G. G. Zabudsky, “Solving of the maxisum location problem on network with a restriction on transport costs”, Prikl. Diskr. Mat., 2023, no. 60, 120–127
2.
G. G. Zabudsky, N. S. Veremchuk, “Optimization of location of interconnected facilities on parallel lines with forbidden zones”, Diskretn. Anal. Issled. Oper., 28:4 (2021), 70–89
3.
Zabudskii, G.G., Keiner, “Optimal placement of rectangles on a plane with fixed objects”, Automation and Remote Control, 78:9 (2017), 1651-1661 (to appear) https://link.springer.com/content/pdf/10.1134
4.
G. G. Zabudskii, N. S. Veremchuk, “An algorithm for finding an approximate solution to the Weber problem on a line with forbidden gaps”, Journal of Applied and Industrial Mathematics, 10:1 (2016), 136-144 http://link.springer.com/article/10.1134
5.
G. G. Zabudskii, A. A. Koval', “Solving a maximin location problem on the plane with given accuracy”, Autom. Remote Control, 75:7 (2014), 1221–1230
6.
G. G. Zabudsky, N. S. Veremchuk, “Solving Weber Problem on Plane with Minimax Criterion and Forbidden Gaps”, IIGU Ser. Matematika, 9 (2014), 10–25
7.
G. G. Zabudskii, I. V. Amzin, “Algorithms of compact location for technological equipment on parallel lines”, Journal of Applied and Industrial Mathematics, 16:3 (2013), 86–94
8.
Zabudskii G.G., Lagzdin A.Yu., “DINAMIChESKOE PROGRAMMIROVANIE DLYa REShENIYa KVADRATIChNOI ZADAChI O NAZNAChENIYaKh NA DEREVE”, Avtomatika i telemekhanika, 2 (2012), 141-155
Zabudskii G.G., Amzin I.V., “SEARCH REGION CONTRACTION OF THE WEBER PROBLEM SOLUTION ON THE PLANE WITH RECTANGULAR FORBIDDEN ZONES”, Automation and Remote Control, 73:5 (2012) , 821-830 pp.
10.
G. G. Zabudskii, I. V. Amzin, “Search region contraction of the Weber problem solution on the plane with rectangular forbidden zones”, Autom. Remote Control, 73:5 (2012), 821–830
11.
Zabudskii G.G., Lagzdin A.Y., “POLYNOMIAL ALGORITHMS FOR SOLVING THE QUADRATIC ASSIGNMENT PROBLEM ON NETWORKS”, Computational Mathematics and Mathematical Physics, 50:11 (2010), 1948-1955
12.
Zabudsky, G. G., Lagzdin A. Y., “Some algorithms for the quadratic assignment problem on networks”, International Conference on Operations research (OR-2011) (Zurich, Switzerland, August 30 – September 2, 2011), SPRINGER-VERLAG BERLIN, 2011, 26
13.
Zabudskii G.G., Burlakov Yu.A., “OPTIMALNOE RAZMESchENIE OPASNOGO OB'EKTA NA PLOSKOSTI S UChETOM ZON RAZLIChNOGO VLIYaNIYa”, Omskii nauchnyi vestnik, 103 (2011) , 5 pp.
14.
Zabudskii G.G., Burlakov Yu.A., “OPTIMALNOE RAZMESchENIE OPASNOGO OB'EKTA NA PLOSKOSTI S UChETOM ZON RAZLIChNOGO VLIYaNIYa”, Omskii nauchnyi vestnik, 103 (2011) , 5 pp.
15.
G. G. Zabudskii, A. Yu. Lagzdin, “Polynomial algorithms for solving the quadratic assignment problem on networks”, Computational Mathematics and Mathematical Physics, 50:11 (2010), 1948–1955
Zabudskii G.G., Alekseenko I.V., “Primenenie metodov diskretnoi optimizatsii pri proektirovanii tekhnologicheskikh skhem protsessov shveinogo proizvodstva”, Sistemy upravleniya i informatsionnye tekhnologii, 2:32 (2008), 1 , 88–93 pp.
18.
Zabudskii G.G., Alekseenko I.V., “PRIMENENIE METODOV DISKRETNOI OPTIMIZATsII PRI PROEKTIROVANII TEKhNOLOGIChESKIKh SKhEM PROTsESSOV ShVEINOGO PROIZVODSTVA”, Sistemy upravleniya i informatsionnye tekhnologii, 2:32 (2008) , 5 pp.
19.
G. G. Zabudskii, “Model building and location problem solving in a plane with forbidden gaps”, Autom. Remote Control, 67:12 (2006), 1986–1990
20.
G. G. Zabudskii, “Optimal location of interconnected facilities on tree networks subject to distance constraints”, Computational Mathematics and Mathematical Physics, 46:3 (2006), 376–381
21.
Zabudskii G. G., “Computation of lower bounds on the network cost in location problems subject to distance constraints”, Computational Mathematics and Mathematical Physics, 46:2 (2006), 206–211 http://link.springer.com/article/10.1134/S0005117906120101
22.
