Differential Incremental Equilibrium Geometry - Spatial Folding of Protein Particles, Genome Expression and Bidirectional Semiconservative Replication of Ring Chromosomes
American Journal of Applied Mathematics
Volume 7, Issue 4, August 2019, Pages: 98-113
Received: Jul. 13, 2019;
Accepted: Jul. 31, 2019;
Published: Sep. 12, 2019
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Zhu Rong Rong, Office of Human Resources, Fudan University, Shanghai, China
The research direction of this paper is to study the interdisciplinary subjects of life science, mathematics and computer science at the molecular level from the life science Molecular Cell Biology. On the basis of mathematical primitive innovation "Differential Incremental Balanced Geometry", the cell modification of normal chromosome mitosis was established at the molecular level, and the normal cell tissue spatial morphology with initial boundary was established. DNA is used to unravel double helix and separate double strands to solve the protein skeleton structure of bi-directional Semi-Reserved replication of cyclic chromosomes in life sciences at the molecular level. Therefore, it establishes and reveals the duplication fork and bidirectional duplication of molecular cell biology model, the internal structure and regularity of cyclic chromosomes bound by cyclic DNA double helix and many proteins. New mathematics is integrated into the micro-activities of cell modification in life sciences. The topological geometric image of the solitary wavelet with supersymmetric structure is constructed, which reflects the correct abstract model of cell modification and provides dynamic structure for DNA gene sequencing, etc. It also provides a mature mathematical basis for reliable predictability of gene editing.
Zhu Rong Rong,
Differential Incremental Equilibrium Geometry - Spatial Folding of Protein Particles, Genome Expression and Bidirectional Semiconservative Replication of Ring Chromosomes, American Journal of Applied Mathematics. Special Issue: Molecular Cellular Information Mathematics-Differential Incremental Equilibrium Geometry .
Vol. 7, No. 4,
2019, pp. 98-113.
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