489 research outputs found
Discursive Construction of Others: The Serbian Community in Southeast Kosovo in the Post-War Context
Π£ ΠΎΠΏΡΡΠΈΠΌ ΠΏΠΎΡΠ΅Π·ΠΈΠΌΠ° ΠΈΠ·Π»ΠΎΠΆΠ΅Π½Π° ΡΡ ΡΠ΅ΠΎΡΠΈΡΡΠΊΠΎ-ΠΌΠ΅ΡΠΎΠ΄ΠΎΠ»ΠΎΡΠΊΠ°
ΠΏΠΎΠ»Π°Π·ΠΈΡΡΠ° ΠΈ ΡΠ΅Π·ΡΠ»ΡΠ°ΡΠΈ ΠΌΡΠ»ΡΠΈΠ»ΠΎΠΊΠ°Π»Π½ΠΎΠ³ ΡΠ΅ΡΠ΅Π½ΡΠΊΠΎΠ³ ΠΈΡΡΡΠ°ΠΆΠΈΠ²Π°ΡΠ° ΡΡΠΏΡΠΊΠ΅ Π·Π°ΡΠ΅Π΄Π½ΠΈΡΠ΅ ΡΡΠ³ΠΎΠΈΡΡΠΎΡΠ½ΠΎΠ³ ΠΠΎΡΠΎΠ²Π°. Π Π°Π΄ ΠΏΡΠ΅Π΄ΡΡΠ°Π²ΡΠ°
ΡΠΊΡΠ°ΡΠ΅Π½Ρ Π²Π΅ΡΠ·ΠΈΡΡ Π·Π½Π°ΡΠ½ΠΎ ΠΎΠ±ΠΈΠΌΠ½ΠΈΡΠ΅ ΡΡΡΠ΄ΠΈΡΠ΅ ΠΎΠ΄Π½ΠΎΡΠ° Π΅ΡΠ½ΠΈΡΠΊΠΎΠ³
ΠΈ Π΄ΡΡΠ³ΠΈΡ
ΠΎΠ±Π»ΠΈΠΊΠ° ΠΊΠΎΠ»Π΅ΠΊΡΠΈΠ²Π½ΠΎΠ³ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠ° ΡΡΠΏΡΠΊΠ΅ Π·Π°ΡΠ΅Π΄Π½ΠΈΡΠ΅
ΡΡΠ³ΠΎΠΈΡΡΠΎΡΠ½ΠΎΠ³ ΠΠΎΡΠΎΠ²Π° Ρ ΠΏΠΎΡΠ»Π΅ΡΠ°ΡΠ½ΠΎΠΌ ΠΊΠΎΠ½ΡΠ΅ΠΊΡΡΡ.This paper briefly discusses method and theory and results of
multi-sited field research of the Serbian community in southeast
Kosovo. The paper represents a reduced version of much larger
study, to follow subsequently, on relation between ethnic and
other forms of collective identity of the Serbian community in
southeast Kosovo in the post-war context
KRIVIΔNA DELA VISOKOTEHNOLOΕ KOG KRIMINALA
Review of the book, Dragan Prlja, Zvonimir IvanoviΔ, Mario ReljanoviΔ,KRIVIΔNA DELA VISOKOTEHNOLOΕ KOG KRIMINALA,Institut za uporedno pravo Srbije, Beograd 2011, 202Prikaz knjige, Dragan Prlja, Zvonimir IvanoviΔ, Mario ReljanoviΔ,KRIVIΔNA DELA VISOKOTEHNOLOΕ KOG KRIMINALA,Institut za uporedno pravo Srbije, Beograd 2011, 20
NACIONALNI PLAN ZA RETKE BOLESTI β UPOREDNOPRAVNI PRIKAZ
