Abstract

Abstract In any mesh, rules exist that interrelate the number of internal and external sides, vertices, etc. and the total number of elements. These are given explicitly for plane meshes of triangles and quadrilaterals, and for solid meshes of tetrahedra and cuboidal elements. The method is quite general and discovers all such independent rules that exist. Thus, for a plane mesh of T elements having V i internal and V b boundary vertices and S i internal and S b boundary sides, then where H is the number of internal boundaries (holes) there might be. For solid meshes, these two‐dimensional equations relating elements to sides generalize to where there are F b boundary and F i internal faces. Unfortunately, there is no direct generalization of the two‐dimensional equations relating vertices and elements: it is only possible to do this by including the E i internal and E b boundary edges: where there are H through holes and h cavities.