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Acta Mathematica Scientia > 2010 > 30 > 1 > 19-26

_{2}F for local fields F, we prove that every element in K

_{2}ℚ is a finite or infinite product of cyclotomic elements. Next, we extend this result to finite extensions of ℚ satisfying some additional conditions.

Chinese Annals of Mathematics, Series B > 2007 > 28 > 5 > 507-520

*K*

_{2}(

*F*)" (Algebraic

*K*-Theory, Lecture Notes in Math.,

**966**, 1982, 1–6.), the author investigates elements of the form {

*a*, Φ

*n*(

*a*)} in the Milnor group

*K*

_{2}

*F*of a field

*F*, where Φ

*n*(

*x*) is the

*n*-th cyclotomic polynomial. In this paper, these elements are generalized. Applying the explicit formulas of Rosset and Tate for the transfer homomorphism for

*K*

_{2}, the author...

Chinese Annals of Mathematics, Series B > 2007 > 28 > 5 > 571-582

Acta Mathematica Sinica, English Series > 2007 > 23 > 10 > 1807-1812

*p*

^{ n }-rank of the tame kernel of a cyclic cubic field

*F*with the

*p*

^{ n }-rank of the coinvariants of $$ \mu _{{p^{n} }} \otimes Cl{\left( {{\fancyscript O}_{{E,T}} } \right)}...

Chinese Annals of Mathematics, Series B > 2006 > 27 > 5 > 565-580