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Ghosh, Chinmay
- Linear Differential Equations with Solutions of Finite Iterated p-Φ Order
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Authors
Affiliations
1 Department of Mathematics, Kazi Nazrul University, Asansol-713340, IN
2 Department of Mathematics, University of Kalyani, Kalyani - 741235, IN
3 53, Gopalpur Primary School, Raninagar-I, Murshidabad -742304, IN
4 28, Dolua Dakshinpara Haridas Primary School, Beldanga, Murshidabad -742133, IN
1 Department of Mathematics, Kazi Nazrul University, Asansol-713340, IN
2 Department of Mathematics, University of Kalyani, Kalyani - 741235, IN
3 53, Gopalpur Primary School, Raninagar-I, Murshidabad -742304, IN
4 28, Dolua Dakshinpara Haridas Primary School, Beldanga, Murshidabad -742133, IN
Source
The Journal of the Indian Mathematical Society, Vol 90, No 1-2 (2023), Pagination: 23-36Abstract
In this article, we have studied complex linear homogeneous differential equations whose coefficients are entire functions having finite iterated p − Φ order and the growth of its nontrivial solutions.Keywords
Entire Function, Iterated p − Φ Order, Finiteness Degree.References
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- On Topological Bihyperbolic Modules
Abstract Views :347 |
PDF Views:3
Authors
Affiliations
1 28, Dolua Dakshinpara Haridas Primary School Beldanga, Murshidabad Pin-742133, West Bengal, IN
2 Department of Mathematics, Kazi Nazrul University, Nazrul Road, P.O.- Kalla C.H. Asansol-713340, West Bengal, IN
3 Department of Mathematics University of Kalyani, P.O.-Kalyani, Dist-Nadia, PIN-741235, West Bengal
1 28, Dolua Dakshinpara Haridas Primary School Beldanga, Murshidabad Pin-742133, West Bengal, IN
2 Department of Mathematics, Kazi Nazrul University, Nazrul Road, P.O.- Kalla C.H. Asansol-713340, West Bengal, IN
3 Department of Mathematics University of Kalyani, P.O.-Kalyani, Dist-Nadia, PIN-741235, West Bengal
Source
The Journal of the Indian Mathematical Society, Vol 90, No 3-4 (2023), Pagination: 233–248Abstract
In this paper, we introduce topological modules over the ring of bihyperbolic numbers. We discuss bihyperbolic convexity, bihyperbolic-valued seminorms and bihyperbolic-valued Minkowski functionals in topological bihyperbolic modules. Finally we introduce locally bihyperbolic convex modules.Keywords
Bihyperbolic Modules, Topological Bihyperbolic Modules, Bihyperbolic Convexity, Bihyperbolic-Valued Seminorms, Bihyperbolic-Valued Minkowski Functionals, Locally Bihyperbolic Convex Modules.References
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