1,251 research outputs found
Splitting families and complete separability
We answer a question from Raghavan and Stepr{\=a}ns' paper on weakly tight
families by showing that . Then
we use this to construct a completely separable maximal almost disjoint family
under \s \leq \a, partially answering a question of Shelah
Soft skills of Czech graduates
Finding a job is easier for people who are better equipped with soft skills, as they are more productive. Therefore, this article deals with the evaluation of soft skills of graduates from Czech public universities. The results show that the same soft skills are required from university graduates as from the population as a whole (only problem solving is more pronounced with them), but the required level of these skills is 42% higher in the case of graduates. Unfortunately, employers perceive the level of graduates' soft skills insufficient as their level is by 16.46 to 31.15% lower than required. A more detailed analysis showed that, in terms of the development of soft skills, Czech universities provide a very homogenous service. Graduates of universities have nearly the same level of soft skills, while they can also identify similar strengths and weaknesses. These findings suggest that Czech universities should pay more attention to the systematic development of soft skills.Web of Science181604
Future skills needs in EU and skills transferability in 2020 : sector meta-analysis
Employment and its changes caused by restructuring are topics, which European Union pays attention to in long-run horizon, and the experience of current economic crisis confirms the rectitude of this approach. Structural changes always generate a need of the re-emplacement of laid off workers. Possibilities of their emplacement is strongly influenced by knowledge and skills offered by workers and demanded by employers. Acquaintance with future demand on knowledge and skills applicable across whole economy or applicable in different segments of labour market, i.e. in concrete occupations and sectors, enables effective targeting of educational activities at both individual and social levels, which will lead to higher flexibility of labour market mirrored mainly by high occupational mobility and low structural unemployment. The aim of this paper is to analyse future knowledge and skills needs recognized in 18 future-oriented sector analyses, published by European Commission in 2009, and identify knowledge and skills applicable in individual sectors, occupations and on the whole labour market, i.e. identify transferable knowledge and skills
A convergence on Boolean algebras generalizing the convergence on the Aleksandrov cube
We compare the forcing related properties of a complete Boolean algebra B
with the properties of the convergences (the algebraic convergence)
and on B generalizing the convergence on the Cantor and
Aleksandrov cube respectively. In particular we show that is a
topological convergence iff forcing by B does not produce new reals and that
is weakly topological if B satisfies condition
(implied by the -cc). On the other hand, if is a
weakly topological convergence, then B is a -cc algebra or in
some generic extension the distributivity number of the ground model is greater
than or equal to the tower number of the extension. So, the statement "The
convergence on the collapsing algebra B=\ro
((\omega_2)^{<\omega}) is weakly topological" is independent of ZFC
On weakly tight families
Using ideas from Shelah's recent proof that a completely separable maximal
almost disjoint family exists when , we construct a
weakly tight family under the hypothesis \s \leq \b < {\aleph}_{\omega}. The
case when \s < \b is handled in \ZFC and does not require \b <
{\aleph}_{\omega}, while an additional PCF type hypothesis, which holds when
\b < {\aleph}_{\omega} is used to treat the case \s = \b. The notion of a
weakly tight family is a natural weakening of the well studied notion of a
Cohen indestructible maximal almost disjoint family. It was introduced by
Hru{\v{s}}{\'a}k and Garc{\'{\i}}a Ferreira \cite{Hr1}, who applied it to the
Kat\'etov order on almost disjoint families
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