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376. CMB 2008 (vol 51 pp. 334)

Ascah-Coallier, I.; Gauthier, P. M.
 Value Distribution of the Riemann Zeta Function In this note, we give a new short proof of the fact, recently discovered by Ye, that all (finite) values are equidistributed by the Riemann zeta function. Keywords:Nevanlinna theory, deficiency, Riemann zeta functionCategory:30D35

377. CMB 2008 (vol 51 pp. 195)

Chen, Huaihui; Gauthier, Paul
 Boundedness from Below of Composition Operators on $\alpha$-Bloch Spaces We give a necessary and sufficient condition for a composition operator on an $\alpha$-Bloch space with $\alpha\ge 1$ to be bounded below. This extends a known result for the Bloch space due to P. Ghatage, J. Yan, D. Zheng, and H. Chen. Keywords:Bloch functions, composition operatorsCategories:32A18, 30H05

378. CMB 2008 (vol 51 pp. 310)

Witbooi, P. J.
 Relative Homotopy in Relational Structures The homotopy groups of a finite partially ordered set (poset) can be described entirely in the context of posets, as shown in a paper by B. Larose and C. Tardif. In this paper we describe the relative version of such a homotopy theory, for pairs $(X,A)$ where $X$ is a poset and $A$ is a subposet of $X$. We also prove some theorems on the relevant version of the notion of weak homotopy equivalences for maps of pairs of such objects. We work in the category of reflexive binary relational structures which contains the posets as in the work of Larose and Tardif. Keywords:binary reflexive relational structure, relative homotopy group, exact sequence, locally finite space, weak homotopy equivalenceCategories:55Q05, 54A05;, 18B30

379. CMB 2008 (vol 51 pp. 298)

Tocón, Maribel
 The Kostrikin Radical and the Invariance of the Core of Reduced Extended Affine Lie Algebras In this paper we prove that the Kostrikin radical of an extended affine Lie algebra of reduced type coincides with the center of its core, and use this characterization to get a type-free description of the core of such algebras. As a consequence we get that the core of an extended affine Lie algebra of reduced type is invariant under the automorphisms of the algebra. Keywords:extended affine Lie algebra, Lie torus, core, Kostrikin radicalCategories:17B05, 17B65

380. CMB 2008 (vol 51 pp. 283)

Ravindra, G. V.
 The Noether--Lefschetz Theorem Via Vanishing of Coherent Cohomology We prove that for a generic hypersurface in $\mathbb P^{2n+1}$ of degree at least $2+2/n$, the $n$-th Picard number is one. The proof is algebraic in nature and follows from certain coherent cohomology vanishing. Keywords:Noether--Lefschetz, algebraic cycles, Picard numberCategories:14C15, 14C25

381. CMB 2008 (vol 51 pp. 261)

Neeb, Karl-Hermann
 On the Classification of Rational Quantum Tori and the Structure of Their Automorphism Groups An $n$-dimensional quantum torus is a twisted group algebra of the group $\Z^n$. It is called rational if all invertible commutators are roots of unity. In the present note we describe a normal form for rational $n$-dimensional quantum tori over any field. Moreover, we show that for $n = 2$ the natural exact sequence describing the automorphism group of the quantum torus splits over any field. Keywords:quantum torus, normal form, automorphisms of quantum toriCategory:16S35

382. CMB 2008 (vol 51 pp. 236)

 Konovalov, Victor N.; Kopotun, Kirill A.

383. CMB 2008 (vol 51 pp. 217)

Filippakis, Michael E.; Papageorgiou, Nikolaos S.
 A Multivalued Nonlinear System with the Vector $p$-Laplacian on the Semi-Infinity Interval We study a second order nonlinear system driven by the vector $p$-Laplacian, with a multivalued nonlinearity and defined on the positive time semi-axis $\mathbb{R}_+.$ Using degree theoretic techniques we solve an auxiliary mixed boundary value problem defined on the finite interval $[0,n]$ and then via a diagonalization method we produce a solution for the original infinite time-horizon system. Keywords:semi-infinity interval, vector $p$-Laplacian, multivalued nonlinear, fixed point index, Hartman condition, completely continuous mapCategory:34A60

