Sentence examples for sequence of function from inspiring English sources

We achieved simplicity making the world arguments implicit, and using do notation to replace nested function calls with a sequence of function calls.

According to the newly developed GA operations in this paper, however, several suitable glass combinations can be found quickly through a unique sequence of function selection, crossover and mutation.

One of the attractive features of this algorithm is that a non-increasing sequence of function values are yielded, implying a quick and guaranteed convergence.

First we introduce a sequence of function spaces: left { begin{array}{l} Xsubset H_{2}subset X_{2}subset X_{1}subset H, X_{2}subset H_{1}subset H, end{array} right.

To prove the entire sequence of function {ξ t : 0 < t < 1} strongly converges to ξ* for each ω ∈ Ω. Suppose that there exists another subsequence of functions { ξ t k } such that ξ t k as t k → 0 for each ω ∈ Ω.

Without loss of generality, we assume that n ≥ m + 1. Choose the sequence of function f n ( z ) = z n / ∥ z n ∥ LB, n ∈ N. Then ∥ f n ∥ LB = 1, and { f n } converges to zero weakly on LB as n → ∞.

Consider two types of translation-invariant functionals I and J on Rm, and a sequence of functions fn whose corresponding symmetric rearrangements f∗n are convergent.

As events occur, the app reacts by calling a sequence of functions.

First, note that fact is a kind of limit of an inductively-defined sequence of functions factn, n >= 0, each of which can be defined without recursion.

Jeffery's dissertation, "The Uniform Approximation of a Sequence of Integrals and the Sequence of Functions Which Define a Definite Integral Containing a Parameter", was supervised by D.C. Gillespie.

In 1928, Ralph Lent Jeffery wrote a dissertation on "The Uniform Approximation of a Sequence of Integrals and the Sequence of Functions Which Define a Definite Integral Containing a Parameter", supervised by D.C. Gillespie.