Zabudskii G.G., “REShENIE ZADAChI VEBERA NA PLOSKOSTI S ZAPRESchENNYMI ZONAMI”, Vestnik Tyumenskogo gosudarstvennogo universiteta, 5 (2006) , 173-178 pp.
23.
Zabudsky, G.G.a , Filimonov, D.V., “Solving minimax location problems on networks with admissible maximal distances (Conference Paper)”, 12th IFAC Symposium on Information Control Problems in Manufacturing, INCOM 2006, and Associated Industrial Meetings: EMM'2006, BPM'2006, JT'2006;, Code 85871 IFAC Technical Committee 5.1 on Manufacturing Plant Control,TC 1.3 on Discrete Event Dynamic Systems,TC 2.4 on Optimal Control,TC 3.3 on Computers and Telematics,TC 4.1 on Components and Instruments (Saint - Etienne; France; 17 May 2006 through 19 May 2006), IFAC Proceedings Volumes (IFAC-PapersOnline) Volume 12, Issue PART 1,, http://www.mathnet.ru/personal/personpubs.phtml?option_lang=rus&wshow=personpubsedit#, 12, IFAC Technical Committee, 2006, 6
24.
G. G. Zabudskii, “On the complexity of the problem of arrangement on a line with constraints on minimum distances”, Russian Math. (Iz. VUZ), 49:12 (2005), 9–12
25.
G. G. Zabudskii, “A minimax planar location problem with forbidden zones: its solution algorithm”, Autom. Remote Control, 65:2 (2004), 241–247 http://link.springer.com/article/10.1023/B
26.
G. G. Zabudskii, D. V. Filimonov, “Solution of a discrete minimax location problem on networks”, Izv. Vyssh. Uchebn. Zaved. Mat., 2004, no. 5, 33–36
27.
G. G. Zabudskii, “On the problem of the linear ordering of vertices of parallel-sequential graphs”, Diskretn. Anal. Issled. Oper., 7:1 (2000), 61–64
28.
G. G. Zabudskii, “Algorithm for solving a problem on optimal linear ordering”, Russian Math. (Iz. VUZ), 41:12 (1997), 71–76
29.
Zabudsky G.G., “On the One-Dimensional Space Allocation Problem with Minimal Admissible Distances . CR,Prague, 1995.-P..”, Proceedings of the 3rd IFIP WG-7.6 Working Conference on Optimization-Based Computer Aided Modelling and Design, ITTA (CR,Prague, 1994), Praga, 1995, 448-452
30.
Zabudskii G. G., “O tselochislennoi postanovke odnoi zadachi razmescheniya ob'ektov na linii”, O tselochislennoi postanovke odnoi zadachi razmescheniya ob'ektov na linii, Upravlyaemye sistemy, 1990, no. 30, Tselochislennaya optimizatsiya ee prilozheniya, 1 , 35−45 pp.
31.
G. G. Zabudskii, “On an integer formulation of a problem on the arrangement of objects on a line”, Upravliaemie systemy, 1990, no. 30, 35–45
32.
G. G. Zabudskii, T. I. Keyner, “Optimizing the placement of rectangles on the plane with fixed facilities”, Autom. Remote Control, 78:9 (2017), 1651–1661
Thesis
33.
Zabudskii G.G., MODELI I METODY OPTIMALNOGO RAZMESchENIYa VZAIMOSVYaZANNYKh OB'EKTOV NA DISKRETNYKh MNOZhESTVAKh, avtoreferat dissertatsii na soiskanie uchenoi stepeni doktora fiziko-matematicheskikh nauk, IrGU, Irkutsk, 2006
Proceedings
34.
Zabudsky, G. G., Amzin I. V., “Optimal location of rectangles on parallel lines”, 21 International Symposium on Mathematical Programming (ISMP-2012) (Berlin, Germany, August 19 – 24, 2012.), Berlin Technische Universit Berlin, 2012, 149 http://ismp2012.mathopt.org/images/stories/bookofabstracts_onlineversion.pdf
35.
Zabudskii G.G., Koval F/ F/, “Optimizatsiya razmescheniya ob'ektov na ploskosti s maksiminnym kriteriem i minimalno dopustimymi rasstoyaniyami”, Intellektualizatsiya obrabotki informatsii: 9-ya mezhdunarodnaya konferentsiya. (Chernogoriya, g. Budva, 16–22 sentyabrya 2012 g.), Torus Press, Moskva, 2012, 257-259
Popular science or education materials
36.
Zabudskii G. G., Zadachi optimalnogo razmescheniya vzaimosvyazannykh ob'ektov, (uchebnoe posobie), OmGU, 2007. , 124 pp.
Miscellaneous
37.
Kolokolov A.A., Zabudskii G.G., Urubkova V.L., Zaozerskaya L.A., Eremeev A.V., Ilev V.P., RAZRABOTKA I ANALIZ EFFEKTIVNOSTI ALGORITMOV DISKRETNOI OPTIMIZATsII S ISPOLZOVANIEM REGULYaRNYKh RAZBIENII I OTSEChENII, otchet o NIR # 97-01-00771 (Rossiiskii fond fundamentalnykh issledovanii), 1997