In mathematics, a supersolvable lattice is a graded lattice that has a maximal chain of elements, each of which obeys a certain modularity relationship. The definition encapsulates many of the nice properties of lattices of subgroups of supersolvable groups.
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In mathematics, a supersolvablelattice is a graded lattice that has a maximal chain of elements, each of which obeys a certain modularity relationship...
condition. Moreover, a finite group is supersolvable if and only if its lattice of subgroups is a supersolvablelattice, a significant strengthening of the...
arrangement is a supersolvablelattice, in the sense of Richard P. Stanley. As shown by Hiroaki Terao, a complex hyperplane arrangement is supersolvable if and...
it forms a lattice, and more specifically (for partitions of a finite set) it is a geometric and supersolvablelattice. The partition lattice of a 4-element...
modular lattices Young–Fibonacci lattice, an infinite modular lattice defined on strings of the digits 1 and 2 Orthomodular latticeSupersolvablelattice Iwasawa...
possibility in the preceding discussion, but it makes no material difference. Supersolvable arrangement Oriented matroid "Arrangement of hyperplanes", Encyclopedia...
uncountable groups are not supersolvable. In fact, all supersolvable groups are finitely generated, and an abelian group is supersolvable if and only if it is...
product of groups of square-free order (a special type of Z-group) G is a supersolvable group with elementary abelian Sylow subgroups (a special type of A-group)...
abelian groups U {\displaystyle {\mathfrak {U}}~} : the class of finite supersolvable groups N {\displaystyle {\mathfrak {N}}~} : the class of nilpotent...
orders must commute. It is also true that finite nilpotent groups are supersolvable. The concept is credited to work in the 1930s by Russian mathematician...