Èçáðàííûå ïóáëèêàöèè

English

1. Krot, À.Ì. A Statistical Theory of Gravitating Body Formation in Extrasolar Systems/ A.M. Krot. – Cambridge, Newcastle upon Tyne, etc.: Cambridge Scholars Publishing, 2021. – 817p.
2. Êðîò, À. Ì. Ñòàòèñòè÷åñêàÿ òåîðèÿ ôîðìèðîâàíèÿ ãðàâèòèðóþùèõ êîñìîãîíè÷åñêèõ òåë. Ìí: Áåëàðóñ. íàâóêà, 2012. – 448 c.
3. Êðîò, À. Ì., Ìèíåðâèíà Å.Á. Áûñòðûå àëãîðèòìû è ïðîãðàììû öèôðîâîé ñïåêòðàëüíîé îáðàáîòêè ñèãíàëîâ è èçîáðàæåíèé. Ìí.: Íàâóêà i òýõíiêà, 1995. – 407 c.
4. Êðîò, À. Ì. Äèñêðåòíûå ìîäåëè äèíàìè÷åñêèõ ñèñòåì íà îñíîâå ïîëèíîìèàëüíîé àëãåáðû. Ìí.: Íàâóêà i òýõíiêà, 1990. – 312 c.
5. Linkevich A. D. Mathematical methods and models for investigation of neurodynamical mechanisms of cognitive processes / A. D. Linkevich; scientific editor prof. A. M. Krot. – Minsk, Novopolotsk, 2001. – 203 c.

Âûáðàííûå ñòàòüè

1. Krot À.Ì. On the wave solutions of the generalized nonlinear Schrodinger-like equation of formation of a cosmogonical body. In the book “Understanding the Schrodinger Equation: Some [Non]Linear Perspectives”, Chapter 4. –  New York: Nova Science Publishers, 2020, pp. 93-133.
   

2. Krot A.M. "The generalized nonlinear Schrödinger-like equation of cosmogonical body forming: Justification and determination of its particular solutions". Partial Differential Equations in Applied Mathematics., 2022. –  Vol. 5 (June), 100376. doi: https://doi.org/10.1016/j.padiff.2022.100376)
   

3. Krot A.M. "On the Analytical Models of Protoplanetary Formation in Extrasolar Systems". Space: Science & Technology. –  2022. –  Article ID 9862389.
   

4. Êðîò À.Ì., Ñû÷åâ Â.À. "Îá îñîáåííîñòÿõ íåëèíåéíîãî àíàëèçà äèíàìè÷åñêèõ ñèñòåì íà îñíîâå ìåòîäà ìàòðè÷íîé äåêîìïîçèöèè". Âåñ. Íàö. àêàä. íàâóê Áåëàðóñ³. Ñåð. ô³ç.-ìàò. íàâóê. – 2022. – Ò. 58, ¹ 2. – Ñ. 190-207. doi: https://doi.org/10.29235/1561-2430-2022-58-2-190-207).
   

5. Krot, À.Ì. On the wave solutions of the generalized nonlinear Schrodinger-like equation of formation of a cosmogonical body / À.Ì. Krot // In the book “Understanding the Schrodinger Equation: Some [Non]Linear Perspectives”, Ch. 4. New York: Nova Science Publishers, 2020, pp. 93-133.
   

6. Krot, À.Ì. Investigation of chaotic dynamics of Chua’s circuit implemented by means of the matrix decomposition method / À.Ì. Krot, U.A. Sychou // Chaotic Modeling and Simulation (CMSIM). – 2020. – No.1. – P. 55-73.
   

