Persons: Nabiev, Ibrahim Mail oglu

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Nabiev, Ibrahim Mail oglu

Statistics Math-Net.Ru
Total publications:	13
Scientific articles:	13

Number of views:
This page:	2784
Abstract pages:	4860
Full texts:	1790
References:	495

Professor

Doctor of physico-mathematical sciences (2007)

Speciality:

01.01.01 (Real analysis, complex analysis, and functional analysis)

Birth date:

1.02.1961

E-mail:

Keywords:

spectrum, operator, boundary problems, inverse problems.

UDC:

517.984, 517.984.54

Subject:

Spectral Theory of Operators.

Main publications:

I. M. Nabiev, “Kratnost i vzaimnoe raspolozhenie sobstvennykh znachenii kvadratichnogo puchka operatorov Shturma–Liuvillya”, Mat. zametki, 67:3 (2000), 369–381
I. M. Nabiev, “Obratnaya kvaziperiodicheskaya zadacha dlya operatora diffuzii”, Dokl. RAN, 415:2 (2007), 168–170
I. M. Guseinov, I. M. Nabiev, “Obratnaya spektralnaya zadacha dlya puchkov differentsialnykh operatorov”, Mat. sb., 198:11 (2007), 47–66

https://www.mathnet.ru/eng/person8314

List of publications on Google Scholar

List of publications on ZentralBlatt

https://mathscinet.ams.org/mathscinet/MRAuthorID/253213

	Publications in Math-Net.Ru	Citations
	2022
1.	L. I. Mammadova, I. M. Nabiev, “Uniqueness of recovery of the Sturm-Liouville operator with a spectral parameter quadratically entering the boundary condition”, Vestn. Tomsk. Gos. Univ. Mat. Mekh., 2022, no. 79, 14–24	1
	2020
2.	L. I. Mammadova, I. M. Nabiev, “Spectral properties of the Sturm–Liouville operator with a spectral parameter quadratically included in the boundary condition”, Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 30:2 (2020), 237–248	2
	2016
3.	T. Sh. Abdullaev, I. M. Nabiev, “An algorithm for reconstructing the Dirac operator with a spectral parameter in the boundary condition”, Zh. Vychisl. Mat. Mat. Fiz., 56:2 (2016), 252–258 ; Comput. Math. Math. Phys., 56:2 (2016), 256–262	8
	2011
4.	I. M. Nabiev, “Solution of the Inverse Quasiperiodic Problem for the Dirac System”, Mat. Zametki, 89:6 (2011), 885–893 ; Math. Notes, 89:6 (2011), 845–852	10
	2009
5.	I. M. Nabiev, A. Sh. Shukurov, “Solution of inverse problem for the diffusion operator in a symmetric case”, Izv. Saratov Univ. Math. Mech. Inform., 9:4(1) (2009), 36–40	8
	2007
6.	I. M. Guseinov, I. M. Nabiev, “The inverse spectral problem for pencils of differential operators”, Mat. Sb., 198:11 (2007), 47–66 ; Sb. Math., 198:11 (2007), 1579–1598	52
	2004
7.	I. M. Nabiev, “Inverse spectral problem for diffusion operator on the segment”, Mat. Fiz. Anal. Geom., 11:3 (2004), 302–313	18
	2000
8.	I. M. Guseinov, I. M. Nabiev, “A class of inverse problems for a quadratic pencil of Sturm-Liouville operators”, Differ. Uravn., 36:3 (2000), 418–420 ; Differ. Equ., 36:3 (2000), 471–473	7
9.	I. M. Nabiev, “Multiplicities and relative position of eigenvalues of a quadratic pencil of Sturm–Liouville operators”, Mat. Zametki, 67:3 (2000), 369–381 ; Math. Notes, 67:3 (2000), 309–319	18
	1995
10.	I. M. Guseinov, I. M. Nabiev, “Solution of a class of inverse boundary-value Sturm–Liouville problems”, Mat. Sb., 186:5 (1995), 35–48 ; Sb. Math., 186:5 (1995), 661–674	22
	1994
11.	I. M. Guseinov, I. M. Nabiev, “The reconstruction of a differential operator by its spectrum”, Mat. Zametki, 56:4 (1994), 59–66 ; Math. Notes, 56:4 (1994), 1030–1035	2
	1990
12.	M. G. Gasymov, I. M. Guseinov, I. M. Nabiev, “An inverse problem for the Sturm–Liouville operator with nonseparable selfadjoint boundary conditions”, Sibirsk. Mat. Zh., 31:6 (1990), 46–54 ; Siberian Math. J., 31:6 (1990), 910–918	19
	1989
13.	I. M. Guseinov, I. M. Nabiev, “A class of inverse boundary value problems for Sturm–Liouville operators”, Differ. Uravn., 25:7 (1989), 1114–1120 ; Differ. Equ., 25:7 (1989), 779–784	3

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