL⊃Kare abelian extensions of the rationalsQwith Galois groups (Z/qsZ)nand (Z/qrZ...
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