7. Êðîò, À. Ì. Ìîäåëèðîâàíèå è íåëèíåéíûé àíàëèç õàîòè÷åñêèõ âîëíîâûõ ïðîöåññîâ â ýëåêòðîõèìè÷åñêè àêòèâíûõ íåéðîíîâûõ ñðåäàõ íà îñíîâå ìàòðè÷íîé äåêîìïîçèöèè / À. Ì. Êðîò, Ñ. È. Ïàâëîâ // Èíôîðìàòèêà. – 2020. − Ò. 17, ¹ 3. – Ñ. 7–24. https://doi.org/10.37661/1816-0301-2020-17-3-7-24
   

8. Êðîò, À.Ì. Ýâîëþöèîííàÿ ìîäåëü õàîòè÷åñêèõ âîëíîâûõ ïðîöåññîâ â ñëîæíûõ äèíàìè÷åñêèõ ñèñòåìàõ íà îñíîâå òåîðèè ìàòðè÷íîé äåêîìïîçèöèè / À. Ì. Êðîò //Äîï. Íàö. Àêàä. íàóê Óêðàiíè (Äîêëàäû ÍÀÍ Óêðàèíû). – 2019. – ¹ 9. – Ñ. 12-19.
   

9. Krot, A.M. Analysis of dynamical states of cosmogonical body formation based on the generalized nonlinear Schrodinger-like equation/ A.M. Krot // Chaotic Modeling and Simulation (CMSIM). – 2019. – Vol. 8, No.2 (April issue). – P. 95-107.
   

10. Êðîò, À.Ì. Ñïåêòðàëüíûé àíàëèç õàîòè÷åñêèõ êîëåáàíèé â èìèòàöèîííîé ìîäåëè ñõåìû ×æóà, ðàçðàáîòàííîé íà îñíîâå ìàòðè÷íîé äåêîìïîçèöèè / À. Ì. Êðîò, Â. À. Ñû÷åâ // Èíôîðìàòèêà. – 2019. − Ò. 16, ¹ 1. – Ñ. 7-23.
    

11. Êðîò, À.Ì. Àëãîðèòì ðàñ÷åòà òðàåêòîðèé ýëåêòðîíîâ â ýëåêòðîñòàòè÷åñêîì è ìàãíèòîñòàòè÷åñêîì ïîëÿõ ýëåêòðîííî-îïòè÷åñêèõ ñèñòåì/ À.Ì. Êðîò, Î.Í. Ïåòðîâè÷, È.Ñ. Ðóñåöêèé //Âåñ. Íàö. àêàä. íàâóê Áåëàðóñ³. Ñåð. ô³ç.-ìàò. íàâóê. – 2019. −  Ò. 55, ¹ 4. – Ñ. 435-444.
    

12. Êðîò, À.Ì. Àíàëèç õàîòè÷åñêèõ ðåæèìîâ ôóíêöèîíèðîâàíèÿ ñõåìû ×æóà ñ ãëàäêîé íåëèíåéíîñòüþ íà îñíîâå ìåòîäà ìàòðè÷íîé äåêîìïîçèöèè / À.Ì. Êðîò, Â.À. Ñû÷¸â // Âåñö³ Íàö. àêàä. íàâóê Áåëàðóñ³. Ñåð. ô³ç.-òýõí. íàâóê. – 2018. – Ò.63, ¹4. – Ñ.501-512.
    

13. Krot, A.M. An explanation of stability of extrasolar systems based on the universal stellar law/ A.M. Krot // Chaotic Modeling and Simulation (CMSIM). – 2018. – Vol. 7, ¹ 4. – P. 513-529.
    

14. Krot, A.M. Derivation and investigation of the generalized nonlinear Schrödinger equation of cosmogonical body forming/ A.M. Krot // In the book “Mathematical and Numerical Aspects of Dynamical System Analysis”/ Ed. by J. Awrejcewicz et al. – Łódź: ARSA Druk i Reklama, 2017, P. 277-288.
    

15. Krot, A.M. Development of the generalized nonlinear Schrödinger equation of rotating cosmogonical body formation/ A.M. Krot // In the book "Complex Systems: Theory and Applications“, Chapter 3. – New York: Nova Science Publishers, 2017, pp.49-94.  
    

16. Krot, A. M. On the universal stellar law for extrasolar systems / A. M. Krot // Planetary and Space Science – 2014. – Vol. 101C. – P. 12-26. (Elsevier Publ. Co., èìïàêò-ôàêòîð æóðíàëà –1, 942).
    

17. Krot, A. M. A nonlinear Schrödinger-like equation in the statistical theory of formation of cosmological bodies / A. M. Krot // Chapter in the book “Chaos and Complexity Research Compendium” / USA – New York: Nova Science Publishers, 2013. – Vol. 3. – P. 93-112.

