The purpose of this note is to record natural ltered simplicial group models for iterated loop spaces. The models are derived by classical methods for simplicial groups along with the identication for certain group theoretic kernels. The main content of the article is the study of some useful properties of these models
In this thesis I shall be exploring the normal and characteristic structure of quasigroups and loops...
Abstract. We show how a certain type of CW simplicial resolutions of spaces by wedges of spheres may...
Given a bisimplicial set, there are two ways to extract from it a simplicial set: the diagonal simpl...
AbstractGeneralising Segal's approach to 1-fold loop spaces, the homotopy theory of n-fold loop spac...
This paper is devoted to the Cradle Theorem. It is a recursive description of a discrete vector fiel...
It is well known since Stasheff's work that 1-fold loop spaces can be described in terms of the exis...
AbstractWe develop a notion of an n-fold monoidal category and show that it corresponds in a precise...
AbstractAn algebraic loop is a ‘group without associativity’. It holds that a surjective homomorphis...
The book contains the first systematic exposition of the current known theory of K-loops, as well as...
In topology loop spaces can be understood combinatorially using algebraic theories. This approach ca...
AbstractAn obstruction theory is given which facilities the computation of Dyer-Lashof operations in...
We give an introduction to the problem of computable algebras. Specifically, the algebras of loops a...
We prove a generalization of the Siegel-Weil theorem for loop groups. © 2011 by The Johns Hopkins Un...
AbstractWe show how a certain type of CW simplicial resolutions of spaces by wedges of spheres may b...
summary:We study properties of Steiner loops which are of fundamental importance to develop a combin...
In this thesis I shall be exploring the normal and characteristic structure of quasigroups and loops...
Abstract. We show how a certain type of CW simplicial resolutions of spaces by wedges of spheres may...
Given a bisimplicial set, there are two ways to extract from it a simplicial set: the diagonal simpl...
AbstractGeneralising Segal's approach to 1-fold loop spaces, the homotopy theory of n-fold loop spac...
This paper is devoted to the Cradle Theorem. It is a recursive description of a discrete vector fiel...
It is well known since Stasheff's work that 1-fold loop spaces can be described in terms of the exis...
AbstractWe develop a notion of an n-fold monoidal category and show that it corresponds in a precise...
AbstractAn algebraic loop is a ‘group without associativity’. It holds that a surjective homomorphis...
The book contains the first systematic exposition of the current known theory of K-loops, as well as...
In topology loop spaces can be understood combinatorially using algebraic theories. This approach ca...
AbstractAn obstruction theory is given which facilities the computation of Dyer-Lashof operations in...
We give an introduction to the problem of computable algebras. Specifically, the algebras of loops a...
We prove a generalization of the Siegel-Weil theorem for loop groups. © 2011 by The Johns Hopkins Un...
AbstractWe show how a certain type of CW simplicial resolutions of spaces by wedges of spheres may b...
summary:We study properties of Steiner loops which are of fundamental importance to develop a combin...
In this thesis I shall be exploring the normal and characteristic structure of quasigroups and loops...
Abstract. We show how a certain type of CW simplicial resolutions of spaces by wedges of spheres may...
Given a bisimplicial set, there are two ways to extract from it a simplicial set: the diagonal simpl...