共查询到20条相似文献,搜索用时 31 毫秒
1.
Zhi-Wei Sun 《Proceedings of the American Mathematical Society》1999,127(5):1293-1300
Let be a system of arithmetic sequences which forms an -cover of (i.e. every integer belongs at least to members of ). In this paper we show the following surprising properties of : (a) For each there exist at least subsets of with such that . (b) If forms a minimal -cover of , then for any there is an such that for every there exists an for which and
2.
Akira Yamada 《Proceedings of the American Mathematical Society》1999,127(5):1399-1408
Let be a planar regular region whose Schottky double has genus and set . For fixed we determine the range of the function where is the Riemann theta function on . Also we introduce two weighted Hardy spaces to study the problem when the matrix is positive definite. The proof relies on new theta identities using Fay's trisecants formula.
3.
David Manderscheid 《Proceedings of the American Mathematical Society》1999,127(5):1281-1288
The local theta correspondence is considered for reductive dual pairs where is a -adic field of characteristic zero and is the orthogonal group attached to a quaternary quadratic form with coefficients in and of Witt rank one over . It is shown that certain representations of occur in the correspondence.
4.
Jacek Dziubanski 《Proceedings of the American Mathematical Society》1999,127(12):3605-3613
Let be the semigroup of linear operators generated by a Schrödinger operator , where is a nonnegative polynomial. We say that is an element of if the maximal function belongs to . A criterion on functions which implies boundedness of the operators on is given.
5.
Anwar Ayyad 《Proceedings of the American Mathematical Society》1999,127(4):943-950
For a cube of size , we obtain a lower bound on so that is nonempty, where is the algebraic subset of defined by
a positive integer and an integer not divisible by . For we obtain that is nonempty if , for we obtain that is nonempty if , and for we obtain that is nonempty if . Using the assumption of the Grand Riemann Hypothesis we obtain is nonempty if .
6.
Let be a discrete abelian group and an ordered group. Denote by the minimal quasily ordered group containing . In this paper, we show that the ideal of finite elements is exactly the kernel of the natural morphism between these two Toeplitz -algebras. When is countable, we show that if the direct sum of -groups , then .
7.
Wojciech Bartoszek 《Proceedings of the American Mathematical Society》1999,127(4):1051-1055
Let be a closed convex subset of a Banach (dual Banach) space . By we denote an antirepresentation of a semitopological semigroup as nonexpansive mappings on . Suppose that the mapping is jointly continuous when has the weak (weak*) topology and the Banach space of bounded right uniformly continuous functions on has a right invariant mean. If is weakly compact (for some the set is weakly* compact) and norm separable, then has a common fixed point in .
8.
J. M. Isidro 《Proceedings of the American Mathematical Society》1999,127(2):437-446
Consider a compact Hausdorff topological space , a -triple and , the -triple of all continuous -valued functions with the pointwise operations and the norm of the supremum. Let be the group of all holomorphic automorphisms of the unit ball of that map every equicontinuous subset lying strictly inside into another such a set. The real Banach-Lie group and its Lie algebra are investigated. The identity connected component of is identified when has the strong Banach-Stone property. This extends to the infinite dimensional setting a well known result concerning the case .
9.
E. Ballico 《Proceedings of the American Mathematical Society》1999,127(9):2527-2528
Fix integers with and ; if assume . Let be general points of the complex projective space and let be the blow up of at with exceptional divisors , . Set . Here we prove that the divisor is ample if and only if , i.e. if and only if .
10.
Yakov Berkovich 《Proceedings of the American Mathematical Society》1999,127(9):2505-2509
For a prime divisor of the order of a finite group , we present the set of -subgroups generating . In particular, we present the set of primary subgroups of generating the last member of the lower central series of . The proof is based on the Frobenius Normal -Complement Theorem and basic properties of minimal nonnilpotent groups. Let be a group and a group-theoretic property inherited by subgroups and epimorphic images such that all minimal non--subgroups (-subgroups) of are not nilpotent. Then (see the lemma), if is generated by all -subgroups of it follows that is a -group.