18. Krot, A.M. Nonlinear analysis of the Hopfield network dynamical states using matrix decomposition theory / A.M. Krot, R.A. Prakapovich // Chaotic modeling and simulation – 2013. – Vol. 1. – P. 133-146.

19. Krot, A. M. A nonlinear Schrödinger-like equation in the statistical theory of spheroidal bodies / A. M. Krot // Chaotic Modeling and Simulation (CMSIM) – 2012. – Vol. 2, No. 1. – P. 67-80.

20. Krot, A.M. A Models of forming planets and distribution of planetary distances and orbits in the solar system based on the statistical theory of spheroidal bodies / A.M. Krot // Chapter in the book “Solar system: structure, formation and exploration”. New York: Nova science publishers, 2012. – P 201-264. 

21. Êðîò, À.Ì. Íåëèíåéíûé àíàëèç äèíàìè÷åñêèõ ñîñòîÿíèé èñêóññòâåííîé íåéðîííîé ñåòè Õîïôèëäà íà îñíîâå ìàòðè÷íîé äåêîìïîçèöèè / À.Ì. Êðîò, Ã.À. Ïðîêîïîâè÷ // Âåñ. Íàö. àêàä. íàâóê Áåëàðóñi. Ñåð. ôiç.-òýõí. íàâóê. – 2012. – ¹ 3. – C. 98-107.

22. Krot, A. M. A Models of forming planets and distribution of planetary distances and orbits in the solar system based on the statistical theory of spheroidal bodies / A. M. Krot // Chapter in the book “Solar system: structure, formation and exploration” / USA – New York: Nova science publishers, 2012. – P. 201-264. 

23. Krot, A.M. Bifurcation analysis of attractors of complex systems based on matrix decomposition theory. / À.Ì. Krot // Proc. of IEEE Intern. Conf. on Industrial Engineering and Management (IEEE IEM 2011), Zhengzhou, China, August 12-14, 2011.

24. Krot, A. M. A quantum mechanical approach to description of initial gravitational interactions based on the statistical theory of spheroidal bodies / A. M. Krot // Nonlinear Sci. Lett. A. – 2010. – Vol. 1, No. 4 – P. 329-369.

25. Krot, A.M. On the principal difficulties and ways to their solution in the theory of gravitational condensation of infinitely distributed dust substance / À.Ì. Krot // Proc. of the 2007 IAG General Assembly in the book "Observing our Changing Earth", Vol.133 (Ed. by M.G. Sideris), Springer: Berlin, Heidelberg, 2009, pp. 283-292.

26. Krot, A. M. A statistical approach to investigate the formation of the solar system / A. M. Krot // Chaos, Solitons and Fractals – 2009. – Vol. 41, No. 3. – P. 1481-1500. (Elsevier Publ. Co., èìïàêò-ôàêòîð æóðíàëà – 3,12).

27. Krot, A. M. The development of matrix decomposition theory for nonlinear analysis of chaotic attractors of complex systems and signals / A. M. Krot // Proc. of IEEE 16^th International Conference on Digital Signal Processing (DSP 2009), July 5-7 / Greece – Thira, Santorini: 2009.

28. Dailyudenko, V. F. The spatio-temporal structure of nonlinear response of an active media in a self-organization system / V. F. Dailyudenko // Nonlinear Phenomena in Complex Systems – 2009. – Vol.12, No. 3. – P. 251 – 266.

29. Dailyudenko, V. F. Topological considerations of an attractor based on temporal locality along its phase trajectories / V. F. Dailyudenko  // Chaos, Solitons and Fractals – 2008. – Vol. 37 – Issue 3 – P. 876 - 893.

30. Krot, A. M. The theory of matrix decomposition for development of nonlinear analysis of chaotic attractors of complex systems / A.M.Krot // Chaotic Modeling and Simulation International Conference (CHAOS 2008), Chania, Crete, Greece, June 3-6. – Greece, 2008. – p. 101.

