Numerical analysis of random drift in a clineby Thomas Nagylaki and Bradley Lucier, Genetics, 94 The equilibrium state of a diffusion model for random genetic drift in a cline is analyzed numerically. The monoecious organism occupies an un- bounded linear habitat with constant, uniform population density. Migration is homogeneous, symmetric and independent of genotype.
Homology Theories Homologies are one of the basic notions of the algebraic topology.
The homology theory provides a possibility to construct an algebraic object such as a group or a ring that is a topological variant of space. A closed line on a surface is homologous to nought, if a surface breaks up into parts while the scission of a surface.
For example, on a sphere any closed line is as such, but on a torus, though there exist the closed lines that are homologous to nought, the section along a meridian or a parallel will not lead to the separation of a surface part.
The topics that deal with Homology Theories are the following: K — Theories Basic group and Structure Operations 2.
Unary and Binary Operations Research paper topics pertaining to Geometry: Geometry — methodology, terminologies and types: Euclidean Geometry Euclidean or elementary geometry is a geometric theory based on the system of axioms that was first stated by Euclid in the 3rd century BC.
This is a geometry that is generally defined by a group of displacements and a group of similarities. But the content of the elementary geometry is not formed by the mentioned transformations, it includes also the inversion transformation, the problems of spherical geometry, the elements of geometric constructions, the theory of the measurement of geometric magnitudes etc.
Stereometry Stereometry is a branch of geometry that deals with the solid figures in space. When the main figures in space there are a point, a line and a plane, in the stereometry there appears a new kind of the relationship of lines, that is the skew lines. This is one of the few considerable differences of stereometry from planimetry, as in many cases the stereometric problems are solved by the consideration of different planes where the planimetric laws are satisfied.
Computational Geometry Computational Geometry is a branch of the discrete mathematics that deals with the algorithms for the solving of the geometric problems. It deals with such problems as triangulation, construction of a convex hull, the defining of the belonging of one object to another one, the search of their intersection etc.
It operates with such geometric objects as a point, a segment, a polygon and a circle. The computational geometry is used in the image recognition, computer graphics, engineering design etc.
Geometry algorithms Research paper topics on Calculus: Foundation and history of Calculus Calculus is a branch of mathematics that deals with the research of functions and their generalization by the methods of the differential and integral calculus.
Calculus has the resources for solving such problems for which only algebra is insufficient and has application in various spheres pf science. The history of calculus springs from the Ancient Greece, but many of the important ideas were developed in the 17th century, and the most prominent step in the development of calculus was made in the studies of Isaac Newton and Gottfried Leibniz who nowadays are considered to be the founders of calculus.
Vector Spaces A vector space is a structure formed by vectors. Vector spaces are used in mathematical analysis, generally as the infinite-dimensional spaces where vectors are functions, however, this still create a number of analytical problems.
In addition, vector spaces are applied in various spheres of science and engineering.The most downloaded articles from Journal of Differential Equations in the last 90 days.
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Your Research Data. Ordinary Differential Equations In: Other Topics Submitted By cuevas Words Pages 2. MATH A: Ordinary Diﬀerential Equations (Midterm 1) expressed herein are those of the author and do not necessarily reflect the views of the National Bureau of Economic Research.
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Southern Illinois University Carbondale OpenSIUC Research Papers Graduate School Summer An Application of Differential Equations in the Study of Elastic Columns.
Explore the latest articles, projects, and questions and answers in Partial Differential Equations, and find Partial Differential Equations experts. Mathematics Research Paper Topics Good Topics for Mathematics Research Papers A mathematics research paper is an extremely intricate task that requires immense concentration, planning and naturally clear basic knowledge of mathematics, but what is essential for a higher level research is the successful choice of a topic, matching your personal.