Deligne I Section 3

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last updates: 3 June 2011

The fundamental bound

The result of this paragraph was catalysed by a lecture of Rankin [Ra].

(3.1) Let $U_{0}$ be a curve over $𝔽_{q}$ , the complement in $ℙ^{1}$ of a finite number of closed points, $U$ the induced curve over ${\overline{𝔽}}_{q}$ , $u$ a closed point of $U$ , $ℱ_{0}$ a twisted constant $ℚ_{ℓ}$ -sheaf over $U_{0}$ and $ℱ$ its reciprocal image over $U$ .

Let $β \in ℚ$ . We say that $ℱ_{0}$ has weight $β$ if for every $x \in | U_{0} |$ , the proper values of $F_{x}$ act on $ℱ_{0}$ (1.13) are algebraic numbers all of whose complex conjugates have absolute value $q_{x}^{β / 2}$ . For example, $ℚ_{ℓ} (r)$ is of weights $- 2 r$ .

(3.2) Make the following hypotheses:

(i)

ℱ_{0}

is endowed with a nondegenerate alternating bilinear form

ψ : ℱ_{0} \otimes ℱ_{0} \to ℚ_{ℓ} (- β) (β \in ℤ) .

(ii) The image

π_{1} (U, u)

GL (ℱ_{u})

is an open subgroup of the symplectic group

Sp (ℱ_{u}, ψ_{u})

(iii) For every

x \in | U_{0} |

, the polynomial

\det (1 - F_{x} t, ℱ_{0})

has rational coefficients.

Then

ℱ

has weight

β

On may assume, and we will assume that $U$ is affine and that $ℱ \neq 0$ .

(3.3) Let

2 k

be an even integer and let

⨂^{2 k} ℱ_{0}

be the

(2 k)

th tensor power of

ℱ_{0}

. For

x \in | U_{0} |

, the logarithmic derivative

t \frac{d}{d t} \log (\det (1 - F_{x} t^{\deg (x)}, ⨂^{2 k} ℱ_{0})^{- 1})

is a formal series with positive rational coefficients.

The hypothesis (iii) assures that, for every $n$ , $Tr (F_{x}^{n}, ℱ_{0}) \in ℚ$ . The number

Tr (F_{x}^{n}, ⨂^{2 k} ℱ_{0}) = {Tr (F_{x}^{n}, ℱ_{0})}^{2 k}

is thus positive rational, and one applies (1.5.3).

(3.4) The local factors

\det (1 - F_{x} t^{\deg (x)}, ⨂^{2 k} ℱ_{0})^{- 1}

are formal series with positive rational coefficients.

The formal series $\log \det (1 - F_{x} t^{\deg (x)}, ⨂^{2 k} ℱ_{0})^{- 1}$ is without constant term; by (3.3), its coefficients are $\geq 0$ ; the coefficients of its exponential are also positive.

(3.5) Let

f_{i} = \sum_{n} a_{i, n} t^{n}

a sequence of formal series with constant term one, and with positive real coefficients. Assume that the order of

f_{i} - 1

goes to infinity with

i

, and one puts

f = \prod_{i} f_{i}

. Then the radius of absolute convergence of the

f_{i}

is at least equal to that of

f

(3.6) Under the hypotheses of (3.5), if

f

and the

f_{i}

are the Taylor series expansions of meromorphic functions then

\inf {| z | | f (z) = \infty} \leq \inf {| z | | f_{i} (z) = \infty}

In fact these numbers are the radii of absolute convergence.

(3.7) For each partition $P$ of $[1, 2 k]$ in subsets of two elements ${i_{α}, j_{α}}$ $(i_{α} < j_{α})$ , one defines

\begin{matrix} ψ_{P} : & ⨂^{2 k} ℱ_{0} & ⟶ & ℚ_{ℓ} (- k β) \\ x_{1} \otimes \dots \otimes x_{2 k} & ⟼ & \prod_{α} ψ (x_{i_{α}}, x_{j_{α}}) . \end{matrix}

Let $x$ be a closed point of $X$ . The hypothesis (ii) guarantees that the coinvariants of $π_{1} (U, u)$ in $⨂^{2 k} ℱ_{u}$ are the coinvariants in $⨂^{2 k} ℱ_{u}$ of the full symplectic group ( $π_{1}$ is Zariski-dense in $Sp$ ). Let $𝒫$ be the set of partitions $P$ . Following H. Weyl (The classical groups, Princeton University Press, chap. VI § 1), for appropriate $𝒫' \subseteq 𝒫$ the $ψ_{P}$ for $P \in 𝒫'$ define an isomorphism

{(⨂^{2 k} ℱ_{u})}_{π_{1}} = {(⨂^{2 k} ℱ_{u})}_{Sp} \tilde{\to} {ℚ_{ℓ} (- k β)}^{𝒫'} .

Let

N

be the number of elements of

𝒫'

. By (2.10), the formula above gives

H_{c}^{2} (U, ⨂^{2 k} ℱ) ≃ {ℚ_{ℓ} (- k β - 1)}^{N} .

