Mathematical Model of FHXWBranching Type with Hyphal Death

Journal Title: JOURNAL OF ADVANCES IN MATHEMATICS - Year 2016, Vol 12, Issue 4

Abstract

A mathematical description of growth and branching in fungi can be derived in terms of continuous variables such as densities of filaments and tips. The general concept of continuum modeling yields the following equations of fungal growth in which a balance is kept for the accumulation of hyphal filaments and their tips.Hyphae are immobile. They are created only through the motion of tips-essentially the trail left behind tips as they moves. The rate of local length accumulation depends on the number of tips and branches present as well as on their rate of motion.

Authors and Affiliations

Mudhafar Habeeb Zmakh, Ali H Shuaa Al-Taie

Keywords

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  • EP ID EP651710
  • DOI 10.24297/jam.v12i4.348
  • Views 162
  • Downloads 0

How To Cite

Mudhafar Habeeb Zmakh, Ali H Shuaa Al-Taie (2016). Mathematical Model of FHXWBranching Type with Hyphal Death. JOURNAL OF ADVANCES IN MATHEMATICS, 12(4), 6111-6120. https://europub.co.uk/articles/-A-651710