Current bachelor thesis and master thesis math topics

This bachelor thesis offers you the opportunity to contribute to the knowledge of a specific topic in this field. Therefore, do not worry about current bachelor thesis math topics! You are about to find out which math topics are currently current. You should not be afraid that your bachelor’s thesis in mathematics is coming soon. It’s easy to find topics for a bachelor’s thesis in mathematics. Your Bachelor’s degree in Mathematics, however, must be interesting. Otherwise, you will not want to write your bachelor thesis. Even if you decide to hire a ghostwriter for the bachelor thesis, you will then defend the work, and if the subject does not interest you, it will be very difficult. This is especially important if you intend to continue with a master’s degree in mathematics after the bachelor’s thesis and degree. Now is the time to take action to find a good topic. It gets even harder when it comes to master thesis topics!

Choose among the following topics:

Examine the n-crossing number of nodes. An n-junction is an intersection with n strands of the continuous node. Each node can be drawn in an image with only n intersections. The smallest number of n-junctions is referred to as the n-crossing number. Determine the n-junction number for different n and different node groups.

An intersecting projection of a node is a projection with only one n-intersection. The crossover number of a node is the smallest one for which there is such a crossover projection. Determine the crossover number for different nodes and see how it relates to other traditional node invariants.

A petal-shaped projection of a node is a projection with only one n-junction, so that none of the loops that emerge from the junction are nested. In other words, the projection looks like a daisy. For such a projection, the petal number of a node is the smallest n. Determine the petal number for different nodes and see how it relates to other traditional nodal invariants.

Examine the billet number of knots, which is the least number of sticks glued end-to-end to form a given knot. Still unknown for two twisted strands. One can also consider lattice-rod nodes where all the rods are parallel to the x, y, z.

Examination of superinvariants related to the standard invariants indicated by bridge number, linkage number, cross number, and braid number.

Generalize concepts known to nodes to virtual nodes.

Mathematical modeling of invasive species

  • Mathematical modeling of vectorial or directly transmitted diseases
  • Development of mathematical models to control vector-borne diseases through vector control

How are singularities limited to a hypersurface? G. F-injectives or F-rational singularities.

Behavior of singularities in flat families.

Open questions about the test Ideal and non-F-pure ideal.

Measuring the smallest degree hypersurfaces through a given collection of points.