In this paper has been analised the documents of European Union in the field of Rare Diseases, particularly those related to adoption, implementation and evaluation of National Plans of Rare Diseases. The author takes as an example the French National Plan for Rare Diseases. France was the first country of the European Union which adopted the National Plan for Rare Diseases in 2004. In addition, the author, examines the situation in Germany related to the access of individuals suffering from rare diseases in the health care sistem, due to the fact that Germany has not enached the National Plan for Rare Diseases yet. However, Germany has taken action in that direction. The author also gives a critical assessment of the current situation in the field of legal regulation of rare diseases in Serbia and points out the significance and importance of adopting the National Plan for Rare Diseases as a mechanism of implementing the provisions of law related to rare diseases.U radu se analiziraju akti Evropske unije u oblasti pravnog regulisanja retkih bolesti, posebno oni koji se odnose na usvajanje, implementaciju i evaluaciju nacionalnih planova za retke bolesti. Kao primer, uzima se Nacionalni plan za retke bolesti Francuske i razmatra se situacija u NemaΔkoj u vezi sa pristupom lica obolelih od retkih bolesti sistemu zdravstvene zaΕ‘tite, s obzirom na to da NemaΔka joΕ‘ uvek nije donela Nacionalni plan za retke bolesti. Putem komparativnog metoda, daje se ritiΔka ocena postojeΔeg stanja u oblasti pravnog regulisanja retkih bolesti u Republici Srbiji, te se ukazuje na vaΕΎnost i znaΔaj usvajanja Nacionalnog plana za retke bolesti
