Witt Vectors. Part 1 Michiel Hazewinkel Sidenotes by Darij Grinberg
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چکیده
Caution: These polynomials are referred to as w0, w1, w2, ... in Sections 5-8 of [1]. However, beginning with Section 9 of [1], Hazewinkel uses the notations w1, w2, w3, ... for some different polynomials (the so-called big Witt polynomials, defined by formula (9.25) in [1]), which are not the same as our polynomials w1, w2, w3, ... (though they are related to them: in fact, the polynomial wk that we have just defined here is the same as the polynomial which is called wpk in [1] from Section 9 on, up to a change of variables; however, the polynomial which is called wk from in [1] from Section 9 on is totally different and has nothing to do with our wk).
منابع مشابه
Witt vectors . Part 1 Michiel
Witt#1: The Burnside Theorem [completed, not proofread] Theorem 1, the Burnside theorem ([1], 19.10). Let G be a finite group, and let X and Y be finite G-sets. Then, the following two assertions A and B are equivalent: Assertion A: We have X ∼ = Y , where ∼ = means isomorphism of G-sets.
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Caution: These polynomials are referred to as w0, w1, w2, ... in Sections 5-8 of [1]. However, beginning with Section 9 of [1], Hazewinkel uses the notations w1, w2, w3, ... for some different polynomials (the so-called big Witt polynomials, defined by formula (9.25) in [1]), which are not the same as our polynomials w1, w2, w3, ... (though they are related to them: in fact, the polynomial wk t...
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Caution: These polynomials are referred to as w0, w1, w2, ... in Sections 5-8 of [1]. However, beginning with Section 9 of [1], Hazewinkel uses the notations w1, w2, w3, ... for some different polynomials (the so-called big Witt polynomials, defined by formula (9.25) in [1]), which are not the same as our polynomials w1, w2, w3, ... (though they are related to them: in fact, the polynomial wk t...
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