Since

H_{c}^{0} (U, ⨂^{2 k} ℱ) = 0,
the formula (1.14.3) reduces to

Z (U_{0}, ⨂^{2 k} ℱ_{0}, t) = \frac{\det (1 - F^{*} t, H^{1} (U, ⨂^{2 k} ℱ))}{{(1 - q^{k β + 1} t)}^{N}} .

This function

Z

is thus the Taylor expansion of a rational function which has no pole except at

t = 1 / q^{k β + 1}

. We will use only the fact that the poles are of absolute value has no pole except at

1 / q^{k β + 1}

ℂ

. This can be deduced from general arguments on reductive groups. If

α

is an eigenvalue of

F_{x}

ℱ_{0}

, then

α^{2 k}

is an eigenvalue of

F_{x}

⨂^{2 k} ℱ_{0}

. We will also denote any complex conjugate of

α

α

. The inverse power

1 / α^{2 k / \deg (x)}

is a pole of

\det (1 - F_{x} t^{\deg (x)}, ⨂^{2 k} ℱ)^{- 1}

. By (3.4) and (3.6), it follows that

| 1 / q^{k β + 1} | \leq | 1 / α^{2 k / \deg (x)} |,

so that

| α | \leq q_{x}^{\frac{β}{2} + \frac{1}{2 k}} .

Letting

k

tend to infinity, one finds that

| α | \leq q_{x}^{β / 2} .

On the other hand, the existence of

ψ

guarantees that

q_{x}^{β} α^{- 1}

is also an eigenvalue, whence the inequality

| q_{x}^{β} α^{- 1} | \leq q_{x}^{β / 2} .

so that

q_{x}^{β / 2} \leq | α | .

This completes the proof.

(3.8) Let

α

be an eigenvalue of

F^{*}

acting on

H_{x}^{*} (U, ℱ)

. Then

α

is an algebraic number, and all its complex conjugates satisfy

| α | \leq q^{\frac{β + 1}{2} + \frac{1}{2}} .

The formula (1.14.3) for $ℱ_{0}$ reduces to

Z (U_{0}, ℱ_{0}, t) = \det (1 - F^{*} t, H_{x}^{1} (U, ℱ)) .

The left hand side is a formal power series with rational coefficients, as seen from its expression as a product and the hypothesis (iii). The right hand side is thus a polynomial with rational coefficients;

1 / α

is a root. This already proves that

α

is algebraic. To complete the proof, it suffices to check that the infinite product that defines

Z (U_{0}, ℱ_{0}, t)

converges absolutely (thus is nonzero) for

| t | \leq q^{\frac{- β}{2} - 1}

Let $N$ be the rank of $ℱ$ , and put

\det (1 - F_{x} t, ℱ) = \prod_{i = 1}^{N} (1 - α_{i, x} t) .

By (3.2),

| α_{i, x} | = q_{x}^{3 / 2}

. The convergence of the infinite product is a result of the series

\sum_{i, x} | α_{i, x} t^{\det (x)} |,

For

| t | \leq q^{\frac{- β}{2} - 1 - x}

(

ε > 0

), we have

\sum_{i, x} | α_{i, x} t^{\det (x)} | = N \sum_{x} q_{x}^{- 1 - x} .

On the affine line, there are

q^{n}

points with values in

𝔽_{q^{n}}

, hence at most

q^{n}

closed points of degree

n

. Thus we have

\sum_{x} q_{x}^{- 1 - x} \leq \sum_{x} q^{n} q^{n (- 1 - x)} = \sum_{x} q^{- n x} < \infty,

which completes the proof.

(3.9) Let

j_{0}

be the inclusion of

U_{0}

ℙ^{1}

, and

α

an eigenvalue of

F^{*}

acting on

H^{1} (ℙ^{1}, j_{*} ℱ)

. Then

α

is an algebraic number, and all its complex conjugates satisfy

q^{\frac{β + 1}{2} - \frac{1}{2}} \leq | α | \leq q^{\frac{β + 1}{2} + \frac{1}{2}} .

A part of the long exact sequence in cohomology defined by the short exact sequence

0 ⟶ j_{!} ℱ ⟶ j_{*} ℱ ⟶ j_{*} ℱ / j_{!} ℱ ⟶ 0

(

j_{!}

= extension by 0) is written

H_{c}^{1} (U, ℱ) ⟶ H^{1} (ℙ^{1}, j_{*} ℱ) ⟶ 0 .

Thus the eigenvalue

α

appears already in

H_{c}^{1} (U, ℱ)

, and on account of (3.8):

| α | \leq q^{\frac{β + 1}{2} + \frac{1}{2}} .

Poincaré duality (2.12) guarantees that

q^{β + 1} α^{- 1}

is also an eigenvalue, whence the inequality

| q^{β + 1} α^{- 1} | \leq q^{\frac{β + 1}{2} + \frac{1}{2}} .

and the corollary.

Notes and References

This is an attempt to translate Section 3 of [DeI].

References

[DeI] P. Deligne, La Conjecture de Weil I, Publ. Math. IHÉS (1974) 273-307. MR????????.

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