| dc.description.abstract |
Let R be a commutative ring with unity. The notion of maximal non valuation
domain in an integral domain is introduced and characterized. A proper subring R of an
integral domain S is called a maximal non valuation domain in S if R is not a valuation
subring of S, and for any ring T such that R T S, T is a valuation subring of S.
For a local domain S, the equivalence of an integrally closed maximal non VD in S and
a maximal non local subring of S is established. The relation between dim(R,S) and the
number of rings between R and S is given when R is a maximal non VD in S and dim(R, S)
is finite. For a maximal non VD R in S such that R R′S S and dim(R, S) is finite, the
equality of dim(R,S) and dim(R′S , S) is established. |
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