31. Krot, A. M. The development of model for boundary layers past a concave wall with usage of nonlinear dynamics methods / A. M. Krot, V. A. Baldin. H. B. Minervina // Advances in Space Research – 2006. – Vol. 37, No. 3. – P. 501-506. (Elsevier Publ. Co., èìïàêò-ôàêòîð æóðíàëà – 1, 409).

32. Dailyudenko, V. F. The integrated and local estimations of instability for a class of autonomous delay systems / V. F. Dailyudenko // Chaos, Solitons and Fractals – 2006. – Vol. 30, No. 3. – P. 759-768.
    

33. Dailyudenko, V. F. Characteristic exponents for vector maps from the product of functional matrices and successive  orthogonalization of matrix sequences / V.F. Dailyudenko // Nonlinear Phenomena in Complex Systems – 2004. – Vol.7, No. 1. – 43 - 51 pp.

34. Dailyudenko, V. F. Lyapunov exponents for complex systems with delayed feedback / V. F. Dailyudenko // Chaos, Solitons and Fractals – 2003. – Vol. 17, No. 2-3. – 473 – 484 pp.

35. Dailyudenko, V. F. Reduced fractal analysis of the multidimensional attractor reconstructed from chaotic time series / V. F. Dailyudenko // Computational Science and Its Applications – ICCSA 2003, Montreal, Canada, May, 2003 / Lecture Notes in Computer Sciences. – Part 1, vol. 2667, Springer – 2003. – 921-926 pp.

36. Krot, A. M. Development of gravidynamical equations for a weakly gravitating body in the vicinity of absolute zero temperature / A. M. Krot // Proc. of 53^rd Intern. Astronautical Congress (IAC) - The 2^nd World Space Congress (WSC-2002), October 10-19 / USA – Houston, Texas: 2002. – P. 1-11.

37. Krot, A. M. Application of expansion into matrix series to analysis of attractors of complex nonlinear dynamical systems / A. M Krot // Proc. of 14^th Intern. Conference on Digital Signal Processing (DSP’2002), July 1-3 / Greece – Santorini: 2002. – Vol. 2. – P. 959-962.

38. Krot, A. M. Analysis of nonlinear signals based on estimating minimal attractor embedding dimension / A. M. Krot, H. B. Minervina // Proc. of 14^th Intern. Conference on Digital Signal Processing (DSP’2002), July 1-3 / Greece – Santorini: 2002. – Vol. 2. – P. 1001-1004.

39. Krot, A. M. New approach to speech signal recognition using nonlinear signal decomposition by measuring Wiener kernels / A. M. Krot, P. P. Tkachova, B. A. Goncharov // Smart Engineering System Design – 2002. – Vol. 4 – P. 265-276.

40. Krot, A. M. Minimal attractor embedding estimation based on matrix decomposition for analysis of dynamical systems / A. M. Krot, H. B. Minervina // Nonlinear Phenomena in Complex Systems – 2002. – Vol. 5, No. 2. – P.161-172

41. Krot, A. M. On algorithm for phoneme speech recognition using nonlinear signal decomposition / A. M. Krot, P. P. Tkachova, H. B. Minervina // Proc. of the 8^th IEEE Intern. Conference on Electronics, Circuits and Systems (ICECS 2001), 2-5 September / Malta:  2001. – P. 1251-1254. 

42. Krot, A. M. Matrix decompositions of vector functions and shift operators on the trajectories of a nonlinear dynamical system / A. M. Krot // Nonlinear Phenomena in Complex Systems – 2001. – Vol.  4, No. 2. – P. 106-115.

43. Krot, A. M. The decomposition of vector functions in vector-matrix series into state-space of nonlinear dynamic system / A. M. Krot // Proc. of X European Signal Processing Conf. (EUSIPCO-2000), 5-8 September / Finland – Tampere: 2000. – Vol. 3. – P. 2453-2456.

44. Krot, A. M. On approach to speech recognition using nonlinear signal decomposition into Volterra-Wiener functional series / A. M. Krot, P. P. Tkachova // Proc. of the 10^th Mediterranean Electrotechnical Conference (Melecon 2000), May 29-31 / Cyprus – 2000. – Vol. 2. – P. 522-525.