384. CMB 2008 (vol 51 pp. 205)

Duda, Jakub
 On GÃ¢teaux Differentiability of Pointwise Lipschitz Mappings We prove that for every function $f\from X\to Y$, where $X$ is a separable Banach space and $Y$ is a Banach space with RNP, there exists a set $A\in\tilde\mcA$ such that $f$ is G\^ateaux differentiable at all $x\in S(f)\setminus A$, where $S(f)$ is the set of points where $f$ is pointwise-Lipschitz. This improves a result of Bongiorno. As a corollary, we obtain that every $K$-monotone function on a separable Banach space is Hadamard differentiable outside of a set belonging to $\tilde\mcC$; this improves a result due to Borwein and Wang. Another corollary is that if $X$ is Asplund, $f\from X\to\R$ cone monotone, $g\from X\to\R$ continuous convex, then there exists a point in $X$, where $f$ is Hadamard differentiable and $g$ is Fr\'echet differentiable. Keywords:GÃ¢teaux differentiable function, Radon-NikodÃ½m property, differentiability of Lipschitz functions, pointwise-Lipschitz functions, cone mononotone functionsCategories:46G05, 46T20

385. CMB 2008 (vol 51 pp. 172)

Alkan, Emre; Zaharescu, Alexandru
 Consecutive Large Gaps in Sequences Defined by Multiplicative Constraints In this paper we obtain quantitative results on the occurrence of consecutive large gaps between $B$-free numbers, and consecutive large gaps between nonzero Fourier coefficients of a class of newforms without complex multiplication. Keywords:$B$-free numbers, consecutive gapsCategories:11N25, 11B05

386. CMB 2008 (vol 51 pp. 100)

Petkov, Vesselin
 Dynamical Zeta Function for Several Strictly Convex Obstacles The behavior of the dynamical zeta function $Z_D(s)$ related to several strictly convex disjoint obstacles is similar to that of the inverse $Q(s) = \frac{1}{\zeta(s)}$ of the Riemann zeta function $\zeta(s)$. Let $\Pi(s)$ be the series obtained from $Z_D(s)$ summing only over primitive periodic rays. In this paper we examine the analytic singularities of $Z_D(s)$ and $\Pi(s)$ close to the line $\Re s = s_2$, where $s_2$ is the abscissa of absolute convergence of the series obtained by the second iterations of the primitive periodic rays. We show that at least one of the functions $Z_D(s), \Pi(s)$ has a singularity at $s = s_2$. Keywords:dynamical zeta function, periodic raysCategories:11M36, 58J50

387. CMB 2008 (vol 51 pp. 146)

Zhou, Xiaowen
 Stepping-Stone Model with Circular Brownian Migration In this paper we consider the stepping-stone model on a circle with circular Brownian migration. We first point out a connection between Arratia flow on the circle and the marginal distribution of this model. We then give a new representation for the stepping-stone model using Arratia flow and circular coalescing Brownian motion. Such a representation enables us to carry out some explicit computations. In particular, we find the distribution for the first time when there is only one type left across the circle. Keywords:stepping-stone model, circular coalescing Brownian motion, Arratia flow, duality, entrance lawCategories:60G57, 60J65

388. CMB 2008 (vol 51 pp. 3)

 Alaca, Ay\c{s}e; Alaca, \c{S}aban; Williams, Kenneth S.

389. CMB 2008 (vol 51 pp. 86)

Nakazato, Hiroshi; Bebiano, Natália; Providência, Jo\ ao da
 The Numerical Range of 2-Dimensional Krein Space Operators The tracial numerical range of operators on a $2$-dimensional Krein space is investigated. Results in the vein of those obtained in the context of Hilbert spaces are obtained. Keywords:numerical range, generalized numerical range, indefinite inner product spaceCategories:15A60, 15A63, 15A45

