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Ideal-quasi-Cauchy sequences
An ideal is a family of subsets of positive integers which
is closed under taking finite unions and subsets of its elements. A sequence
of real numbers is said to be -convergent to a real number , if
for each \; the set belongs
to . We introduce -ward compactness of a subset of , the set
of real numbers, and -ward continuity of a real function in the senses that
a subset of is -ward compact if any sequence of
points in has an -quasi-Cauchy subsequence, and a real function is
-ward continuous if it preserves -quasi-Cauchy sequences where a sequence
is called to be -quasi-Cauchy when is
-convergent to 0. We obtain results related to -ward continuity, -ward
compactness, ward continuity, ward compactness, ordinary compactness, ordinary
continuity, -ward continuity, and slowly oscillating continuity.Comment: 16 pages. arXiv admin note: text overlap with arXiv:1005.494
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