45. Krot, A. M. Statistical description of gravitational field: a new approach / A. M. Krot // Proc. of SPIE 14th Annual Intern. Symposium on Aerospace / Defense Sensing, Simulation, and Controls (AeroSense), 24-28 April / USA – Orlando, Florida:  2000. – Vol. 4038. – P. 1318-1329.

46. Krot, A. M. The development of fast procedures for optimal discrete control problems based on Diophantine equations / A. M. Krot // Proc. of the Artificial Neural Networks in Engineering Conference (ANNIE'99) "Smart engineering system design", 7-10 November / USA – St. Louis, Missouri, New York: ASME Press, 1999. – Vol. 9. – P. 645-651.

47. Krot, A. M. Minimal attractor embedding dimension for discrete dynamic system using state-space method: theoretical ground / A. M. Krot, H. B. Minervina // Proc. of the 6^th IEEE Int. Conf. on Electronics, Circuits and Systems, (ICECS'99), 5-8 Sept. / Cyprus – Pafos: 1999. – Vol. 2. – P. 941-944.

48. Èíòåëëåêòóàëüíûå ñèñòåìû: ñá. íàó÷. òð. / ÍÀÍ Áåëàðóñè, Èíñòèòóò òåõíè÷åñêîé êèáåðíåòèêè; ðåäêîë.: À. Ì. Êðîò (íàó÷. ðåä.) [è äð.]. – Ìèíñê, 1998. – 203 ñ.

49. Krot, A. M. Identification of Discrete 1-D and 2-D input nonlinear systems for digital signal and image processing / A. M. Krot, M. A. Shcherbakov // Proc. of 6^th IEEE Intern. Workshop on Intelligent Signal Processing and Communication Systems, 4-6 November / Australia – Melbourne: 1998. – P. 881-885. 

50. Krot, A. M. Eigen transforms over finite rings in filter bank structures / A. M. Krot, V. O. Kudryavtsev // Proc. of 6^th IEEE Intern. Workshop on Intelligent Signal Processing and Communication Systems, 4-6 November / Australia – Melbourne: 1998. – P. 877-880.

51. Krot, A. M. Fast algorithms for reduction a modulo polynomial and Vandermonde transform using FFT / A. M. Krot, H. B. Minervina // Proc. of IX European Signal Processing Conference, (EUSIPCO-98), 8-11 September / Greece – Rhodes: – 1998. – Vol. 1. – P. 173-176.  

52. Krot, A. M. Algorithms and the multiplicative complexity of the reduction a modulo arbitrary polynomial, generalized K_N-convolution and fast Vandermonde transform / A. M. Krot // Proc. of 13th Intern. Conf. on Digital Signal Proc. (DSP'97) / Greece — Santorini: 1997. — Vol. 2. — P. 893-897.

53. Êðîò, À. Ì. Îïðåäåëåíèå ìèíèìàëüíîé ðàçìåðíîñòè âëîæåíèÿ õàîòè÷åñêîãî àòòðàêòîðà íà îñíîâå ëîêàëüíî-òîïîëîãè÷åñêîãî àíàëèçà ôàçîâûõ òðàåêòîðèé / À. Ì. Êðîò, Â. Ô. Äàéëþäåíêî // Æóðíàë âû÷èñëèòåëüíîé ìàòåìàòèêè è ìàòåìàòè÷åñêîé ôèçèêè: ÌÀÈÊ Íàóêà. –1997. – Ò. 37, ¹ 3. – Ñ. 315-324. (Ïåðåèçäàíà â Âåëèêîáðèòàíèè: Krot, A. M. Calculation of the minimal embedding dimension of a chaotic attractor on the basis of local topological analysis of phase trajectories / A. M. Krot, V. F. Dailyudenko // Comput. Maths Math. Phys. – 1997. – Vol. 37, No. 3. – P. 311-319. (Pergamon Press, èìïàêò-ôàêòîð æóðíàëà – 0,585)).

