homogeneous polynomial
1. Definition
Let \(R\) be a ring and \(f \in R[X_i \vert i \in I]\) hte polynomial ring. Then \(f\) is said to be a homogoneous polynomial, if each monomial has the same degree.
Let \(R\) be a ring and \(f \in R[X_i \vert i \in I]\) hte polynomial ring. Then \(f\) is said to be a homogoneous polynomial, if each monomial has the same degree.
Date: nil
Created: 2024-10-13 So 18:13