rank

In graph theory, the term “rank” describes a number of related concepts in physics including sequences, matrices, graphs, elliptic forms, finite series, quadratic equations, symmetries, definite and indefinite algebra, elliptic equations, polynomial equations, finite and infinite algebra, real numbers, functions of complex numbers, and scattering formulas. In set theory, rank is simply a (polymorphic) function in the category of sets from algebraic equations to finite numbers. For any real number x, the rank of x is just the set rank of the nth prime factor in the sequence x(I), such as e(I), I times the(I+1), or x(I+1) times e(I). For example, the rank of the natural number n(I) is just the natural number rank of the largest primes such as e(I), I times the(I+1), or e(I+1) times the primes that are prime to n.

Digital Product Review, How-Tos, Tech News, Digital Services
Logo
Compare items
  • Total (0)
Compare
0