54. Êðîò, À. Ì. Ñèíòåç áûñòðûõ àëãîðèòìîâ äëÿ ðåøåíèÿ çàäà÷ îïòèìàëüíîãî äèñêðåòíîãî óïðàâëåíèÿ ìåòîäîì ïîëèíîìèàëüíûõ óðàâíåíèé / À. Ì. Êðîò // Àâòîìàòèêà è òåëåìåõàíèêà. –1996. – ¹ 8. – Ñ. 22-35. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Synthesizing fast algorithms for optimal discrete control by the method of polynomial equations / A. M. Krot // Automation and Remote Control. – 1996. – Vol. 57, No. 8. – P. 1079-1090. (Plenum Publ. Co., èìïàêò-ôàêòîð æóðíàëà – 0,265)).

55. Êðîò, À. Ì. Ëîêàëüíî-òîïîëîãè÷åñêèé ìåòîä îïðåäåëåíèÿ ìèíèìàëüíîé ðàçìåðíîñòè âëîæåíèÿ õàîòè÷åñêîãî àòòðàêòîðà / À. Ì. Êðîò, Â. Ô. Äàéëþäåíêî // Äîêëàäû ÀÍ Áåëàðóñè. –1996. – Ò. 40, ¹ 3. – Ñ. 70-75.

56. Êðîò, À. Ì. Áûñòðûé àëãîðèòì âû÷èñëåíèÿ îáðàòíîé ñâåðòêè äëÿ âîññòàíîâëåíèÿ ñèãíàëîâ è èçîáðàæåíèé / À. Ì. Êðîò, À. Ò. Êàñüêî, Å. Á. Ìèíåðâèíà // Æóðíàë âû÷èñë. ìàòåì. è ìàòåì. ôèçèêè. –1996. – Ò. 36, ¹ 2. – Ñ. 164-175. (Ïåðåèçäàíà â Âåëèêîáðèòàíèè: Krot, A. M. A fast algorithm for calculating the inverse convolution for signal and image reconstruction / A. M. Krot, A. T. Kasʼko, H. B. Minervina // Comput. Maths Math. Phys. – 1996. – Vol. 36, No. 2. – P. 269-277. (Pergamon Press, èìïàêò-ôàêòîð æóðíàëà – 0,585)).

57. Krot, A. M. New fast algorithms for filtering and interpolating digital signals and images / A. M. Krot // Pattern Recognition and Image Analysis (Advances in Mathematical Theory and Applications). – 1993. – Vol. 3, No. 2. – P. 126-136. (Interperiodica Publ.).

58. Krot, A. M. Comment: Conjugate pair fast Fourier transform / A. M. Krot, H. B. Minervina // Electronics Letters: – 1992. – Vol. 28, No. 10. – P. 1143-1144. (IEE, èìïàêò-ôàêòîð æóðíàëà – 1,152).

59. Êðîò, À. Ì. Î âû÷èñëèòåëüíîé ñëîæíîñòè îáîáùåííûõ Ê_N-ñâåðòîê è àëãîðèòìîâ áûñòðîãî ïðåîáðàçîâàíèÿ Âàíäåðìîíäà / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Æóðíàë âû÷èñëèòåëüíîé ìàòåìàòèêè è ìàòåìàòè÷åñêîé ôèçèêè. –1990. – Ò. 30, ¹ 11. – Ñ. 1625-1637. (Ïåðåèçäàíà â Âåëèêîáðèòàíèè: Krot, A. M. Computational complexity of generalized K_N-convolutions and the fast Vandermonde transform algorithm / A. M. Krot // Comput. Maths Math. Phys. – 1990. – Vol. 30, No. 6. – P. 17-26. (Pergamon Press, èìïàêò-ôàêòîð æóðíàëà – 0, 585)).

60. Êðîò, À. Ì. Î ìóëüòèïëèêàòèâíîé ñëîæíîñòè áèëèíåéíûõ ôîðì, äëÿ êîòîðûõ ïðåîáðàçîâàíèå Âàíäåðìîíäà ÿâëÿåòñÿ ñîáñòâåííûì / À. Ì. Êðîò // Äîêëàäû ÀÍ ÑÑÑÐ. –1990. – Ò. 314, ¹ 6. – Ñ. 1312-1315. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. On the multiplicative complexity of bilinear forms for which the Vandermonde transformation is an eigentransformation / A. M. Krot // Sov. Math. Dokl. – 1991. – Vol. 42, No. 2. – P. 646-650. (Èìïàêò-ôàêòîð æóðíàëà – 0, 307)).

