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Publications in Math-Net.Ru |
Citations |
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2003 |
| 1. |
S. Yakovlev, “Uniqueness theorem and singular spectrum in the Friedrichs model near a singular point”, Algebra i Analiz, 15:1 (2003), 215–239    ; St. Petersburg Math. J., 15:1 (2004), 149–164 |
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1998 |
| 2. |
S. I. Yakovlev, “A finiteness bound for the singular spectrum in a neighborhood of a singular point of operators of the Friedrichs model”, Algebra i Analiz, 10:4 (1998), 210–237 ; St. Petersburg Math. J., 10:4 (1999), 715–731 |
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| 3. |
S. I. Yakovlev, “On the Singular Spectrum of the Friedrichs Model Operators in a Neighborhood of a Singular Point”, Funktsional. Anal. i Prilozhen., 32:3 (1998), 91–94 ; Funct. Anal. Appl., 32:3 (1998), 214–217  |
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1996 |
| 4. |
S. I. Yakovlev, “Singular Spectrum of the Friedrichs Model Operators in a Neighborhood of the Singular Point”, Funktsional. Anal. i Prilozhen., 30:1 (1996), 92–95 ; Funct. Anal. Appl., 30:1 (1996), 70–73 |
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1992 |
| 5. |
S. N. Naboko, S. I. Yakovlev, “The discrete Schrödinger operator. A point spectrum lying in the continuous spectrum”, Algebra i Analiz, 4:3 (1992), 183–195 ; St. Petersburg Math. J., 4:3 (1993), 559–568 |
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| 6. |
S. N. Naboko, S. I. Yakovlev, “On the point spectrum of discrete Schrödinger operator”, Funktsional. Anal. i Prilozhen., 26:2 (1992), 85–88 ; Funct. Anal. Appl., 26:2 (1992), 145–147 |
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1991 |
| 7. |
E. M. Dyn'kin, S. N. Naboko, S. I. Yakovlev, “A finiteness bound for the singular spectrum in a selfadjoint Friedrichs model”, Algebra i Analiz, 3:2 (1991), 77–90 ; St. Petersburg Math. J., 3:2 (1992), 299–313 |
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1990 |
| 8. |
S. N. Naboko, S. I. Yakovlev, “Conditions for the finiteness of the singular spectrum in the self-adjoint friedrichs model”, Funktsional. Anal. i Prilozhen., 24:4 (1990), 88–89 ; Funct. Anal. Appl., 24:4 (1990), 338–340 |
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