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22.05.2018 . ДЭ |
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https://www.gazeta.ru/business/2018/05/22/11760139.shtml .– ( |
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20.01.19) |
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ekonomiki-sovremennyh-promyshlennyh-kompleksov/ 92.pdf . – ( |
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05.02.19) |
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"И |
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""", 2015. – |
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5. |
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LТtrОs, 2017. – 672 . |
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103
APPLICATION OF THE METHODS OF ANTI-SIPATIVE MANAGEMENT AT THE ENTERPRISE, ITS PRINCIPLES AND DEPENDENCE ON FACTORS OF THE
INTERNAL AND EXTERNAL ENVIRONMENT
T.A. Sviridova, U.V. Kuznetsova
Sviridova Tatyana Anatolievna*, Voronezh State Technical University, Senior Lecturer at the Department of Construction Management Russia, Voronezh, e-mail: cviridova81@mail.ru,
tel.: +7-473-2-76-40-07
Kuznetsova UlyanaValeryevna., Voronezh State Technical University, Student of the Department of Construction Management Russia, Voronezh, e-mail: muurul@mail.ru, tel .: + 7-908-133-11-98
Abstract. This article discusses the description of factors of the internal and external environment of an enterprise that influence the anti-sipative control system, identifying its stages and methods for predicting changes and shaping the future of a company, community, or firm.
Key words: antisipative control, principles, crisis state, influence of factors.
References
1.Petrova E. This is a disaster: the business does not believe in a bright future: from
05.22.2018. [Electronic resource] - Access mode: https://www.gazeta.ru/business/2018/05/22/11760139.shtml .– (Request date 01/20/19)
2.Dobrovinsky A.P. Crisis management organization: a tutorial / A.P. Dobrovinsky; National Research Tomsk Polytechnic University. - Tomsk: Publishing house of Tomsk Polytechnic University, 2013. - 240 p.
3.Averina T.A., Kuznetsova, U.V. Features of personnel management in the case of antisipative management. - Text: Voronezh State Technical University [Electronic resource] - Access mode: http://repo.ssau.ru/bitstream/Problemy-ekonomiki-sovremennyh-promyshlennyh- kompleksov/ 92.pdf. - (Date of treatment 02/02/19)
4.Ugryumova N.V., Blinov A.O. Organization Theory and Organizational Behavior: A
Textbook for High Schools. The standard of the third generation "Publishing House" "Peter" "", 2015. – 288 p.
5.Natalya Sidorova, Oksana Bagomedova, Oksana Boykova, A. Lukhmanova Diagnostics of the applicant Liters, 2017. - 672 p.
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D1. |
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(1), |
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m |
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j, |
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D.
,
D1 D2.
106
:
(1)
(2)
(3)
pi,
j,
l
∑dik . k =1
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m,
x∑dnk ,l
k =1
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j,
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F2(n). |
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F1(n) |
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n , dn , |
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δ , |
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F1(η) = max{F1(n)}. |
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δ . |
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pm pk: |
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F1(m) > F1(k) |
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F2 (m) < F2 (k) |
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F1(m) < F1(k) |
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F2 (m) > F2 (k). |
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F1(n) |
F2(n) |
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а |
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pk –
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F1(m) > F1(k), F2 (m) < F2 (k). |
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l = μ , |
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l = ξ . |
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1. |
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μ < ξ , |
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μ < ξ . |
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δ = δ2 = F1(η) |
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F1(η) |
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F1(m) ≤ δ2 F1(η) |
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F1(k) = δ2 , |
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μ > ξ , . . |
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ψ1 |
ψ2 |
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F1 |
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(5) pm |
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S1. |
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δ = δ2 < F1(m) |
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pk, |
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F1, |
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D1 |
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δ . |
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2. |
pm |
pk |
F1(m) = F1(k), F2 (m) > F2 (k), |
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1 |
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D1. |
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108 |
3. |
pm |
pk |
pk. |
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pk, |
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4. |
pm |
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[δk , δk+1),
,
δ1
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k, k+1
F1, |
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δ2 = min |
δk , |
, |
, |
d < δ2 |
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ч |
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,
,
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pm
F1(m) = F1(k),
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δ .
[0,∞ )
δ = δk .
1, |
D1 |
δ = 0
δk ,
.
[0, δ2 )
,
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Pi
F1
,
ч
F1(m) ≥ F1(k), F2 (m) > F2 (k),
F2 (m) = F2 (k),
δ
δ , |
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, |
F1(n) |
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S0 |
D1, |
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F1. |
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δ , |
S1. |
δ = d , 0 ≤ d < δ2 , |
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δ2 |
min δk , |
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1. |
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. ., |
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, |
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// |
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. №3.1(53). 2013. - C. - 116-119. |
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. . |
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2. |
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Д |
Ж/ |
. |
., К |
. .// |
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. . |
. № 3.2 (17). 2015. - C. 227-232. |
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3. |
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Д |
Ж/ |
. |
., |
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. ., К |
. .// |
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. №4(62), 2015. – |
. 31-33. |
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109