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Let I be an ideal of the local polynomial ring
K[x1, ..., xn]< x1, ..., xn >, where K is a field.
As for polynomial rings, the dimension of the ideal I
can be defined as the
the maximum of the cardinalities of all the independent sets
modulo I (see Section Dimension of Ideals for details).
Dimension(I) : RngMPolLoc -> RngIntElt, [ RngIntElt ]
Given an ideal I of a local polynomial ring R defined over a field,
return the dimension d of I, together with a (sorted) sequence U of integers
of length d such that the variables of P corresponding to the integers
of U constitute a maximally independent set modulo I.
If I is the full local polynomial ring R, the dimension is defined to
be -1, and the second return value is not set.
The algorithm implemented is that given in [BW93, p. 449].
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