390. CMB 2007 (vol 50 pp. 579)

Kot, Piotr
 $p$-Radial Exceptional Sets and Conformal Mappings For $p>0$ and for a given set $E$ of type $G_{\delta}$ in the boundary of the unit disc $\partial\mathbb D$ we construct a holomorphic function $f\in\mathbb O(\mathbb D)$ such that $\int_{\mathbb D\setminus[0,1]E}|ft|^{p}\,d\mathfrak{L}^{2}<\infty$ and$E=E^{p}(f)=\Bigl\{ z\in\partial\mathbb D:\int_{0}^{1}|f(tz)|^{p}\,dt=\infty\Bigr\} .$ In particular if a set $E$ has a measure equal to zero, then a function $f$ is constructed as integrable with power $p$ on the unit disc $\mathbb D$. Keywords:boundary behaviour of holomorphic functions, exceptional setsCategories:30B30, 30E25

391. CMB 2007 (vol 50 pp. 632)

Zelenyuk, Yevhen; Zelenyuk, Yuliya
 Transformations and Colorings of Groups Let $G$ be a compact topological group and let $f\colon G\to G$ be a continuous transformation of $G$. Define $f^*\colon G\to G$ by $f^*(x)=f(x^{-1})x$ and let $\mu=\mu_G$ be Haar measure on $G$. Assume that $H=\Imag f^*$ is a subgroup of $G$ and for every measurable $C\subseteq H$, $\mu_G((f^*)^{-1}(C))=\mu_H(C)$. Then for every measurable $C\subseteq G$, there exist $S\subseteq C$ and $g\in G$ such that $f(Sg^{-1})\subseteq Cg^{-1}$ and $\mu(S)\ge(\mu(C))^2$. Keywords:compact topological group, continuous transformation, endomorphism, Ramsey theoryinversion, Categories:05D10, 20D60, 22A10