ΠΠΎΡ ΠΊΠ°ΡΠ΅Π³ΠΎΡΠΈΠ·Π°ΡΠΈΡΠ΅ : ΡΡΠ°ΡΠΎΡΠ΅Π΄Π΅ΠΎΡΠΈ ΠΈ Π΄ΠΎΡΠ΅ΡΠ΅Π½ΠΈΡΠΈ ΡΡΠ³ΠΎΠΈΡΡΠΎΡΠ½ΠΎΠ³ ΠΠΎΡΠΎΠ²Π°
The paper is based on fieldwork conducted over the course of a period from 2003 until 2006 at refugee centers in Serbia proper and Southeastern Kosovo more specifically in a part of the area known today as Kosovsko Pomoravlje. The paper is intended to present preliminary results of the probe into the issue of relations between the native Serbs and Serb in comers (colonized in the area after 1918 as part of the agrarian reform drive). Incomers from Southeastern Serbia to whom the native population ascribed the 'Sop' identity are the focal point of the research.Π Π°Π΄ ΡΠ΅ Π·Π°ΡΠ½ΠΈΠ²Π° Π½Π° ΡΠ΅ΡΠ΅Π½ΡΠΊΠΈΠΌ ΠΈΡΡΡΠ°ΠΆΠΈΠ²Π°ΡΠΈΠΌΠ° ΠΎΠ±Π°Π²ΡΠ°Π½ΠΈΠΌ Ρ ΠΏΠ΅ΡΠΈΠΎΠ΄Ρ ΠΎΠ΄
2003. Π΄ΠΎ 2006. Π³ΠΎΠ΄ΠΈΠ½Π΅ Ρ ΠΈΠ·Π±Π΅Π³Π»ΠΈΡΠΊΠΈΠΌ ΡΠ΅Π½ΡΡΠΈΠΌΠ° Ρ Π‘ΠΌΠ΅Π΄Π΅ΡΠ΅Π²Ρ, ΠΡΠ°ΡΡ ΠΈ
ΠΡΠ°ΡΡΠΊΠΎΡ ΠΠ°ΡΠΈ ΠΈ, in situ Π½Π° ΠΏΠΎΠ΄ΡΡΡΡΡ ΡΡΠ³ΠΈΠΎΠΈΡΡΠΎΡΠ½ΠΎΠ³ ΠΠΎΡΠΎΠ²Π°: Ρ Π΅Π½ΠΊΠ»Π°Π²ΠΈ ΠΠΈΡΠΈΠ½Π°,
ΠΊΠΎΡΡ β ΠΎΡΠΈΠΌ ΠΈΡΡΠΎΠΈΠΌΠ΅Π½Π΅ Π²Π°ΡΠΎΡΠΈΡΠ΅ β ΡΠ°ΡΠΈΡΠ°Π²Π°ΡΡ ΠΈ ΡΠ΅Π»Π° ΠΡΠ±ΠΎΠ²Π°Ρ, ΠΡΠ½ΡΠ°Ρ, ΠΠΈΠ½Π°Ρ,
ΠΠ»ΠΎΠΊΠΎΡ ΠΈ ΠΠΎΠ³ΠΈΠ»Π°, ΠΊΠ°ΠΎ ΠΈ Ρ ΠΡΠΈΠ»Π°Π½Ρ ΠΈ ΠΎΠΊΠΎΠ»Π½ΠΈΠΌ ΡΠ΅Π»ΠΈΠΌΠ° (Π¨ΠΈΠ»ΠΎΠ²ΠΎ, ΠΠΎΡΡΠ΅ ΠΡΡΡΠ΅,
