Reduced Gr�bner bases are " unique " for any given ideal and any monomial ordering.
22.
Some groups have the property that all of their irreducible representations are monomial, the so-called monomial groups.
23.
Some groups have the property that all of their irreducible representations are monomial, the so-called monomial groups.
24.
This compatibility implies that the product of a polynomial by a monomial does not change the order of the terms.
25.
Since is symmetric, its leading monomial has weakly decreasing exponents, so it is some with a partition of.
26.
These methods rely on constructing first a Newton interpolation of the polynomial and then converting it to the monomial form above.
27.
Where is a shorthand for the linear map that takes any element of the ?-Fock space to the monomial.
28.
Schur polynomials can be expressed as linear combinations of monomial symmetric functions with non-negative integer coefficients called Kostka numbers,
29.
Gr�bner bases are used to reduce the study of an arbitrary ideal in a pilynomial ring to that of monomial ideals.
30.
For Gr�bner bases, a further condition must be satisfied, namely that every non constant monomial is greater than the monomial.