392. CMB 2007 (vol 50 pp. 598)

Lorestani, Keivan Borna; Sahandi, Parviz; Yassemi, Siamak
 Artinian Local Cohomology Modules Let $R$ be a commutative Noetherian ring, $\fa$ an ideal of $R$ and $M$ a finitely generated $R$-module. Let $t$ be a non-negative integer. It is known that if the local cohomology module $\H^i_\fa(M)$ is finitely generated for all $i Keywords:local cohomology module, Artinian module, reflexive moduleCategories:13D45, 13E10, 13C05 393. CMB 2007 (vol 50 pp. 588) Labute, John; Lemire, Nicole; Mináč, Ján; Swallow, John  Cohomological Dimension and Schreier's Formula in Galois Cohomology Let$p$be a prime and$F$a field containing a primitive$p$-th root of unity. Then for$n\in \N$, the cohomological dimension of the maximal pro-$p$-quotient$G$of the absolute Galois group of$F$is at most$n$if and only if the corestriction maps$H^n(H,\Fp) \to H^n(G,\Fp)$are surjective for all open subgroups$H$of index$p$. Using this result, we generalize Schreier's formula for$\dim_{\Fp} H^1(H,\Fp)$to$\dim_{\Fp} H^n(H,\Fp)$. Keywords:cohomological dimension, Schreier's formula, Galois theory,$p$-extensions, pro-$p$-groupsCategories:12G05, 12G10 394. CMB 2007 (vol 50 pp. 567) Joshi, Kirti  Exotic Torsion, Frobenius Splitting and the Slope Spectral Sequence In this paper we show that any Frobenius split, smooth, projective threefold over a perfect field of characteristic$p>0$is Hodge--Witt. This is proved by generalizing to the case of threefolds a well-known criterion due to N.~Nygaard for surfaces to be Hodge-Witt. We also show that the second crystalline cohomology of any smooth, projective Frobenius split variety does not have any exotic torsion. In the last two sections we include some applications. Keywords:threefolds, Frobenius splitting, Hodge--Witt, crystalline cohomology, slope spectral sequence, exotic torsionCategories:14F30, 14J30 395. CMB 2007 (vol 50 pp. 474) Zhou, Jiazu  On Willmore's Inequality for Submanifolds Let$M$be an$m$dimensional submanifold in the Euclidean space${\mathbf R}^n$and$H$be the mean curvature of$M$. We obtain some low geometric estimates of the total square mean curvature$\int_M H^2 d\sigma$. The low bounds are geometric invariants involving the volume of$M$, the total scalar curvature of$M$, the Euler characteristic and the circumscribed ball of$M$. Keywords:submanifold, mean curvature, kinematic formul, scalar curvatureCategories:52A22, 53C65, 51C16 396. CMB 2007 (vol 50 pp. 447) Śniatycki, Jędrzej  Generalizations of Frobenius' Theorem on Manifolds and Subcartesian Spaces Let$\mathcal{F}$be a family of vector fields on a manifold or a subcartesian space spanning a distribution$D$. We prove that an orbit$O$of$\mathcal{F}$is an integral manifold of$D$if$D$is involutive on$O$and it has constant rank on$O$. This result implies Frobenius' theorem, and its various generalizations, on manifolds as well as on subcartesian spaces. Keywords:differential spaces, generalized distributions, orbits, Frobenius' theorem, Sussmann's theoremCategories:58A30, 58A40 397. CMB 2007 (vol 50 pp. 434) Õzarslan, M. Ali; Duman, Oktay  MKZ Type Operators Providing a Better Estimation on$[1/2,1)$In the present paper, we introduce a modification of the Meyer-K\"{o}nig and Zeller (MKZ) operators which preserve the test functions$f_{0}(x)=1$and$f_{2}(x)=x^{2}$, and we show that this modification provides a better estimation than the classical MKZ operators on the interval$[\frac{1}{2},1)$with respect to the modulus of continuity and the Lipschitz class functionals. Furthermore, we present the$r-$th order generalization of our operators and study their approximation properties. Keywords:Meyer-KÃ¶nig and Zeller operators, Korovkin type approximation theorem, modulus of continuity, Lipschitz class functionalsCategories:41A25, 41A36 398. CMB 2007 (vol 50 pp. 206) Golasiński, Marek; Gonçalves, Daciberg Lima  Spherical Space Forms: Homotopy Types and Self-Equivalences for the Group$({\mathbb Z}/a\rtimes{\mathbb Z}/b) \times SL_2\,(\mathbb{F}_p)$Let$G=({\mathbb Z}/a\rtimes{\mathbb Z}/b) \times \SL_2(\mathbb{F}_p)$, and let$X(n)$be an$n$-dimensional$CW$-complex of the homotopy type of an$n$-sphere. We study the automorphism group$\Aut (G)$in order to compute the number of distinct homotopy types of spherical space forms with respect to free and cellular$G$-actions on all$CW$-complexes$X(2dn-1)$, where$2d$is the period of$G$. The groups${\mathcal E}(X(2dn-1)/\mu)$of self homotopy equivalences of space forms$X(2dn-1)/\mu$associated with free and cellular$G$-actions$\mu$on$X(2dn-1)$are determined as well. Keywords:automorphism group,$CW$-complex, free and cellular$G$-action, group of self homotopy equivalences, Lyndon--Hochschild--Serre spectral sequence, special (linear) group, spherical space formCategories:55M35, 55P15, 20E22, 20F28, 57S17 399. CMB 2007 (vol 50 pp. 284) McIntosh, Richard J.  Second Order Mock Theta Functions In his last letter to Hardy, Ramanujan defined 17 functions$F(q)$, where$|q|<1$. He called them mock theta functions, because as$q$radially approaches any point$e^{2\pi ir}$($r$rational), there is a theta function$F_r(q)$with$F(q)-F_r(q)=O(1)$. In this paper we establish the relationship between two families of mock theta functions. Keywords:$q$-series, mock theta function, Mordell integralCategories:11B65, 33D15 400. CMB 2007 (vol 50 pp. 234) Kuo, Wentang  A Remark on a Modular Analogue of the Sato--Tate Conjecture The original Sato--Tate Conjecture concerns the angle distribution of the eigenvalues arising from non-CM elliptic curves. In this paper, we formulate a modular analogue of the Sato--Tate Conjecture and prove that the angles arising from non-CM holomorphic Hecke eigenforms with non-trivial central characters are not distributed with respect to the Sate--Tate measure for non-CM elliptic curves. Furthermore, under a reasonable conjecture, we prove that the expected distribution is uniform. Keywords:$L\$-functions, Elliptic curves, Sato--TateCategories:11F03, 11F25
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