61. Êðîò, À. Ì. Î êëàññå äèñêðåòíûõ êâàçèñòàöèîíàðíûõ ëèíåéíûõ äèíàìè÷åñêèõ ñèñòåì / À. Ì. Êðîò // Äîêëàäû ÀÍ ÑÑÑÐ. –1990. – Ò. 313, ¹6. – Ñ. 1376-1380. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. On a class of discrete quasistationary linear dynamic systems / A. M. Krot // Sov. Phys. Dokl. – 1990. – Vol. 35, No. 8. – P. 711-713. (Èìïàêò-ôàêòîð æóðíàëà – 0, 473)).

62. Êðîò, À. Ì. Åäèíûé ïîäõîä ê âû÷èñëåíèþ ñâåðòîê è äèñêðåòíîãî ïðåîáðàçîâàíèÿ Ôóðüå íà îñíîâå ñîáñòâåííûõ ïðåîáðàçîâàíèé â ðàöèîíàëüíîì è äåéñòâèòåëüíîì ïîëÿõ / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. –1990. – Ò. 35, ¹ 4. – Ñ. 805-815. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. A Unified approach to calculating convolutions and the discrete Fourier transform based on proper transforms in rational and real fields / A. M. Krot // Soviet J. Comm. Tech. Electron.: – 1991. – No. 2. – P. 26-34. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,359)).

63. Êðîò, À. Ì. Ñèíòåç áûñòðûõ àëãîðèòìîâ ñîáñòâåííûõ ïðåîáðàçîâàíèé äèñêðåòíûõ ñâåðòîê â ðàöèîíàëüíîì è äåéñòâèòåëüíîì ïîëÿõ / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. –1990. – Ò. 35, ¹ 2. – Ñ. 372-381. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Synthesis of fast proper transformation algorithms for discrete convolution in rational and real fields / A. M. Krot // Soviet J. Comm. Tech. Electron. – 1990. – No. 15. – P. 16-25. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,359)).

64. Êðîò, À. Ì. Ñèíòåç àëãîðèòìîâ ÁÏÔ ïî ðàñùåïëÿåìîìó îñíîâàíèþ äëÿ äåéñòâèòåëüíûõ è ýðìèòîâî-ñèììåòðè÷íûõ ïîñëåäîâàòåëüíîñòåé / À. Ì. Êðîò, Å. Á. Ìèíåðâèíà // Èçâ. ÂÓÇîâ ÑÑÑÐ. Ðàäèîýëåêòðîíèêà. – 1989. – Ò.32, ¹ 12. – Ñ. 12-17. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Synthesis of fast-Fourier-transform (FFT) split-radix algorithms for real-valued and Hermite-symmetrical series / A. M. Krot, H. B. Minervina // Radioelectronics and Communication Systems. – 1989. – Vol. 32, No. 12. – P. 10-15. (Allerton Press, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,137)).

65. Êðîò, À. Ì. Ìåòîä ñîáñòâåííûõ ïðåîáðàçîâàíèé â ðàçëè÷íûõ ïîëÿõ äëÿ âû÷èñëåíèÿ öèêëè÷åñêèõ ñâåðòîê è äèñêðåòíîãî ïðåîáðàçîâàíèÿ Ôóðüå / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Æóðíàë âû÷èñëèòåëüíîé ìàòåìàòèêè è ìàòåìàòè÷åñêîé ôèçèêè. – 1989. – Ò. 29, ¹ 5. – Ñ. 675-692. (Ïåðåèçäàíà â Âåëèêîáðèòàíèè: Krot, A. M. The method of eigentransforms in differetnt fields for computing cyclic convolution and discrete Fourier transforms / A. M. Krot // Comput. Maths Math. Phys. – 1989. – Vol. 29, No. 3. – P. 23-34. (Pergamon Press, èìïàêò-ôàêòîð æóðíàëà – 0,585)).

