additive polynomial造句
例句與造句
- These imply that the additive polynomials form a ring under polynomial addition and composition.
- The multiplication in the ring of additive polynomials is given by composition of polynomials, not by multiplication of commutative polynomials, and is not commutative.
- Over an infinite field, the twisted polynomial ring is isomorphic to the ring of additive polynomials, but where multiplication on the latter is given by composition rather than usual multiplication.
- The definition makes sense even if " k " is a field of characteristic zero, but in this case the only additive polynomials are those of the form " ax " for some " a " in " k ".
- This is because for fields with finite characteristic " p ", the " p " th powers of elements of " V " are not rational normal curves, but are of course a line . ( See, for example additive polynomial for a treatment of polynomials over a field of finite characteristic ).
- It's difficult to find additive polynomial in a sentence. 用additive polynomial造句挺難的
- The element ? can be thought of as a Frobenius element : in fact, " L " is a left module over " L " { ? }, with elements of " L " acting as multiplication and ? acting as the Frobenius endomorphism of L . The ring " L " { ? } can also be thought of as the ring of all ( absolutely ) additive polynomials