Probability density function solutions to a Bessel type pantograph equation
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Publication:2832353
DOI10.1080/00036811.2015.1102890zbMath1357.34132OpenAlexW2323880966WikidataQ58243863 ScholiaQ58243863MaRDI QIDQ2832353
Ali Ashher Zaidi, Bruce van Brunt, Graeme C. Wake
Publication date: 11 November 2016
Published in: Applicable Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00036811.2015.1102890
Linear functional-differential equations (34K06) Cell biology (92C37) Qualitative investigation and simulation of models involving functional-differential equations (34K60)
Related Items (3)
On the existence of solutions to an inhomogeneous pantograph type equation with singular coefficients ⋮ ON EXISTENCE AND UNIQUENESS OF SOLUTIONS TO A PANTOGRAPH TYPE EQUATION ⋮ ASYMMETRICAL CELL DIVISION WITH EXPONENTIAL GROWTH
Cites Work
- A model for asymmetrical cell division
- An absorption probability problem
- A functional differential equation arising in modelling of cell growth
- A Mellin transform solution to a second-order pantograph equation with linear dispersion arising in a cell growth model
- On the generalized pantograph functional-differential equation
- On a singular Sturm-Liouville problem involving an advanced functional differential equation
- On a cell-growth model for plankton
- The functional-differential equation $y'\left( x \right) = ay\left( {\lambda x} \right) + by\left( x \right)$
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