Embedding manifolds with boundary in smooth toposes
Embedding of dendriform algebras into Rota-Baxter algebras
Following a recent work [Bai C., Bellier O., Guo L., Ni X., Splitting of operations, Manin products, and Rota-Baxter operators, Int. Math. Res. Not. IMRN (in press), DOI: 10.1093/imrn/rnr266] we define what is a dendriform dior trialgebra corresponding to an arbitrary variety Var of binary algebras (associative, commutative, Poisson, etc.). We call such algebras di- or tri-Var-dendriform algebras, respectively. We prove in general that the operad governing the variety of di- or tri-Var-dendriform...
Embedding of presheaves into dual unit balls
Embedding of semilattices into distributive lattices
Embeddings into categories with fixed points in representations
Endofunctors of set and cardinalities
Endomorphism rings of maximal rigid objects in cluster tubes
We describe the endomorphism rings of maximal rigid objects in the cluster categories of tubes. Moreover, we show that they are gentle and have Gorenstein dimension 1. We analyse their representation theory and prove that they are of finite type. Finally, we study the relationship between the module category and the cluster tube via the Hom-functor.
Endomorphisms of complete Heyting algebras.
Enlargements of categories.
Enriched categories and enriched modules
Enriched functors and stable homotopy theory.
Enriched Lawvere theories.
Enriched model categories and an application to additive endomorphism spectra.
Enrichment over iterated monoidal categories.
Entity-relationship-attribute designs and sketches.
Entropic Hopf algebras and models of non-commutative logic.
Envelopes and refinements in categories, with applications to functional analysis [Book]
Enveloppe karoubienne de catégories de Kleisli
Epics in the category of k-groups need not have dense range
Epimorphic covers make a site, for profinite .