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antiholomorphic

Terms vs Antiholomorphic - What's the difference?

terms | antiholomorphic |


As a noun terms

is .

As an adjective antiholomorphic is

(mathematics) describing any function in the complex plane whose derivative with respect to the complex conjugate exists at all points of an open set.

Derivative vs Antiholomorphic - What's the difference?

derivative | antiholomorphic |


As adjectives the difference between derivative and antiholomorphic

is that derivative is while antiholomorphic is (mathematics) describing any function in the complex plane whose derivative with respect to the complex conjugate exists at all points of an open set.

Function vs Antiholomorphic - What's the difference?

function | antiholomorphic |


In mathematics|lang=en terms the difference between function and antiholomorphic

is that function is (mathematics) a relation in which each element of the domain is associated with exactly one element of the codomain while antiholomorphic is (mathematics) describing any function in the complex plane whose derivative with respect to the complex conjugate exists at all points of an open set.

As a noun function

is what something does or is used for.

As a verb function

is to have a function.

As an adjective antiholomorphic is

(mathematics) describing any function in the complex plane whose derivative with respect to the complex conjugate exists at all points of an open set.