О НЕПАРАМЕТРИЧЕСКИХ АЛГОРИТМАХ УПРАВЛЕНИЯ ГРУППАМИ ОБЪЕКТОВ

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Introduction. The paper is devoted to control of a parametric setting. Here ur uur uur group of static and dynamic objects in conditions of both ur us , xs , ms uur are temporal vectors ur parametric and nonparametric indeterminacy. The identiequal to xs = (x1, x2, …, xs), us = (u1, u2, …, us), ms = fication problem is one of the major ones in the control theory and is also closely related to the amount of infor- mation a researcher has at the stage of setting appropriate identification tasks. The control of a group of objects should be based on the following principles: - collection of a priori information and analysis of = (µ1, µ2, …, µs) respectively [3; 4]. Nonparametric models are commonly expressed by the following formula: xsl (u, m) = xliÕ ç c ÷Õ ç c ÷ ås n Fæ u j - u ji ö m F æ m j - m ji ö current information about the process under investigation; - mathematical formulation of the problem, assuming = i=1 j =1 è s ø j =1 è s ø , s n æ u j - u ji ö m æ m j - m ji ö Подпись: F F (1) certain assumptions; - synthesis of appropriate control algorithms. The classical control problem. At first the control åÕ i=1 j =1 ç è cs l =1, k ÷Õ ç ÷ ø j =1 è cs ø task is considered in the standard setting [1]. The task is viewed as a certain local object (fig. 1). and control algorithms will be expressed like this: usl (x, m) = s k æ x* - x ö m æ m - m ö ç c ÷ åu ÕFç j ji ÷ÕF ç j ji ÷ = i=1 li j =1 è s ø j =1 è cs ø , (2) s k æ x* - x ö m æ m - m ö ÷ åÕF ç j ji ÷ÕF ç j ji ÷ i=1 j =1 ç cs j =1 è cs ø Fig. 1. The general control scheme Рис. 1. Общая схема управления The fig. 1 shows the following designations: О is an object, Р is a regulator, u(t) = (u1(t), ..., un(t)) Ω(u) Ì Rn, x(t) = (x1(t), ..., xn(t)), Ω(x) Ì Rk, µ(t) = (µ1(t), ..., µn(t)), Ω(µ) Ì Rm, the input variable µ(t) is monitored, but not controlled, x*(t) is a setting impact. Random perturbations hu, hµ, hx are errors in the measurement of variables, and ξ(t) is the random perturbation affecting an object. The scheme has a local character [2]; further all random vari- ables will be omitted for simplicity. In identification of such objects the models can have the following appear- è ø l =1, n. Groups of objects. Further on groups of objects will be considered, in particular the simplest of them is a group of serial objects shown in fig. 2. For simplicity, random perturbations acting in channels of measurements and affecting an object are not presented any more, though they are surely present. ance: xˆ (u, µ) = F(u, µ, α) is in case of a parametric setuur uur uur Fig. 2. The scheme of serial objects ting, or xs(u, µ) = S(u, µ, us , xs , ms ) in case of a non- Рис. 2. Схема последовательных объектов Here О1, О2, ..., ОN objects are shown in a general view and each of them may contain the macro object shown in fig. 1, where ОПТ is the optimizer. X1*(t), x2*(t), ..., xN*(t), y*(t) are controlling variables for the optimizer. The purpose of the optimizer is to find the con- trolling impacts x1*(t), x2*(t), ..., xN*(t), y*(t), for achiev- ing z*(t) ≈ z(t). Z(t) is the most important output variable which characterizes the result of the work of the whole group of objects. It is important to note that the discreet- ness of measurements z(t), y(t) and x(t) can significantly differ. Therefore the accelerated forecast z(t) is often used in such systems; it is this value that creates the cost of the final product. The measurement discreetness z(t) is the greatest of all variables and can be equal to days, weeks, and sometimes reaches a month. The optimization task takes the following form: where W(·) function is an analog of Φ(·), and γvp coeffi- cients are a peculiar analog of the blur coefficients play- ing the role of weight factors in this case [5]. The parallel-serial scheme (fig. 3) of technological devices interaction which is often met at the enterprises of a discrete-continuous type is more complicated [6-8]. ì k ü R = M x íåai fi (m, u, x)ý, (3) Fig. 3. The parallel-serial objects scheme î i=1 þ where R is a utility function; fi(x,u), i = 1, k , is a set of quality criteria which are created on the basis of the model of the researched process xi = φ(µ,u), i = 1, k ; in their turn, φi, i = 1, k are continuous functions; αi is a weight factor which is defined by the decision-maker. The following restrictions were adopted in the utility function: M x {j(m, u, x)} ³ 0, j = 1, l, Рис. 3. Схема параллельно-последовательных объектов The following designations are accepted in the fig. 3: N is a number of process lines; all designations of techno- logical variables are excluded for simplicity, generally the emphasis is placed on communication of technological chains. Finally, an interdependent technological process illus- trated in fig. 4 is the most complicated one. M x {j(m, u, x)} = 0, j = 1, s, (4) where ξ is random perturbations with unknown probabil- ity density P(ξ). p Then the algorithm of computation uj , j = 1, m, Подпись: s have the following appearance: åuij atps u j = i=1 , p s åatps i =1 can (5) k æ f (m , u ) ö m æ f (m , mt ) ö Fig. 4. The scheme of interdependent objects atps = ÕF ç v t t ÷ÕF ç v t v ÷´ c c ç f v=1 ÷ ç m ÷ v=1 Рис. 4. Схема взаимосвязанных объектов è s ø è s ø v æ Y j (mt , ut ) ö l sng j j (mt , ut ) The most important here are technological communicY ´ÕF çç j =1 è s ÷÷Õ . cj ø j =1 s (6) cations between industrial facilities, which are not described separately in the paper. Any technological variables are In case of appearance of a decision-making problem, algorithms (5), (6) can be slightly changed. It