On the linear independence of $p$-adic $L$-functions modulo $p$

Bruno Anglès; Gabriele Ranieri

Displaying similar documents to “On the linear independence of $p$ -adic $L$ -functions modulo $p$ ”

Kloosterman sums for prime powers in -adic fields

Stanley J. Gurak (2009)

Journal de Théorie des Nombres de Bordeaux

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Let $K$ be a field of degree $n$ over $Q_{p}$ , the field of rational $p$ -adic numbers, say with residue degree $f$ , ramification index $e$ and differential exponent $d$ . Let $O$ be the ring of integers of $K$ and $P$ its unique prime ideal. The trace and norm maps for $K / Q_{p}$ are denoted $T r$ and $N$ , respectively. Fix $q = p^{r}$ , a power of a prime $p$ , and let $η$ be a numerical character defined modulo $q$ and of order $o (η)$ . The character $η$ extends to the ring of $p$ -adic integers $ℤ_{p}$ in the natural way; namely $η (u) = η (\tilde{u})$ , where $\tilde{u}$ denotes the residue...

Best approximations and porous sets

Simeon Reich, Alexander J. Zaslavski (2003)

Commentationes Mathematicae Universitatis Carolinae

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Let $D$ be a nonempty compact subset of a Banach space $X$ and denote by $S (X)$ the family of all nonempty bounded closed convex subsets of $X$ . We endow $S (X)$ with the Hausdorff metric and show that there exists a set $ℱ \subset S (X)$ such that its complement $S (X) ∖ ℱ$ is $σ$ -porous and such that for each $A \in ℱ$ and each $\tilde{x} \in D$ , the set of solutions of the best approximation problem $∥ \tilde{x} - z ∥ \to min$ , $z \in A$ , is nonempty and compact, and each minimizing sequence has a convergent subsequence.

Some results on the product of distributions and the change of variable

Emin Özçag, Brian Fisher (1991)

Commentationes Mathematicae Universitatis Carolinae

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Let $F$ and $G$ be distributions in $𝒟^{'}$ and let $f$ be an infinitely differentiable function with $f^{'} (x) > 0$ , (or $< 0$ ). It is proved that if the neutrix product $F \circ G$ exists and equals $H$ , then the neutrix product $F (f) \circ G (f)$ exists and equals $H (f)$ .

On the vanishing of Iwasawa invariants of absolutely abelian p-extensions

Gen Yamamoto (2000)

Acta Arithmetica

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1. Introduction. Let p be a prime number and $ℤ_{p}$ the ring of p-adic integers. Let k be a finite extension of the rational number field ℚ, $k_{\infty}$ a $ℤ_{p}$ -extension of k, $k_{n}$ the nth layer of $k_{\infty} / k$ , and $A_{n}$ the p-Sylow subgroup of the ideal class group of $k_{n}$ . Iwasawa proved the following well-known theorem about the order $A_{n}$ of $A_{n}$ : Theorem A (Iwasawa). Let $k_{\infty} / k$ be a $ℤ_{p}$ -extension and $A_{n}$ the p-Sylow subgroup of the ideal class group of $k_{n}$ , where $k_{n}$ is the $n$ th layer of $k_{\infty} / k$ . Then there exist integers $λ = λ (k_{\infty} / k) \geq 0$ , $μ = μ (k_{\infty} / k) \geq 0$ , $ν = ν (k_{\infty} / k)$ , and n₀ ≥ 0...

Examples of functions -extendable for each finite, but not $^{\infty}$ -extendable

Wiesław Pawłucki (1998)

Banach Center Publications

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In Example 1, we describe a subset X of the plane and a function on X which has a $^{k}$ -extension to the whole $ℝ^{2}$ for each finite, but has no $^{\infty}$ -extension to $ℝ^{2}$ . In Example 2, we construct a similar example of a subanalytic subset of $ℝ^{5}$ ; much more sophisticated than the first one. The dimensions given here are smallest possible.

Displaying similar documents to “On the linear independence of p -adic L -functions modulo p ”

Kloosterman sums for prime powers in -adic fields

Best approximations and porous sets

Some results on the product of distributions and the change of variable

On the vanishing of Iwasawa invariants of absolutely abelian p-extensions

Examples of functions -extendable for each finite, but not ∞ -extendable

Displaying similar documents to “On the linear independence of $p$ -adic $L$ -functions modulo $p$ ”

Examples of functions -extendable for each finite, but not $^{\infty}$ -extendable