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Erasistratus drew a distinction between two kinds of pneuma: one was a "vital spirit" formed in the heart from air; the second type was formed in the brain from the first kind.
In this section, we consider an interesting bifurcation of limit cycles which is different from the first kind of bifurcation discussed in the previous section.
In this section, an interesting bifurcation of limit cycles, which is different from the first kind of bifurcation discussed in previous section, will be considered.
We have studied an interesting bifurcation which, different from the first kind of bifurcation, can generate 12 limit cycles by perturbing the quartic system with a nilpotent critical point.
Our research includes blends from the first kind that is a heterogeneous polymer blends, this is so far the most populous group, and if the blend is made of two polymers, two glass transition temperatures will be observed [3].
Weisbrod suggests the use of the following dynamic scheme: historically, knowledge goes from the first kind of technology to the second and then to the third.
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The possibility thus arises that the literature of such a field consists in substantial part of false conclusions resulting from errors of the first kind in statistical tests of significance.
It is straightforward to derive possible translational pseudo-symmetries (of the first kind) from the limiting cases of the lattice parameters of 2D-periodic arrays of points as listed in the third column of Table 1.
The function ϕ ∈ P C is said to be an almost periodic piecewise continuous function with points of discontinuity of the first kind from the set T if for every sequence of real numbers { α m ′ } there exists a subsequence { α n } such that θ α n ϕ is compact in P C × I. Lemma 2.2 ([18]).
As the definition of the degenerate Cauchy numbers of the second kind comes from the definition of those of the first kind, we define the degenerate Cauchy numbers of the forth kind by the generating function as follows: frac{ lambda t}{log( 1+ lambdalog(1+t))} = sum_{n=0}^{infty} C_{n, lambda,4} frac{t^{n}}{n!}.
By we denote the set of all functions which are continuous for and continuous from the left with discontinuities of the first kind at Similarly, is the set of functions having derivative.
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Since I tried Ludwig back in 2017, I have been constantly using it in both editing and translation. Ever since, I suggest it to my translators at ProSciEditing.

Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com