is caused by the fact that in this case it is necessary to consider learn- ing selection limitation and as a result of it the absence of blur coefficients aspiration to zero with the increase of s. In this case it is more expedient to present the algorithm of decision-making (6) in the following form: not described as well [9]. Similar processes are also met in the active systems. Researchers have paid much attention to them lately. Active systems include processes with involvement of a man or a group of people in any field of activity. Typical features of such processes are incompleteness of a prior data, uncertainty, mutual connectivity, difficulty of formation of the agreed targets and methods of their achievement. atps = ÕW (gvp × fv (mt , ut ))ÕW (gvp × (mv - mt ))´ Incompleteness of a priori data results in the necessity to formulate these or those tasks of local character in a variv k m v=1 v v=1 l ety of essentially different settings, and their combining in a single system presents serious theoretical difficulties. ´ÕW (gvp × Y j (mt , ut ))Õsng j j (mt , ut ), (7) The general scheme of the active process is presented j =1 j =1 in fig. 5. Here λ(t) is a variable which may be known to the researcher, but it is hardly measureable, i. e. its control takes place rather seldom and the procedure of measure- ment is long and expensive. The variable Θ(t) is responsi- ble for the impact on an object of external environment. For organizational systems such impact can include any instructions, resolutions, orders, acts which undergo these or those changes eventually. ωi(t), i = 1, k , are the process variables monitored along the object length which show additional information about the process. Θt, µt, ut, ωi , x , y , z are measurements of the appropriate variables subjective factor in measurements. The control system of organizational processes is a hierarchical, multiple-loop system including a person as a necessary and major ele- ment; in this case the formation of a matrix of observa- tions is of some difficulty as it includes variables of dif- ferent types belonging to different scales. One more cor- nerstone in active systems control is ignorance about the process that leads to the mismatch between the assump- tions of the researched object and the object itself. It hap- pens because of a lack of a priori information, influence of arbitrary factors whose characteristics are not known t t t t which are carried out through different intervals of time. At present two fundamental differences between organizational systems and technical ones are revealed. The first difference is the existence of back couplings, control circuits, etc., built in the researched process from outside. The second difference is characterized by moni- toring aids or measurement of the appropriate variables, as one of elements of gauges of some input-output vari- ables characterizing a process status is a person or a group of experts. The estimates of some variables are impossible without involvement of a person; therefore there will be a to the researcher, imperfection of monitoring aids of vari- ables, and not enough representativeness of sampling for measurements [10-13]. An object group which is widespread at thermal power plants will be considered as an example (fig. 6). It should be noted that objects О1, О2, ..., ОN are boiler units, T1, T2, ..., TL are turbines which can be in different statuses up to switch-off in production. It natu- rally significantly complicates the control task of such an interdependent complex. Similar systems are at a devel- opment stage at present time [14; 15]. Fig. 5. The general scheme of a multivariate active process Рис. 5. Общая схема многомерного активного процесса Рис. 6. The general scheme of a power unit of a thermal power plant. Рис. 6. Общая схема энергоблока теплоэлектростанции It seems reasonable to provide some data on mathe- matical simulation by concentrating metallurgical conver- sion NMMC which passed numerous tests and was im- plemented in production. The fragment of a similar tech- nological chain is presented in fig. 4. In this case the ini- tial variables were technological parameters of the ores extracted in the territory of the Norilsk industrial region (Oktyabrskii, Komsomolskii, Medvezhii ruchey and oth- ers) as well as the amount of furnace charge, sandstone, concentrate, waste, matte and others and contents of dif- ferent elements in them. The similar system which was called “Metal” system was implemented at Norilsk MMC with considerable economic effect. K-, H-, T-models which are included in “Metal” represented a system of more than 330 ratios of parametric and non-parametric types [10]. Conclusion. The paper deals with the problem of identification and control of a group of serial, parallel and parallel-serial type of technological objects sequences. The special features of the relationships between objects and process variables in each case are defined. Algo- rithms of identification and control of a group of objects, as well as the decision-making algorithm are given in a general form. Examples of technological processes representing groups of local objects are described.

Об авторах

М. Е. Корнет

Сибирский государственный университет науки и технологий имени академика М. Ф. Решетнева

Email: marya.kornet@gmail.com
Российская Федерация, 660037 г. Красноярск, просп. им. газ. «Красноярский рабочий», 31

А. С. Орлова

Сибирский государственный университет науки и технологий имени академика М. Ф. Решетнева

Российская Федерация, 660037 г. Красноярск, просп. им. газ. «Красноярский рабочий», 31

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