66. Êðîò, À. Ì. Àëãîðèòìû áûñòðîãî ïðåîáðàçîâàíèÿ Ôóðüå äëÿ äåéñòâèòåëüíûõ è ýðìèòîâî-ñèììåòðè÷íûõ ïîñëåäîâàòåëüíîñòåé / À. Ì. Êðîò, Å. Á. Ìèíåðâèíà // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. – 1989. – Ò. 34, ¹2. – Ñ. 369-376. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Fast Fourier transform algorithms for the real and Hermitian-symmetrical sequences / A. M. Krot, H. B. Minervina // Soviet J. Comm. Tech. Electron. – 1990. – Vol. 34, No. 12. – P. 122-129. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,359)).

67. Êðîò, À. Ì. Ñïåêòðàëüíûé àíàëèç êëàññà íåñòàöèîíàðíûõ ñëó÷àéíûõ ïðîöå­ññîâ â äèñêðåòíûõ áèîðòîãîíàëüíûõ áàçèñàõ / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. – 1989. – Ò. 34, ¹ 1. – Ñ. 59-68. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Spectral analysis of a class of nonstationary random processes in discrete biorthogonal bases / A. M. Krot // Soviet J. Comm. Tech. Electron. – 1989. – Vol. 34, No. 12. – P. 51-59. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,359)).

68. Êðîò, À. Ì. Îá îäíîì êëàññå äèñêðåòíûõ ñëó÷àéíûõ ïðîöåññîâ, íåñòàöèîíàðíûõ îòíîñèòåëüíî îïåðàòîðà îáîáùåííîãî ñäâèãà / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. – 1988. – Ò. 33, ¹ 12. – Ñ. 2515-2523. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Class of discrete random processes, nonstationary relative to a generalized shift operator. / A. M. Krot // Soviet J. Comm. Tech. Electron. – 1989. – Vol. 34, No. 8. – P. 23-31. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0, 359)).

69. Êðîò, À. Ì. Àíàëèç ëèíåéíûõ äèíàìè÷åñêèõ ñèñòåì íà îñíîâå ïîëèíîìèàëüíûõ ïðåîáðàçîâàíèé ÷èñëîâûõ ïîñëåäîâàòåëüíîñòåé / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. – 1988. – Ò. 33, ¹7. – Ñ.1458-1466. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Analysis of linear dynamic systems based on polynomial transformations of numerical sequences / A. M. Krot // Soviet J. Comm. Tech. Electron. – 1989. – Vol. 34, No. 1. – P. 6-13. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,359)).

70. Êðîò, À. Ì. Ñèíòåç àëãîðèòìîâ äèñêðåòíîãî ïðåîáðàçîâàíèÿ Ôóðüå äëÿ äåéñòâèòåëüíûõ ïîñëåäîâàòåëüíîñòåé íà îñíîâå ïîëèíîìèàëüíîé àëãåáðû / À. Ì. Êðîò, Å. Á. Ìèíåðâèíà // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. – 1987. – Ò. 32, ¹ 5. – Ñ.1217-1229. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. Synthesis of digital Fourier transformation algorithms for real sequences on the basis of polynomial algebra / A. M. Krot, H. B. Minervina // Soviet J. Comm. Tech. Electron. – 1987. – Vol. 32, No. 11. – P. 9-19. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0, 359)).

71. Êðîò, À. Ì. Îá îäíîì êëàññå îïåðàòîðîâ îáîáùåííîãî ñäâèãà â òåîðèè ñèãíàëîâ è ñèñòåì / À. Ì. Êðîò // ÀÍ ÑÑÑÐ. Ðàäèîòåõíèêà è ýëåêòðîíèêà. – 1986. – Ò. 31, ¹ 8. – Ñ.1563-1570. (Ïåðåèçäàíà â ÑØÀ: Krot, A. M. On a class of generalized shift operators in the theory of signals and systems / A. M. Krot // Soviet J. Comm. Tech. Electron. – 1986. – Vol. 31, No. 12. – P. 110-118. (Scripta Technica, Inc., èìïàêò-ôàêòîð æóðíàëà – 0,359)).