bounded types造句
造句與例句
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- See also the Wikipedia article on functions of bounded type.
- Functions of bounded type may also be so defined for another domain such as the upper half-plane.
- Functions of bounded type are not necessarily bounded, nor do they have a property called " type " which is bounded.
- The function \ exp ( aiz ) is of bounded type in the UHP if and only if " a " is real.
- Functions in a disc with bounded characteristic, also known as functions of bounded type, are exactly those functions that are ratios of bounded analytic functions.
- All of the above examples are of bounded type in the lower half-plane as well, using different " P " and " Q " functions.
- An entire function of order greater than 1 ( which means that in some direction it grows faster than a function of exponential type ) cannot be of bounded type in any half-plane.
- For a given region, sums, differences, and products of functions of bounded type are of bounded type, as is the quotient of two such functions as long as the denominator is not identically zero.
- For a given region, sums, differences, and products of functions of bounded type are of bounded type, as is the quotient of two such functions as long as the denominator is not identically zero.
- If an entire function is of bounded type in both the upper and the lower half-plane then it is of exponential type equal to the higher of the two respective " mean types " ( which will be non-negative ).
- It's difficult to see bounded types in a sentence. 用bounded types造句挺難的
- Functions of bounded type in the upper half-plane with non-positive mean type and having a continuous, square-integrable extension to the real axis have the interesting property ( useful in applications ) that the integral ( along the real axis)
- Subtyping however is not represented in the cube, even though systems like F ^ \ omega _ {, known as higher-order bounded quantification, which combines subtyping and polymorphism are of practical interest, and can be further generalized to bounded type operators.
- But the region mentioned in the definition of the term " bounded type " cannot be the whole complex plane unless the function is constant because one must use the same " P " and " Q " over the whole region, and the only entire functions ( that is, analytic in the whole complex plane ) which are bounded are constants, by Liouville's theorem.
- Any function of bounded type in the upper half-plane ( with a finite number of roots in some neighborhood of 0 ) can be expressed as a Blaschke product ( an analytic function, bounded in the region, which factors out the zeros ) multiplying the quotient P ( z ) / Q ( z ) where P ( z ) and Q ( z ) are bounded by 1 " "'and " "'have no zeros in the UHP . One can then express this quotient as
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