Multiplicative isometries on the Smirnov class |
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Authors: | Osamu Hatori Yasuo Iida |
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Institution: | 1.Department of Mathematics, Faculty of Science,Niigata University,Niigata,Japan;2.Department of Mathematics,Iwate Medical University,Yahaba, Iwate,Japan |
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Abstract: | We show that T is a surjective multiplicative (but not necessarily linear) isometry from the Smirnov class on the open unit disk, the ball, or the polydisk onto itself,
if and only if there exists a holomorphic automorphism Φ such that T(f)=f ○ Φ for every class element f or T(f) = `(f° `(j)] )]\overline {f^\circ \bar \varphi } for every class element f, where the automorphism Φ is a unitary transformation in the case of the ball and Φ(z
1, ..., z
n
) = (l1 zi1 ,...,ln zin )(\lambda _1 z_{i_1 } ,...,\lambda _n z_{i_n } ) for |λ
j
| = 1, 1 ≤ j ≤ n, and (i
1; ..., i
n
)is some permutation of the integers from 1through n in the case of the n-dimensional polydisk. |
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Keywords: | |
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