ΠΠΎΡΡΠΈ ΠΠΈΠ²ΠΎΡ, ΠΠ°ΡΡΠ΅Ρ, ΠΠ°ΡΡΠ°Π½Π΅ ΠΈ Π΄Ρ.) Π Π°Π΄ ΠΈΠΌΠ° Π·Π° ΡΠΈΡ Π΄Π° Π΄Γ’ ΠΏΡΠ΅Π»ΠΈΠΌΠΈΠ½Π°ΡΠ½Π΅
ΡΠ΅Π·ΡΠ»ΡΠ°ΡΠ΅ ΠΈΡΡΡΠ°ΠΆΠΈΠ²Π°ΡΠ° ΠΏΡΠΎΠ±Π»Π΅ΠΌΠ° ΠΎΠ΄Π½ΠΎΡΠ° Π‘ΡΠ±Π° ΡΡΠ°ΡΠΎΡΠ΅Π΄Π΅Π»Π°ΡΠ° ΠΈ Π΄ΠΎΡΠ΅ΡΠ΅Π½ΠΈΠΊΠ°
(ΠΊΠΎΠ»ΠΎΠ½ΠΈΠ·ΠΎΠ²Π°Π½ΠΈΡ
Ρ ΠΏΠ΅ΡΠΈΠΎΠ΄Ρ ΠΏΠΎΡΠ»Π΅ 1918. Π³ΠΎΠ΄ΠΈΠ½Π΅, Ρ ΠΎΠΊΠ²ΠΈΡΡ Π°Π³ΡΠ°ΡΠ½Π΅ ΡΠ΅ΡΠΎΡΠΌΠ΅). Π£
ΡΠΎΠΊΡΡΡ ΡΠ°Π·ΠΌΠ°ΡΡΠ°ΡΠ° ΡΡ Π΄ΠΎΡΠ΅ΡΠ΅Π½ΠΈΡΠΈ ΠΈΠ· ΡΡΠ³ΠΎΠΈΡΡΠΎΡΠ½Π΅ Π‘ΡΠ±ΠΈΡΠ΅, ΠΊΠΎΡΠΈΠΌΠ° ΡΠ΅
ΡΡΠ°ΡΠΎΡΠ΅Π΄Π΅Π»Π°ΡΠΊΠΎ ΡΡΠ°Π½ΠΎΠ²Π½ΠΈΡΡΠ²ΠΎ ΠΏΡΠΈΠΏΠΈΡΠΈΠ²Π°Π»ΠΎ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅Ρ βΠ¨ΠΎΠΏΠΎΠ²Π°β.
ΠΡΠ΅ΠΌΠ° Π΄ΡΡΡΡΠ²Π΅Π½ΠΎΠΊΠΎΠ½ΡΡΡΡΠΊΡΠΈΠ²ΠΈΡΡΠΈΡΠΊΠΎΠΌ ΠΏΡΠΈΡΡΡΠΏΡ, ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠΈ ΡΡ
ΠΏΡΠΎΠΌΠ΅Π½ΡΠΈΠ²ΠΈ, ΡΠΈΡΡΠ°ΡΠΈΠΎΠ½ΠΎ ΡΡΠ»ΠΎΠ²ΡΠ΅Π½ΠΈ ΠΈ ΠΏΠΎΠ΄Π»ΠΎΠΆΠ½ΠΈ ΠΏΡΠ΅Π³ΠΎΠ²Π°ΡΠ°ΡΡ, Π° Ρ ΡΠΈΠΌ
ΠΏΡΠΎΡΠ΅ΡΠΈΠΌΠ° Π²Π°ΠΆΠ½Ρ ΡΠ»ΠΎΠ³Ρ ΠΈΠ³ΡΠ°ΡΡ ΡΠΏΠΎΡΠ°ΡΡΠ° Π΄Π΅ΡΠΈΠ½ΠΈΡΠΈΡΠ°, ΠΎΠ΄Π½ΠΎΡΠΈ ΠΌΠΎΡΠΈ ΠΈ
Π΄ΠΎΠΌΠΈΠ½Π°ΡΠΈΡΠ΅. ΠΡΠ½ΠΈΡΠΈΡΠ΅Ρ (Ρ Π·Π°Π²ΠΈΡΠ½ΠΎΡΡΠΈ ΠΎΠ΄ Π΄ΡΡΡΡΠ²Π΅Π½ΠΎΠ³ ΠΊΠΎΠ½ΡΠ΅ΠΊΡΡΠ°, ΠΈ Π΄ΡΡΠ³ΠΈ
ΠΎΠ±Π»ΠΈΡΠΈ ΠΊΠΎΠ»Π΅ΠΊΡΠΈΠ²Π½ΠΎΠ³ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠ°) ΡΠ²Π΅ΠΊ ΠΏΡΠ΅Π΄ΡΡΠ°Π²ΡΠ° ΡΠ΅Π·ΡΠ»ΡΠ°Ρ ΠΈΠ½ΡΠ΅ΡΠ°ΠΊΡΠΈΡΠ΅
ΠΊΠΎΠ½ΡΠΈΠ½ΡΠΈΡΠ°Π½ΠΈΡ
ΠΏΡΠΎΡΠ΅ΡΠ° ΡΠ½ΡΡΡΠ°ΡΡΠ΅Π³ ΠΈ ΡΠΏΠΎΡΠ°ΡΡΠ΅Π³ ΠΎΠ΄ΡΠ΅ΡΠ΅ΡΠ°, ΡΠ°ΠΌΠΎΠΈΠ΄Π΅Π½ΡΠΈΡΠΈΠΊΠ°ΡΠΈΡΠ΅ ΠΈ ΠΈΠ΄Π΅Π½ΡΠΈΡΠΈΠΊΠ°ΡΠΈΡΠ΅ ΠΎΠ΄ ΡΡΡΠ°Π½Π΅ Π΄ΡΡΠ³ΠΈΡ
. Π‘ΠΏΠΎΡΠ°ΡΡΠ° Π΄Π΅ΡΠΈΠ½ΠΈΡΠΈΡΠ° β
ΠΊΠ°ΡΠ΅Π³ΠΎΡΠΈΠ·Π°ΡΠΈΡΠ° β Π·Π½Π°ΡΠ°ΡΠ½Π° ΡΠ΅ Π΄ΠΈΠΌΠ΅Π½Π·ΠΈΡΠ° ΡΠ½ΡΡΡΠ°ΡΡΠ΅ Π΄Π΅ΡΠΈΠ½ΠΈΡΠΈΡΠ΅ (Π . ΠΠ΅Π½ΠΊΠΈΠ½Ρ).
