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The corresponding statement for triangulated categories is not true.
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and the second and third isomorphism theorem can be formulated and proven in a way very similar to the corresponding statements for groups.
Finally, we define recurrent domains for semigroups in Sect. 5 and provide a classification of such domains under some conditions which are generalizations of the corresponding statements of Fornaess Sibony [5] for the iterates of a single holomorphic endomorphism of (mathbb C^k,; kge 2).
The core of the procedure just described is the following: Something is true for the natural numbers exactly when the corresponding statement holds for all simple infinities (i.e., is a semantic consequence of the Dedekind-Peano axioms).
We also show that the corresponding statement holds true for the commutant of ˜π(C X)) under the assumption that a certain family of pure states of ˜π(C∗ is total.
The corresponding statement is less significant for insertions (p < 0.3) due to the small number of predicted non-conservative events in our set (6%, amounting to 9 events in our set of 151 insertions).
For example, it has been argued that a term such as 'John's walk' goes proxy for the corresponding statement 'John walked' [Geach 1965], so to say that John's walk was pleasant is just to say that John walked pleasantly.
The problem covers the corresponding statement with p-Laplacian in the principal part, for which it is sufficient to take (mu=0).
We modified the corresponding statement in the discussion.
Data indicate the number of participants who chose the corresponding statement.
Data indicate the number of respondents who chose the corresponding statement.
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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