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Publications in Math-Net.Ru |
Citations |
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2014 |
1. |
R. N. Miroshin, “On evolution of the integral of the product of two real functions with Levin–Stechkin type of inequality”, Vestnik S.-Petersburg Univ. Ser. 10. Prikl. Mat. Inform. Prots. Upr., 2014, no. 3, 28–35 |
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2013 |
2. |
R. N. Miroshin, “Representation of a Multiple Integral of Special Form by a Series”, Mat. Zametki, 93:1 (2013), 96–103 ; Math. Notes, 93:1 (2013), 137–142 |
3. |
R. N. Miroshin, “Generalization of Levin–Stechkin inequality”, Vestnik S.-Petersburg Univ. Ser. 10. Prikl. Mat. Inform. Prots. Upr., 2013, no. 1, 18–21 |
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2011 |
4. |
R. N. Miroshin, “On a class of nonChebyshev function systems allowing to use Markov theorem in the finite moment problem”, Vestnik S.-Petersburg Univ. Ser. 10. Prikl. Mat. Inform. Prots. Upr., 2011, no. 4, 57–62 |
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2007 |
5. |
R. N. Miroshin, “On Multiple Integrals of Special Form”, Mat. Zametki, 82:3 (2007), 401–410 ; Math. Notes, 82:3 (2007), 357–365 |
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2004 |
6. |
O. A. Aksenova, R. N. Miroshin, I. A. Khalidov, “Application of the nonlinear dynamics methods to the investigation of stability regions of rarefied gas flows in channels”, Matem. Mod., 16:6 (2004), 85–87 |
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2003 |
7. |
R. N. Miroshin, “On a Class of Multiple Integrals”, Mat. Zametki, 73:3 (2003), 390–401 ; Math. Notes, 73:3 (2003), 359–369 |
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2001 |
8. |
R. N. Miroshin, “An Asymptotic Series for the Weber–Schafheitlin Integral”, Mat. Zametki, 70:5 (2001), 751–757 ; Math. Notes, 70:5 (2001), 682–687 |
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1999 |
9. |
R. N. Miroshin, “On the distribution of the number of zerocrossings of Wong process for a large time interval”, Fundam. Prikl. Mat., 5:3 (1999), 809–816 |
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1997 |
10. |
R. N. Miroshin, “An asymptotic estimate of the integral of the product of two modified Bessel functions and a power function”, Mat. Zametki, 61:3 (1997), 456–458 ; Math. Notes, 61:3 (1997), 373–376 |
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1985 |
11. |
R. N. Miroshin, “Mathematical problems of the theory of local interaction”, Dokl. Akad. Nauk SSSR, 285:5 (1985), 1078–1081 |
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1984 |
12. |
R. N. Mirošin, “A simple criterion of the finiteness of moments of the number of zeros of a Gaussian stationary process”, Teor. Veroyatnost. i Primenen., 29:3 (1984), 547–549 ; Theory Probab. Appl., 29:3 (1985), 566–569 |
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1983 |
13. |
R. N. Mirošin, “The using of Rice series”, Teor. Veroyatnost. i Primenen., 28:4 (1983), 679–690 ; Theory Probab. Appl., 28:4 (1984), 714–726 |
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1981 |
14. |
R. N. Mirošin, “Convergence of the Longuet-Higgins series for Gaussian stationary Markov process of the first order”, Teor. Veroyatnost. i Primenen., 26:1 (1981), 101–120 ; Theory Probab. Appl., 26:1 (1981), 97–117 |
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1979 |
15. |
R. N. Mirošin, “Markov and reciprocal stationary Gaussian processes of second order”, Teor. Veroyatnost. i Primenen., 24:4 (1979), 847–853 ; Theory Probab. Appl., 24:4 (1980), 845–852 |
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1977 |
16. |
R. N. Mirošin, “On conditions of the local nondeterminism of differentiable Gaussian stationary processes”, Teor. Veroyatnost. i Primenen., 22:4 (1977), 851–856 ; Theory Probab. Appl., 22:4 (1978), 831–836 |
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17. |
R. N. Mirošin, “Conditions for moments of the number of zeroes of Gaussian stationary processes to be finite”, Teor. Veroyatnost. i Primenen., 22:3 (1977), 631–641 ; Theory Probab. Appl., 22:3 (1978), 615–625 |
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1976 |
18. |
R. N. Mirošin, “Convergence of Rice and Longuet-Higgins series for a Wong process”, Teor. Veroyatnost. i Primenen., 21:4 (1976), 885–888 ; Theory Probab. Appl., 21:4 (1977), 863–866 |
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1974 |
19. |
R. N. Miroshin, “A necessary condition for moments of the number of zeros of a differentiable Guassian stationary process to le inite”, Teor. Veroyatnost. i Primenen., 19:3 (1974), 596–603 ; Theory Probab. Appl., 19:3 (1975), 570–577 |
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1973 |
20. |
R. N. Miroshin, “A sufficient condition for the number of zeros of a differentiable Gaussian stationary process to be finite”, Teor. Veroyatnost. i Primenen., 18:3 (1973), 481–490 ; Theory Probab. Appl., 18:3 (1974), 454–463 |
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1971 |
21. |
R. N. Miroshin, “On the finiteness of the moments of the number of zeros of a differentiable Gaussian stationary process”, Dokl. Akad. Nauk SSSR, 200:1 (1971), 32–34 |
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1969 |
22. |
R. N. Miroshin, “An asymptotic estimate of the probability for a Gaussian stochastic process to remain under the straight line $kt+a$”, Teor. Veroyatnost. i Primenen., 14:2 (1969), 363–369 ; Theory Probab. Appl., 14:2 (1969), 349–354 |
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