Π Π°Π΄ ΡΠ΅ ΡΡΠΌΠ΅ΡΠ΅Π½ Π½Π° ΡΠ°Π³Π»Π΅Π΄Π°Π²Π°ΡΠ΅ ΡΠ»ΠΎΠ³Π΅ ΡΠΏΠΎΡΠ°ΡΡΠ΅ Π΄Π΅ΡΠΈΠ½ΠΈΡΠΈΡΠ΅ β ΠΊΠ°ΡΠ΅Π³ΠΎΡΠΈΠ·Π°ΡΠΈΡΠ΅
Ρ ΠΏΡΠΎΡΠ΅ΡΠΈΠΌΠ° ΠΊΠΎΠ½ΡΡΡΡΠΈΡΠ°ΡΠ° ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠ° ΠΌΠ΅ΡΡ ΠΏΡΠΈΠΏΠ°Π΄Π½ΠΈΡΠΈΠΌΠ° ΡΡΠΏΡΠΊΠ΅ Π·Π°ΡΠ΅Π΄Π½ΠΈΡΠ΅ Ρ
ΠΎΠ±Π»Π°ΡΡΠΈ ΡΡΠ³ΠΎΠΈΡΡΠΎΡΠ½ΠΎΠ³ ΠΠΎΡΠΎΠ²Π°. ΠΠ°ΡΠΈΠ½ Π½Π° ΠΊΠΎΡΠΈ Π΄ΠΎΡΠ΅ΡΠ΅Π½ΠΈΡΠΈ, Π°Π»ΠΈ Ρ ΠΏΠΎΡΠ΅Π΄ΠΈΠ½ΠΈΠΌ
ΡΠΈΡΡΠ°ΡΠΈΡΠ°ΠΌΠ° ΠΈ ΠΎΠ½ΠΈ ΠΊΠΎΡΠΈ ΡΠ΅Π±Π΅ ΠΎΠ΄ΡΠ΅ΡΡΡΡ ΠΊΠ°ΠΎ ΡΡΠ°ΡΠΎΡΠ΅Π΄Π΅ΠΎΡΠ΅ Π½Π° ΠΠΎΡΠΎΠ²Ρ,
ΠΈΠ½ΡΠ΅ΡΠΏΡΠ΅ΡΠΈΡΠ°ΡΡ ΡΠ²ΠΎΡ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅Ρ ΡΡΠΊΠΎ ΡΠ΅ ΠΏΠΎΠ²Π΅Π·Π°Π½ Ρ ΡΠΈΠΌ ΠΊΠ°ΠΊΠΎ ΡΠΈΡ
ΠΈΠ½ΡΠ΅ΡΠΏΡΠ΅ΡΠΈΡΠ°ΡΡ
ΠΎΠ²ΠΈ Π΄ΡΡΠ³ΠΈ. Π£ΡΡΠ΅Π΄ΡΡΠ΅ΡΠ΅Π½ΠΎΡΡ Π½Π° ΡΠΏΠΎΡΠ°ΡΡΡ Π΄Π΅ΡΠΈΠ½ΠΈΡΠΈΡΡ, ΡΠ·Π². βΠΊΠΎΠΌΡΠΈΡΡΠΊΠΈ
Π΄ΠΈΡΠΊΡΡΡβ (Π‘ΠΈΠΊΠΈΠΌΠΈΡ), ΠΎΠΌΠΎΠ³ΡΡΠ°Π²Π° ΠΏΡΠΎΠ΄ΡΠ±ΡΠ΅Π½ΠΈΡΠΈ ΡΠ²ΠΈΠ΄ Ρ Π΄ΠΈΠ½Π°ΠΌΠΈΠΊΡ ΠΏΡΠΎΡΠ΅ΡΠ° Π΄ΡΡΡΡΠ²Π΅Π½ΠΎΠ³ ΠΎΠ±Π»ΠΈΠΊΠΎΠ²Π°ΡΠ° ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠ°, ΠΈ ΡΠΎ Π½Π° ΠΏΠΎΠ΄ΡΡΡΡΡ ΠΊΠΎΡΠ΅ ΠΊΠ°ΡΠ°ΠΊΡΠ΅ΡΠΈΡΠ΅
ΠΏΠΎΠ³ΡΠ°Π½ΠΈΡΠ½ΠΈ ΠΊΠ°ΡΠ°ΠΊΡΠ΅Ρ ΠΈ ΠΌΡΠ»ΡΠΈΠ΅ΡΠ½ΠΈΡΠΈΡΠ΅Ρ.
Π‘ΡΠ°ΡΠΎΡΠ΅Π΄Π΅ΠΎΡΠΈ ΠΈ βΠ¨ΠΎΠΏΠΎΠ²ΠΈβ, ΠΈΠ°ΠΊΠΎ ΠΈΡΡΠΎΠ²Π΅ΡΠ½ΠΈ ΠΏΠΎ Π΅ΡΠ½ΠΈΡΠΊΠΎΡ ΠΏΡΠΈΠΏΠ°Π΄Π½ΠΎΡΡΠΈ
(ΠΏΡΠ΅ΠΌΠ΄Π° ΡΡ ΡΠ΅ ΡΠ΅Π΄Π½ΠΈ Π΄ΡΡΠ³ΠΈΠΌΠ°, Ρ ΠΈΠ·Π²Π΅ΡΠ½ΠΎΠΌ ΡΠΌΠΈΡΠ»Ρ, Π΄ΠΎΠ²ΠΎΠ΄ΠΈΠ»ΠΈ Ρ ΠΏΠΈΡΠ°ΡΠ΅),
ΡΠ΅Π»ΠΈΠ³ΠΈΡΠΈ, ΡΠ΅Π·ΠΈΠΊΡ ΠΈ Π΄ΠΈΡΠ°Π»Π΅ΠΊΡΡ (ΠΏΡΠΈΠ·ΡΠ΅Π½ΡΠΊΠΎ-ΡΠΈΠΌΠΎΡΠΊΠΈ Π΄ΠΈΡΠ°Π»Π΅ΠΊΠ°ΡΡΠΊΠΈ ΡΠΈΠΏ), ΡΠ°ΠΌΠΎ Ρ
ΡΠ°Π·Π»ΠΈΡΠΈΡΠΈΠΌ Π»ΠΎΠΊΠ°Π»Π½ΠΈΠΌ Π³ΠΎΠ²ΠΎΡΠΈΠΌΠ°, ΠΆΠΈΠ²Π΅Π»ΠΈ ΡΡ ΠΊΠ°ΠΎ Π΄Π²Π΅ Π΅Π½Π΄ΠΎΠ³Π°ΠΌΠ½Π΅ Π³ΡΡΠΏΠ΅.
