Diagonal Argument

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The Resultant, Episode 3

Last time the linear operator

Φ: K_n[x]⊕K_m[x] → K_m+n[x]
Φ(p,q)=pE+qF

made its grand entrance, clothed in the Sylvester matrix. (Recall that K_n[x] is the vector space of all polynomials of degree <n with coefficients in K, likewise for K_m[x] and K_m+n[x].)

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The Resultant, Episode 2

By now you know the characters: the polynomials E(x) (degree m) and F(x) (degree n) with coefficients in an integral domain R, its fraction field K, and the extension field L of K in which E and F split completely:

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The Resultant, Episode 1: Inside the Episode

In Episode 1 of our miniseries, “The Resultant”, the characters were introduced: integral domain R with fraction field K and extension field L, and polynomials E(x) and F(x) in R[x], factoring completely in L as a(x–u₁)···(x–u_m) and b(x–v₁)···(x–v_n). (Repeated roots allowed.) We had our first formulas for the resultant:

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The Resultant, Episode 1

Time to discuss the resultant; we’ll need it for Kendig’s proof of Bézout’s theorem, but it has other uses too. The story will take several episodes, plus extras. Like a miniseries!

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This will be a “chewing” post.

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Fulton characterizes the intersection number, I(P, E∩F), with seven properties. Let me just repeat the last one:

7.  I(E∩F) = I(E∩(F+AE)) for any A.

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The tome Commutative Algebra by Zariski and Samuel opens with the memorable sentence, “This book is the child of an unborn parent.” As Zariski explains,

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We’ve been looking at Kendig‘s two definitions of intersection multiplicity; now let’s look at Fulton‘s.

Fulton characterizes the multiplicity I(E∩F) with seven properties (§3.3). (Fulton calls it the intersection number. Also, he writes I(P,E∩F) for the intersection number at P. I’ll usually assume P is the origin O, and omit writing it.) The last three properties stand out:

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Last time we looked at Kendig‘s first definition of multiplicity. A branch of E, parametrized by (x_E(t),y_E(t)), passes through the origin O, as does the curve F. Assume x_E(t) and y_E(t) are power series in t. Plug them into the polynomial F(x,y), getting a power series F(t). The order of F(t) (the degree of the first nonzero term) is the multiplicity of that intersection—that is, of the branch of E with the entire curve F at O.

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Bézout’s theorem requires us to count intersection points according to their multiplicity. OK, what’s multiplicity? (Fulton uses the phrase intersection number.)

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