exponential field造句
例句與造句
- Exponential fields, meanwhile, are fields equipped with an exponential function that provides a homomorphism between the additive and multiplicative groups within the field.
- Exponential fields are much-studied objects in model theory, occasionally providing a link between it and number theory as in the case of decidability is still unresolved.
- The usual exponential function makes the real and complex numbers exponential fields, denoted "'R "'exp and "'C "'exp respectively.
- Schanuel's conjecture is part of this axiomatisation, and so the natural conjecture that the unique model of cardinality continuum is actually isomorphic to the complex exponential field implies Schanuel's conjecture.
- In 2004, Boris Zilber systematically constructed exponential fields " K " exp that are algebraically closed and of characteristic zero, and such that one of these fields exists for each uncountable cardinality.
- It's difficult to find exponential field in a sentence. 用exponential field造句挺難的
- There is nothing particularly special about "'C "'here, exponential polynomials may also refer to such a polynomial on any exponential field or exponential ring with its exponential function taking the place of " e " " x " above.
- Similarly to how exponential functions on exponential fields are defined, given a topological abelian group " G " a homomorphism from " G " to the additive group of the complex numbers is called an additive function, and a homomorphism to the multiplicative group of nonzero complex numbers is called an exponential function, or simply an exponential.