11.
Let be the 7-dimensional irreducible representations of . We decompose the tensor power into irreducible representations of and obtain all irreducible representations of in the decomposition. This generalizes Weyl's work on the construction of irreducible representations and decomposition of tensor products for classical groups to the exceptional group .
12.
Elijah Liflyand Ferenc Mó ricz 《Proceedings of the American Mathematical Society》2000,128(5):1391-1396
We prove that the Hausdorff operator generated by a function is bounded on the real Hardy space . The proof is based on the closed graph theorem and on the fact that if a function in is such that its Fourier transform equals for (or for ), then .
13.
Let , be -algebras and a full Hilbert --bimodule such that every closed right submodule is orthogonally closed, i.e., . Then there are families of Hilbert spaces , such that and are isomorphic to -direct sums , resp. , and is isomorphic to the outer direct sum .
14.
Yuan-chung Sheu 《Proceedings of the American Mathematical Society》1999,127(12):3721-3728
Consider an -superdiffusion on , where is an uniformly elliptic differential operator in , and . The -polar sets for are subsets of which have no intersection with the graph of , and they are related to the removable singularities for a corresponding nonlinear parabolic partial differential equation. Dynkin characterized the -polarity of a general analytic set in term of the Bessel capacity of , and Sheu in term of the restricted Hausdorff dimension. In this paper we study in particular the -polarity of sets of the form , where and are two Borel subsets of and respectively. We establish a relationship between the restricted Hausdorff dimension of and the usual Hausdorff dimensions of and . As an application, we obtain a criterion for -polarity of in terms of the Hausdorff dimensions of and , which also gives an answer to a problem proposed by Dynkin in the 1991 Wald Memorial Lectures.
15.
Mong-Lung Lang Ser-Peow Tan 《Proceedings of the American Mathematical Society》1999,127(11):3131-3140
Let cos and let be the Hecke group associated to . In this article, we show that for a prime ideal in , the congruence subgroups of are self-normalized in .
16.
Ross G. Pinsky 《Proceedings of the American Mathematical Society》1999,127(11):3319-3327
We consider the inhomogeneous equation
where , and , and give criteria on , and which determine whether for all and all the solution blows up in finite time or whether for and sufficiently small, the solution exists for all time.
17.
M. N'Kanza 《Proceedings of the American Mathematical Society》1999,127(9):2587-2590
Here we give new examples of fields in characteristic whose -invariant and -invariant are different: or . These fields are also -fields.
RSUM. Nous donnons ici de nouveaux exemples de corps en caractéristique dont le -invariant et le -invariant diffèrent. Plus précisément: et ou . Ces corps sont aussi des -corps.
18.
Hisao Taya 《Proceedings of the American Mathematical Society》2000,128(5):1285-1292
Let be a square-free integer with and . Put and . For the cyclotomic -extension of , we denote by the -th layer of over . We prove that the -Sylow subgroup of the ideal class group of is trivial for all integers if and only if the class number of is not divisible by the prime . This enables us to show that there exist infinitely many real quadratic fields in which splits and whose Iwasawa -invariant vanishes.
19.
Tejinder Neelon 《Proceedings of the American Mathematical Society》1999,127(7):2099-2104
It is well known that a function whose restriction to every line in is real analytic must itself be real analytic. In this note we study whether this property of real analytic functions is also possessed by some other subclasses of functions. We prove that if is ultradifferentiable corresponding to a sequence on every line in some `uniform way', then is ultradifferentiable corresponding to the sequence
20.
A. Mazouz 《Proceedings of the American Mathematical Society》1999,127(7):2105-2107
Let denote the algebra of (bounded linear) operators on the separable complex Hilbert space , and let denote a norm ideal in . For , let the derivation be defined by , and let be defined by . The main result of this paper is to show that if , are contractions, then for every operator such that , then for all .