On a class of jointly hyponormal Toeplitz operators

We characterize when a pair of Toeplitz operators is jointly hyponormal under various assumptions--for example, is analytic or is a trigonometric polynomial or is analytic. A typical characterization states that is jointly hyponormal if and only if an algebraic relation of and holds and the single Toeplitz operator is hyponormal, where is a combination of and . More general results for an -tuple of Toeplitz operators are also obtained.

     

On the Glauberman and Watanabe correspondences for blocks of finite -solvable groups

If is a finite -solvable group for some prime , a solvable subgroup of the automorphism group of of order prime to such that stabilises a -block of and acts trivially on a defect group of , then there is a Morita equivalence between the block and its Watanabe correspondent of , given by a bimodule with vertex and an endo-permutation module as source, which on the character level induces the Glauberman correspondence (and which is an isotypy by Watanabe's results).

     

Invariant ideals and polynomial forms

Let denote the group algebra of an infinite locally finite group . In recent years, the lattice of ideals of has been extensively studied under the assumption that is simple. From these many results, it appears that such group algebras tend to have very few ideals. While some work still remains to be done in the simple group case, we nevertheless move on to the next stage of this program by considering certain abelian-by-(quasi-simple) groups. Standard arguments reduce this problem to that of characterizing the ideals of an abelian group algebra stable under the action of an appropriate automorphism group of . Specifically, in this paper, we let be a quasi-simple group of Lie type defined over an infinite locally finite field , and we let be a finite-dimensional vector space over a field of the same characteristic . If acts nontrivially on by way of the homomorphism , and if has no proper -stable subgroups, then we show that the augmentation ideal is the unique proper -stable ideal of when . The proof of this result requires, among other things, that we study characteristic division rings , certain multiplicative subgroups of , and the action of on the group algebra , where is the additive group . In particular, properties of the quasi-simple group come into play only in the final section of this paper.

     

Sets of uniqueness for spherically convergent multiple trigonometric series

A subset of the -dimensional torus is called a set of uniqueness, or -set, if every multiple trigonometric series spherically converging to outside vanishes identically. We show that all countable sets are -sets and also that sets are -sets for every . In particular, , where is the Cantor set, is an set and hence a -set. We will say that is a -set if every multiple trigonometric series spherically Abel summable to outside and having certain growth restrictions on its coefficients vanishes identically. The above-mentioned results hold also for sets. In addition, every -set has measure , and a countable union of closed -sets is a -set.

     

Lower central series and free resolutions of hyperplane arrangements

If is the complement of a hyperplane arrangement, and is the cohomology ring of over a field of characteristic , then the ranks, , of the lower central series quotients of can be computed from the Betti numbers, , of the linear strand in a minimal free resolution of over . We use the Cartan-Eilenberg change of rings spectral sequence to relate these numbers to the graded Betti numbers, , of a minimal resolution of over the exterior algebra .

From this analysis, we recover a formula of Falk for , and obtain a new formula for . The exact sequence of low-degree terms in the spectral sequence allows us to answer a question of Falk on graphic arrangements, and also shows that for these arrangements, the algebra is Koszul if and only if the arrangement is supersolvable.

We also give combinatorial lower bounds on the Betti numbers, , of the linear strand of the free resolution of over ; if the lower bound is attained for , then it is attained for all . For such arrangements, we compute the entire linear strand of the resolution, and we prove that all components of the first resonance variety of are local. For graphic arrangements (which do not attain the lower bound, unless they have no braid subarrangements), we show that is determined by the number of triangles and subgraphs in the graph.

     

Small rational model of subspace complement

This paper concerns the rational cohomology ring of the complement of a complex subspace arrangement. We start with the De Concini-Procesi differential graded algebra that is a rational model for . Inside it we find a much smaller subalgebra quasi-isomorphic to the whole algebra. is described by defining a natural multiplication on a chain complex whose homology is the local homology of the intersection lattice whence connecting the De Concini-Procesi model with the Goresky-MacPherson formula for the additive structure of . The algebra has a natural integral version that is a good candidate for an integral model of . If the rational local homology of can be computed explicitly we obtain an explicit presentation of the ring . For example, this is done for the cases where is a geometric lattice and where is a -equal manifold.

     

Trees and branches in Banach spaces

An infinite dimensional notion of asymptotic structure is considered. This notion is developed in terms of trees and branches on Banach spaces. Every countably infinite countably branching tree of a certain type on a space is presumed to have a branch with some property. It is shown that then can be embedded into a space with an FDD so that all normalized sequences in which are almost a skipped blocking of have that property. As an application of our work we prove that if is a separable reflexive Banach space and for some and every weakly null tree on the sphere of has a branch -equivalent to the unit vector basis of , then for all 0$">, there exists a subspace of having finite codimension which embeds into the sum of finite dimensional spaces.

