Finite configurations of geometric primitives under local metric and algebraic constraints arise in many situations in mathematics as well as in engineering and science applications. The former situations result in multiple perspectives, tools and techniques from algebraic geometry and topology; from combinatorics; from finite metric spaces, asymptotic geometry and convex analysis; and from complexity. The latter situations give rise to fresh new problems and directions.
Finite configurations of geometric primitives under local metric and algebraic constraints arise in many situations in mathematics as well as in en...