Spelling suggestions: "subject:"adc"" "subject:"adi""
1 |
Algebraic numbers and harmonic analysis in the p-series caseAubertin, Bruce Lyndon January 1986 (has links)
For the case of compact groups G = Π∞ j=l Z(p)j which are direct products
of countably many copies of a cyclic group of prime order p, links are established between the theories of uniqueness and spectral synthesis on the one hand, and the theory of algebraic numbers on the other, similar to the well-known results of Salem, Meyer et al on the circle.
Let p ≥ 2 be a prime and let k{x⁻¹} denote the p-series field of
formal Laurent series z = Σhj=₋∞ ajxj with coefficients in the field
k = {0, 1,…, p-1} and the integer h arbitrary. Let L(z) = - ∞ if aj = 0 for all j; otherwise let L(z) be the largest index h for which ah ≠ 0. We examine compact sets of the form
[Algebraic equation omitted]
where θ ε k{x⁻¹}, L(θ) > 0, and I is a finite subset of k[x].
If θ is a Pisot or Salem element of k{x⁻¹}, then E(θ,I) is always a set of strong synthesis. In the case that θ is a Pisot element, more can be proved, including a version of Bochner's property leading to a sharper statement of synthesis, provided certain assumptions are made on I (e.g., I ⊃ {0,1,x,...,xL(θ)-1}).
Let G be the compact subgroup of k{x⁻¹} given by G = {z: L(z) < 0}.
Let θ ɛ k{x⁻¹}, L(θ) > 0, and suppose L(θ) > 1 if p = 3 and L(θ) > 2 if p = 2. Let I = {0,1,x,...,x²L(θ)-1}. Then E = θ⁻¹Ε(θ,I) is a perfect subset of G of Haar measure 0, and E is a set of uniqueness
for G precisely when θ is a Pisot or Salem element.
Some byways are explored along the way. The exact analogue of Rajchman's theorem on the circle, concerning the formal multiplication of series, is obtained; this is new, even for p = 2. Other examples are given of perfect sets of uniqueness, of sets satisfying the Herz criterion
for synthesis, and sets of multiplicity, including a class of M-sets of measure 0 defined via Riesz products which are residual in G.
In addition, a class of perfect M₀-sets of measure 0 is introduced
with the purpose of settling a question left open by W.R. Wade and
K. Yoneda, Uniqueness and quasi-measures on the group of integers of a
p-series field, Proc. A.M.S. 84 (1982), 202-206. They showed that if
S is a character series on G with the property that some subsequence
{SpNj} of the pn-th partial sums is everywhere pointwise bounded on G,
then S must be the zero series if SpNj → 0 a.e.. We obtain a strong
complement to this result by establishing that series S on G exist for
which Sn → 0 everywhere outside a perfect set of measure 0, and for
which sup |SpN| becomes unbounded arbitrarily slowly. / Science, Faculty of / Mathematics, Department of / Graduate
|
2 |
On p-adic L-functions. / L-functionsJanuary 1990 (has links)
by Lee-Shing Ma. / Thesis (M.Phil.)--Chinese University of Hong Kong, 1990. / Bibliography: leaves 119-122. / Chapter 1) --- INTRODUCTION --- p.1 / Chapter 2) --- P-ADIC DIRICHLET L-FUNCTION --- p.5 / Chapter §1. --- P-ADIC INTERPOLATION --- p.5 / Chapter §2. --- THE POWER SERIES METHOD --- p.11 / Chapter §3. --- MEASURE AND DISTRIBUTION --- p.18 / Chapter §4. --- IWASAWA' S METHOD --- p.29 / Chapter 3) --- P-ADIC L-FUNCTION OVER TOTALLY REAL FIELD --- p.40 / Chapter §1. --- COATE'S STATEMENTS --- p.40 / Chapter §2. --- P-ADIC L-FUNCTION OVER REAL QUADRATIC FIELD --- p.49 / Chapter §3. --- P-ADIC MODULAR FORM --- p.58 / Chapter §4. --- P-ADIC L-FUNCTION OVER TOTALLY REAL FIELD 。 --- p.65 / Chapter 4) --- GAMMA TRANSFORM AND P-ADIC L-FUNCTION --- p.79 / Chapter §1. --- FOURIER TRANSFORM AND r-TRANSFORM --- p.79 / Chapter §2. --- THE u-INVARIANT OF r-TRANSFORM --- p.84 / Chapter §3. --- THE RADIUS OF CONVERGENCE --- p.92 / Chapter 5) --- P-ADIC ARTIN L-FUNCTION --- p.100 / Chapter §1. --- THE MAIN CONJECTURE --- p.100 / Chapter §2. --- THE P-ADIC ARTIN CONJECTURE --- p.104 / Chapter §3. --- MORE ABOUT THE P-ADIC ARTIN CONJECTURE --- p.113 / BIBLIOGRAPHY --- p.119
|
3 |
p-adic analysis and p-adic integrationSimons, Lloyd D. January 1979 (has links)
No description available.
|
4 |
The families with period 1 of 2-groups of coclass 3 /Smith, Duncan January 2000 (has links)
Thesis (M. Sc.)--University of New South Wales, 2000. / Also available online.
|
5 |
p-adic analysis and p-adic integrationSimons, Lloyd D. January 1979 (has links)
No description available.
|
6 |
Two topics in p-adic approximationLaohakosol, Vichian. January 1978 (has links) (PDF)
Bibliographies: leaves ii & 146-150.
|
7 |
Two topics in p-adic approximation /Laohakosol, Vichian. January 1978 (has links) (PDF)
Thesis (M. Sc.)--University of Adelaide, 1979. / Bibliographies: leaves ii & 146-150.
|
8 |
Equidimensional adic eigenvarieties for groups with discrete seriesGulotta, Daniel Robert January 2018 (has links)
We extend Urban's construction of eigenvarieties for reductive groups G such that G(R) has discrete series to include characteristic p points at the boundary of weight space. In order to perform this construction, we define a notion of "locally analytic" functions and distributions on a locally Q_p-analytic manifold taking values in a complete Tate Z_p-algebra in which p is not necessarily invertible. Our definition agrees with the definition of locally analytic distributions on p-adic Lie groups given by Johansson and Newton.
|
9 |
Power series in P-adic roots of unityNeira, Ana Raissa Bernardo 28 August 2008 (has links)
Not available / text
|
10 |
Mahler's order functions and algebraic approximation of p-adic numbers /Dietel, Brian Christopher. January 1900 (has links)
Thesis (Ph. D.)--Oregon State University, 2009. / Printout. Includes bibliographical references (leaves 62-64). Also available on the World Wide Web.
|
Page generated in 0.0425 seconds