eisenstein (Meaning)

Wordnet

eisenstein (n)

Russian film maker who pioneered the use of montage and is considered among the most influential film makers in the history of motion pictures (1898-1948)

Synonyms & Antonyms of eisenstein

No Synonyms and anytonyms found

eisenstein Sentence Examples

  1. Eisenstein series are important objects in number theory and have been studied extensively for over a century.
  2. The Eisenstein criterion is a mathematical theorem that provides a necessary and sufficient condition for a polynomial to be irreducible over a field.
  3. The Eisenstein–Kronecker theorem is a result in algebraic number theory that provides a criterion for determining whether a cubic extension of a field is Galois.
  4. Eisenstein integers are the Gaussian integers that have real and imaginary parts that are both integers.
  5. The Eisenstein criterion for convergence of a series states that if the absolute value of the ratio of two consecutive terms of a series is less than 1, then the series converges absolutely.
  6. The Eisenstein ideal is the ideal in the ring of integers of a quadratic field that is generated by the non-zero elements of the field whose norms are not divisible by the discriminant of the field.
  7. The Eisenstein polynomial is a polynomial that is used to construct elliptic curves.
  8. The Eisenstein reciprocity law is a result in algebraic number theory that gives a relation between the Legendre symbol and the Jacobi symbol.
  9. The Eisenstein summation formula is a formula for the sum of a geometric series.
  10. The Eisenstein–Carlitz identity is an identity that relates the Jacobi symbol and the Dedekind symbol.

FAQs About the word eisenstein

Russian film maker who pioneered the use of montage and is considered among the most influential film makers in the history of motion pictures (1898-1948)

No synonyms found.

No antonyms found.

Eisenstein series are important objects in number theory and have been studied extensively for over a century.

The Eisenstein criterion is a mathematical theorem that provides a necessary and sufficient condition for a polynomial to be irreducible over a field.

The Eisenstein–Kronecker theorem is a result in algebraic number theory that provides a criterion for determining whether a cubic extension of a field is Galois.

Eisenstein integers are the Gaussian integers that have real and imaginary parts that are both integers.