     

Transfer functions of regular linear systems Part II: The system operator and the Lax-Phillips semigroup

This paper is a sequel to a paper by the second author on regular linear systems (1994), referred to here as ``Part I'. We introduce the system operator of a well-posed linear system, which for a finite-dimensional system described by , would be the -dependent matrix . In the general case, is an unbounded operator, and we show that it can be split into four blocks, as in the finite-dimensional case, but the splitting is not unique (the upper row consists of the uniquely determined blocks and , as in the finite-dimensional case, but the lower row is more problematic). For weakly regular systems (which are introduced and studied here), there exists a special splitting of where the right lower block is the feedthrough operator of the system. Using , we give representation theorems which generalize those from Part I to well-posed linear systems and also to the situation when the ``initial time' is . We also introduce the Lax-Phillips semigroup induced by a well-posed linear system, which is in fact an alternative representation of a system, used in scattering theory. Our concept of a Lax-Phillips semigroup differs in several respects from the classical one, for example, by allowing an index which determines an exponential weight in the input and output spaces. This index allows us to characterize the spectrum of and also the points where is not invertible, in terms of the spectrum of the generator of (for various values of ). The system is dissipative if and only if (with index zero) is a contraction semigroup.

     

Cotensor products of modules

Let be a coalgebra over a field and its dual algebra. The category of -comodules is equivalent to a category of -modules. We use this to interpret the cotensor product of two comodules in terms of the appropriate Hochschild cohomology of the -bimodule , when is finite-dimensional, profinite, graded or differential-graded. The main applications are to Galois cohomology, comodules over the Steenrod algebra, and the homology of induced fibrations.

     

Algebraic structure in the loop space homology Bockstein spectral sequence

Let be a finite, -dimensional, -connected CW complex. We prove the following theorem:

If is an odd prime, then the loop space homology Bockstein spectral sequence modulo is a spectral sequence of universal enveloping algebras over differential graded Lie algebras.

     

Attractors for graph critical rational maps

We call a rational map graph critical if any critical point either belongs to an invariant finite graph , or has minimal limit set, or is non-recurrent and has limit set disjoint from . We prove that, for any conformal measure, either for almost every point of the Julia set its limit set coincides with , or for almost every point of its limit set coincides with the limit set of a critical point of .

     

On the blow-up of heat flow for conformal -harmonic maps

Using a comparison theorem, Chang, Ding, and Ye (1992) proved a finite time derivative blow-up for the heat flow of harmonic maps from (a unit ball in ) to (a unit sphere in ) under certain initial and boundary conditions. We generalize this result to the case of -harmonic map heat flow from to . In contrast to the previous case, our governing parabolic equation is quasilinear and degenerate. Technical issues such as the development of a new comparison theorem have to be resolved.

     

Spin structures and codimension two embeddings of -manifolds up to regular homotopy

We clarify the structure of the set of regular homotopy classes containing embeddings of a 3-manifold into -space inside the set of all regular homotopy classes of immersions with trivial normal bundles. As a consequence, we show that for a large class of -manifolds , the following phenomenon occurs: there exists a codimension two immersion of the -sphere whose double points cannot be eliminated by regular homotopy, but can be eliminated after taking the connected sum with a codimension two embedding of . This involves introducing and studying an equivalence relation on the set of spin structures on . Their associated -invariants also play an important role.

     

Solvable groups with polynomial Dehn functions

Given a finitely presented group , finitely generated subgroup of , and a monomorphism , we obtain an upper bound of the Dehn function of the corresponding HNN-extension in terms of the Dehn function of and the distortion of in . Using such a bound, we construct first examples of non-polycyclic solvable groups with polynomial Dehn functions. The constructed groups are metabelian and contain the solvable Baumslag-Solitar groups. In particular, this answers a question posed by Birget, Ol'shanskii, Rips, and Sapir.

     

Representations of exceptional simple alternative superalgebras of characteristic 3

We study representations of simple alternative superalgebras and . The irreducible bimodules and bimodules with superinvolution over these superalgebras are classified, and some analogues of the Kronecker factorization theorem are proved for alternative superalgebras that contain and .

     

Sums of squares in real analytic rings

Let be an analytic ring. We show: (1) has finite Pythagoras number if and only if its real dimension is , and (2) if every positive semidefinite element of is a sum of squares, then is real and has real dimension .

     

Degenerate fibres in the Stone-Cech compactification of the universal bundle of a finite group

Applied to a continuous surjection of completely regular Hausdorff spaces and , the Stone-Cech compactification functor yields a surjection . For an -fold covering map , we show that the fibres of , while never containing more than points, may degenerate to sets of cardinality properly dividing . In the special case of the universal bundle of a -group , we show more precisely that every possible type of -orbit occurs among the fibres of . To prove this, we use a weak form of the so-called generalized Sullivan conjecture.

     

Uniform and Lipschitz homotopy classes of maps

If is a compact connected polyhedron, we associate with each uniform homotopy class of uniformly continuous mappings from the real line into an element of where is the space of uniformly continuous functions from to and is the subspace of bounded uniformly continuous functions. This map from uniform homotopy classes of functions to is surjective. If is the -dimensional torus, it is bijective, while if is a compact orientable surface of genus 1$">, it is not injective.

In higher dimensions we have to consider smooth Lipschitz homotopy classes of smooth Lipschitz maps from suitable Riemannian manifolds to compact smooth manifolds With each such Lipschitz homotopy class we associate an element of where is the dimension of is the space of bounded continuous functions from the positive real axis to and is the set of all such that

     

On certain co-H spaces related to Moore spaces

We show that certain co- spaces, constructed by Anick and Gray, carry a homotopy co-associative and co-commutative co- structure.