ΠΠΈΡΡΠΈΠ½ΠΊΡΠΈΠ²Π½ΠΈ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠΈ Π΄Π²Π΅ΡΡ Π³ΡΡΠΏΠ° Π·Π°ΡΠ½ΠΈΠ²Π°ΡΡ ΡΠ΅ Π½Π° ΠΈΠ½ΡΠ΅ΡΠΏΡΠ΅ΡΠ°ΡΠΈΡΠ°ΠΌΠ°
Π»ΠΎΠΊΠ°Π»Π½ΠΈΡ
ΠΈ ΡΠ΅Π³ΠΈΠΎΠ½Π°Π»Π½ΠΈΡ
ΡΠ°Π·Π»ΠΈΠΊΠ°. ΠΠΎΠΊΠ°Π»Π½ΠΈΠΌ, ΠΎΠ΄Π½ΠΎΡΠ½ΠΎ ΡΠ΅Π³ΠΈΠΎΠ½Π°Π»Π½ΠΈΠΌ
ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠΈΠΌΠ° ΠΏΡΠΈΠ΄Π°ΡΠ΅ ΡΠ΅ Ρ ΠΏΠΎΡΠ΅Π΄ΠΈΠ½ΠΈΠΌ ΡΠΈΡ
ΠΎΠ²ΠΈΠΌ Π°ΡΠΏΠ΅ΠΊΡΠΈΠΌΠ° Π·Π½Π°ΡΠ°Ρ Π΅ΡΠ½ΠΈΡΠΈΡΠ΅ΡΠ°.
ΠΡΠΈΠΏΠ°Π΄Π½ΠΈΡΠΈ Π΄ΡΡΠ³Π΅ Π³ΡΡΠΏΠ΅ ΠΎΠΏΠ°ΠΆΠ°ΡΡ ΡΠ΅ ΠΊΠ°ΠΎ Π΄ΡΡΠ³Π°ΡΠΈΡΠΈ, ΠΈ ΡΠΎ Ρ ΡΠ°ΠΊΠ²ΠΎΡ ΠΌΠ΅ΡΠΈ Π΄Π° ΡΠ΅
ΠΈΠ·ΡΠ°ΠΆΠ°Π²Π° Π±ΠΎΡΠ°Π·Π°Π½ Π΄Π° ΠΎΠ½ΠΈ ΠΏΡΠ²ΠΈΠΌΠ° ΠΌΠΎΠ³Ρ ΡΠ³ΡΠΎΠ·ΠΈΡΠΈ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅Ρ ΡΠΊΠΎΠ»ΠΈΠΊΠΎ Π±ΠΈ Π΄ΠΎΡΠ»ΠΎ
Π΄ΠΎ ΠΎΡΠΎΡΠ°Π²Π°ΡΠ° (Π². ΡΡΠ°Π½ΡΠΊΡΠΈΠΏΡ [5]), Π΄Π΅ΡΠ° ΠΈΠ· ΡΠ°ΠΊΠ²ΠΈΡ
Π±ΡΠ°ΠΊΠΎΠ²Π° ΡΠΌΠ°ΡΡΠ°ΡΡ ΡΠ΅ ΠΌΠ΅Π»Π΅Π·ΠΈΠΌΠ°
ΠΈ ΡΠ». ΠΡΠ½ΠΈΡΠΊΠΈ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅Ρ ΠΏΡΠ΅Π΄ΡΡΠ°Π²ΡΠ° Π΄ΡΡΡΡΠ²Π΅Π½Ρ ΠΊΠΎΠ½ΡΡΡΡΠΊΡΠΈΡΡ, Π°Π»ΠΈ ΡΠΎΡΠΌΠΈΡΠ°Π½Ρ
Π½Π° ΡΠ°ΠΊΠ°Π² Π½Π°ΡΠΈΠ½ Π΄Π° Π·Π°Π΄ΠΎΠ±ΠΈΡΠ° ΠΏΡΠΈΠΌΠΎΡΠ΄ΠΈΡΠ°Π»Π½Π΅ Π°ΡΡΠΈΠ±ΡΡΠ΅, ΠΎΠ΄Π½ΠΎΡΠ½ΠΎ β ΠΎΠ±ΠΈΡΠ½ΠΈ ΡΡΠ΄ΠΈ
Π΄ΠΎΠΆΠΈΠ²ΡΠ°Π²Π°ΡΡ Π³Π° Ρ Π΅ΡΠ΅Π½ΡΠΈΡΠ°Π»Π½ΠΎΠΌ ΠΈ ΠΏΡΠΈΠΌΠΎΡΠ΄ΠΈΡΠ°Π»Π°Π½ΠΎΠΌ ΡΠΌΠΈΡΠ»Ρ (ΠΡΠ΅Π»ΠΈΡ).
