Derived Equivalences and Dade's Invariant Conjecture

The concept of subcontraction-equivalence is defined, and 14 graphtheoretic properties are exhibited that are all subcontraction-equivalent if Hadwiger's conjecture is true. Some subsets of these properties are proved to be subcontraction-equivalent anyway. Hadwiger's conjecture is expressed as the

We show that conjectures of Thomassen (every 4-connected line graph is hamiltonian) and Fleischner (every cyclically 4-edge-connected cubic graph has either a 3-edge-coloring or a dominating cycle) are equivalent.

A diffusion tensor is a mathematical construct used to describe water diffusion in complicated biological structures. It describes a process which occurs in all directions simultaneously. It is difficult to comprehend or graphically display the information in the diffusion tensor. This paper describ

A well-known conjecture of Broue in the representation theory of finite groups ínvolves equivalences of derived categories of blocks. The aim of this paper is to verify this conjecture for defect 2 blocks of symmetric groups. Actually we prove for these blocks a refinement of Broue's conjecture due