IPM Positions

Non Resident Researcher (non-resident), School of Mathematics (2019 - 2024 (from March 21, 2019 till March 19, 2024))

Past IPM Positions

Post-Doctoral Research Fellow, School of Mathematics (2016 - 2018) (from April 20, 2016 till April 20, 2018 )

Related Papers

1.	Kh. Baghaei Blow-up of nonradial solutions to the hyperbolic-elliptic chemotaxis system with logistic source C. R. Math. (Accepted) [abstract]

2.	Kh. Baghaei Blow-up, non-extinction and exponential growth of solutions to a fourth-order parabolic equation Comptes Rendus Mecanique 350 (2022), 47-56  [abstract]

3.	Kh. Bagheri and H. Khodaiemehr (Joint with T. Eghlidos and D. Panario) Secure one-way relaying scheme based on Random Difference Family (RDF) lattice codes Wireless Networks (Accepted) [abstract]

4.	Kh. Baghaei (joint with A. Khelghati) Blow-up phenomenon and the exact blow-up time for a class of pseudo-parabolic equations with a nonlocal source Math. Methods Appl. Sci. (2020), DOI: 10.1002/mma.6841  [abstract]

5.	Kh. Baghaei (Joint with A. Khelghati) Boundedness of classical solutions for a chemotaxis model with rotational flux terms ZAMM (2018), DOI: 10.1002/zamm.201700091  [abstract]

6.	Kh. Baghaei (Joint with A. Khelghati) Blow-up phenomenon for a nonlinear wave equation with anisotropy and a source term Appl. Anal. (2018), DOI: 10.1080/00036811.2018.1501031  [abstract]

7.	Kh. Baghaei (Joint with A. Khelghati) Boundedness of classical solutions for a chemotaxis system with general sensitivity function Appl. Anal. (2017), DOI: 10.1080/00036811.2017.1399361  [abstract]

8.	Kh. Baghaei (Joint with A. Khelghati) Boundedness of classical solutions for a chemotaxis model with consumption of chemoattractant C. R. Acad. Sci. Paris. Ser. I 355 (2017), 633-639  [abstract]

9.	Kh. Baghei Lower bounds for the blow-up time in a superlinear hyperbolic equation with linear damping term Comput. Math. Appl. 73 (2017), 560-564  [abstract]

10.	Kh. Baghaei (Joint with A. Khelghati) Global existence and boundedness of classical solutions for a chemotaxis model with consumption of chemoattractant and logistic source Math. Methods Appl. Sci. (2016), DOI: 10.1002/mma.4264  [abstract]