Π‘ΡΠ°ΡΠΎΡΠ΅Π΄Π΅ΠΎΡΠΈ Π½Π΅ ΠΎΠΏΠ°ΠΆΠ°ΡΡ βΠ¨ΠΎΠΏΠΎΠ²Π΅β ΠΊΠ°ΠΎ Π½ΠΎΡΠΈΠΎΡΠ΅ ΠΈΡΡΠΎΠ³ Π΅ΡΠ½ΠΈΡΠΊΠΎΠ³ ΠΈΠ΄Π΅Π½ΡΠΈΡΠ΅ΡΠ°,
ΡΠ΅Ρ Π½Π΅Π΄ΠΎΡΡΠ°ΡΠ΅ ΠΏΡΠΈΠΌΠΎΡΠ΄ΠΈΡΠ°Π»Π½Π° ΠΏΡΠΈΠ²ΡΠΆΠ΅Π½ΠΎΡΡ (ΠΎΡΠ΅ΡΠ°ΡΠ΅ Π·Π°ΡΠ΅Π΄Π½ΠΈΡΡΠ²Π° ΠΈ
ΡΠΎΠ»ΠΈΠ΄Π°ΡΠ½ΠΎΡΡΠΈ, ΠΊΠΎΡΠ΅ ΠΏΡΠΎΠΈΠ·ΠΈΠ»Π°Π·ΠΈ ΠΈΠ· Π²Π΅ΡΠΎΠ²Π°ΡΠ° Ρ ΠΊΡΠ²Π½ΠΎ ΡΡΠΎΠ΄ΡΡΠ²ΠΎ, Π·Π°ΡΠ΅Π΄Π½ΠΈΡΠΊΠΎ
ΠΏΠΎΡΠ΅ΠΊΠ»ΠΎ ΠΈ ΡΠ».
Combined Use of Systems Methodologies in Creative Managing the Problem Situations: Key Features, Benefits and Challenges
Management problems in contemporary enterprises should be, according to their increasing complexity and diversity, observed and explored as the management problem situations, that is the systems of problems. Creative dealing with these complex, dynamic and ambiguous problem situations implied the development of a great variety of systems approaches to problem solving, i.e. systems methodologies for problem situations structuring. Since no methodology is able to explore all aspects of the complex problem situations in enterprises, the topic of the paper is combined use of systems methodologies in creative managing the problem situations. The goal of this paper is to highlight the key features, benefits and challenges of combining the systems methodologies in creative managing the problem situations in enterprises. Therefore, research in the paper is relied on Critical Systems Thinking as a conceptual framework for combined use of systems methodologies. Despite the limitations of combining the systems methodologies, methodologically appropriate combined use of systems methodologies enables improvement of managing the problem situations in contemporary enterprises.
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.</p
On equitorsion geodesic mappings of general affine connection spaces onto generalized Riemannian spaces
AbstractIn the papers MinΔiΔ (1973) [15], MinΔiΔ (1977) [16], several Ricci type identities are obtained by using non-symmetric affine connection. Four kinds of covariant derivatives appear in these identities.In the present work, we consider equitorsion geodesic mappings f of two spaces GAN and GRΒ―N, where GRΒ―N has a non-symmetric metric tensor, i.e. we study the case when GAN and GRΒ―N have the same torsion tensors at corresponding points. Such a mapping is called an equitorsion mapping MinΔiΔΒ (1997)Β [12], StankoviΔ etΒ al. (2010)Β [14], StankoviΔ (in press)Β [13].The existence of a mapping of such type implies the existence of a solution of the fundamental equations. We find several forms of these fundamental equations. Among these forms a particularly important form is system of partial differential equations of Cauchy type
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