evala/Norm - norm of an algebraic number (or function)
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Calling Sequence
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Norm(a, L, K)
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Parameters
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a
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any expression
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L
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(optional) set of RootOfs
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K
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(optional) set of RootOfs
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Description
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The Norm function is a placeholder for representing the norm of an algebraic number (or function), that is the product of its conjugates. It is used in conjunction with evala.
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The call evala(Norm(a, L, K)) computes the norm of a over the algebraic number (or function) field represented by K. In case K is not specified and a is an algebraic number, the norm over the rational is computed. In case K is not specified and a is an algebraic function, the smallest possible algebraic extension of the rational numbers is chosen. The expression a is viewed as an element of the smallest field containing a and the RootOfs in L.
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The RootOfs in K must form a subset of the RootOfs occurring in L and in a. In other words, K must be a 'syntactic' subfield of the field generated by L and the RootOfs in a.
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Examples
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The name Norm must be global.
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