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isotrivial

Terms vs Isotrivial - What's the difference?

terms | isotrivial |


As a noun terms

is .

As an adjective isotrivial is

(mathematics) describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

Isomorphic vs Isotrivial - What's the difference?

isomorphic | isotrivial |


In mathematics|lang=en terms the difference between isomorphic and isotrivial

is that isomorphic is (mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence while isotrivial is (mathematics) describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

As adjectives the difference between isomorphic and isotrivial

is that isomorphic is (mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence while isotrivial is (mathematics) describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

Fibre vs Isotrivial - What's the difference?

fibre | isotrivial |


In mathematics terms the difference between fibre and isotrivial

is that fibre is the preimage of a given point in the range of a map while isotrivial is describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

As a noun fibre

is (single elongated piece of material) A single piece of a given material, elongated and roughly round in cross-section, often twisted with other fibres to form thread.

As an adjective isotrivial is

describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

Curve vs Isotrivial - What's the difference?

curve | isotrivial |


As a verb curve

is .

As an adjective isotrivial is

(mathematics) describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

Morphism vs Isotrivial - What's the difference?

morphism | isotrivial |


As a noun morphism

is (mathematics|formally) an arrow in a category.

As an adjective isotrivial is

(mathematics) describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

Surface vs Isotrivial - What's the difference?

surface | isotrivial |


As a verb surface

is .

As an adjective isotrivial is

(mathematics) describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

Projective vs Isotrivial - What's the difference?

projective | isotrivial |


In mathematics terms the difference between projective and isotrivial

is that projective is describing those properties of a figure that are invariant upon projection while isotrivial is describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.

As adjectives the difference between projective and isotrivial

is that projective is projecting outward while isotrivial is describing a smooth projective surface having a morphism onto a curve such that all smooth fibres are isomorphic to each other.