Localization property of solutions of the $m$-point problem for singular evolution equations (case $m ≥ 3$)
1 Department of Mathematical Problems of Management and Cybernetics, Yuriy Fedkovych Chernivtsi National University, Chernivtsi, 58000, Ukraine
Keywords:
the $m$-point problem, singular evolution equations
Abstract
We prove that the solution of $m$-point Problem for a singularly evolution equation has the property of local strengthening of convergence.
References
[1] Gorodetsky V.V. Two-point problem for one class of evolutionary equations / Vasyl Gorodetsky, Oleg Lenyuk // Mathematical Studies. - 2007. - T. 28, № 2. - P. 175-182.
[2] Gorodetsky V.V. Multipoint problem for evolutionary equations with pseudo-Bessel operators / Vasyl Gorodetsky, Dmytro Spizhavka // Prof. NAS of Ukraine. - 2009. - Nº 12. - P. 7-12.
[3] Gorodetsky V.V. Fourier-Bessel transform of one class of infinitely differentiable functions / Vasyl Gorodetsky, Oleg Lenok // Boundary-value problems for differential equations: 3b. nauk. pr. - Chernivtsi: Prut, 2007. - Issue. 15. - P. 51-66.
Cite
- ACS Style
- Spizhavka , D.I. Localization property of solutions of the $m$-point problem for singular evolution equations (case $m ≥ 3$). Bukovinian Mathematical Journal. 2018, 1
- AMA Style
- Spizhavka DI. Localization property of solutions of the $m$-point problem for singular evolution equations (case $m ≥ 3$). Bukovinian Mathematical Journal. 2018; 1(501).
- Chicago/Turabian Style
- Dmytro Ivanovych Spizhavka . 2018. "Localization property of solutions of the $m$-point problem for singular evolution equations (case $m ≥ 3$)". Bukovinian Mathematical Journal. 1 no. 501.
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