The idea of conceputal scheme is clearly present in the classical and modern sociological theory. However, contemporary sociological thinking is highly critical of it and in its radical versions this idea is dismissed altogether. This articele taces various historically formed insights into the nature of concept formation in sociology and tries to demonstrate that without the attempts at creating a coherent conceptual scheme, sociology would be deprived of any possibility to push through a specifically sociological perspecitve on the social world. Talcott Parsons´conceptual level of theory is examined in detail and taken as an example of a viable theoretical approach based on the transformation of sociological concepts. The account of the sociological dilemma of scheme and reality is brought together with Donald Davidson´s argument against the dogma of scheme and reality. The idea of a conceptual scheme has been discredited on contemporary thinking together with the idea and the project of (grand) general theory of society. It is argued that from the generalizing critique of the idea of general theory it does not follow that sociology does not need sound concepts. If it were so then no sociological knowledge that would not refer only to itself would be possible., Jan Baloun., and Obsahuje seznam literatury
In an algebraic frame $L$ the dimension, $\dim (L)$, is defined, as in classical ideal theory, to be the maximum of the lengths $n$ of chains of primes $p_0<p_1<\cdots <p_n$, if such a maximum exists, and $\infty $ otherwise. A notion of “dominance” is then defined among the compact elements of $L$, which affords one a primefree way to compute dimension. Various subordinate dimensions are considered on a number of frame quotients of $L$, including the frames $dL$ and $zL$ of $d$-elements and $z$-elements, respectively. The more concrete illustrations regarding the frame convex $\ell $-subgroups of a lattice-ordered group and its various natural frame quotients occupy the second half of this exposition. For example, it is shown that if $A$ is a commutative semiprime $f$-ring with finite $\ell $-dimension then $A$ must be hyperarchimedean. The $d$-dimension of an $\ell $-group is invariant under formation of direct products, whereas $\ell $-dimension is not. $r$-dimension of a commutative semiprime $f$-ring is either 0 or infinite, but this fails if nilpotent elements are present. $sp$-dimension coincides with classical Krull dimension in commutative semiprime $f$-rings with bounded inversion.
We study the Diophantine equations (k!)n − k n = (n!)k − n k and (k!)n + k n = (n!)k + n k , where k and n are positive integers. We show that the first one holds if and only if k = n or (k, n) = (1, 2), (2, 1) and that the second one holds if and only if k = n.
Dioptričeskije tablicy zemnoj atmosfery vyčisljajutsja po dannym, polučennym aerologičeskim zondirovanijem v tečenije Meždunarodnogo geofizičeskogo goda i soderžat vse trebujemyje elementy gorizontal'nych traektorij sveta v zavisimosti ot jich minimal'noj vysoty h0 v različnzch točkach etich trajektorij, t.e. dlja različnych vysot h etich toček. Rasčety proizvodilis' na elektronnoj vyčislitel'noj mašine ZUSE 23 dlja geografičeskoj široty ot 70° ju. š. do 70° s. š. i dlja zimnego i letnego periodov. and Tabulky uvedeny na stranách 11-86