… Ic- is essentially deletable in the position at issue; twenty word types of such derivatives are
identified in BNC. However, we detect thirteen word types of derivatives whose internal -ic is …

… We note that the condition for the derivatives in (1.5) do not obey the Kirchhoff’s Law at the
junctions unless all \(d_n\) take 1. This condition, however, is meaningful as a model which is …

… stable derivator 3to the stable derivator of A-shaped representations in 3. By specializing to
specific 3, this yields the homotopy theory … Tilting theory is a derived version of Morita theory, …

… Discussions are presented by Morita and Sato on the problem of obtaining the particular …
Here R D t ρ l are the Riemann–Liouville fractional integrals and derivatives defined by the …

… The theory of derivators was developed … derivator represents an abstract bicomplete
homotopy theory; we attach the adjective triangulated to a derivator when it represents a stable …

… Coherent logic was pioneered by [12], though it (and derivatives of coherent logic) pervade
… demonstrated to identify Morita equivalence for certain classes of predicate theories. Our …

… K-theory from the derivator. Maltsiniotis [24] conjectured that derivator K-theory of stable
derivators satisfies additivity and localization and that it agrees with Quillen K-theory for exact …

… We prove that, given any strong and stable derivator and a t-structure in its base triangulated
category D , the t-structure canonically lifts to all the (coherent) diagram categories and …

… by Rickard in connection with stable equivalences of blocks … arcs yields a Morita equivalence
between the corresponding … of flips implies that the Morita equivalence class of a Brauer …

… show that any stable vector bundle V … a stability condition in the sense of Geometric Invariant
Theory. This was essentially the point of view taken in [18]. The precise relation with stability …