Abstract
he purpose of the article was to assess the amount of ammunition required by the border guard during the battle with the sabotage and reconnaissance group until the arrival of reinforcements. To achieve the goal, a method of mathematical modeling of combat processes in the class of Markov processes with continuous time and discrete states was chosen. As a result, the method made it possible to construct the required models, check their adequacy, due to the found internal law of battle, and evaluate the performance on a specific practical example.
Highlights
The security of the state on its border is ensured by border agencies that counter the threats of international terrorism; uncontrolled proliferation of weapons, sabotage means, explosive, narcotic, psychotropic substances; illegal migration and other threats.The state border is guarded by border patrol groups using technical means in its equipped areas, as well as by visual observation – in unequipped areas
When meeting with a sabotage and/or reconnaissance group, the patrol group consisting of n0 border guards takes the original point in battle order, taking into account the protective properties of the terrain
They report the operational situation to the duty officer in the command and control center of the unit, call for reinforcement, and they engage in a battle with the terrorists of the sabotage and reconnaissance groups (SRG)
Summary
The state border is guarded by border patrol groups using technical means in its equipped areas, as well as by visual observation – in unequipped areas. An example of guarding one of the longest borders with equipped and unequipped sections are groups of US Immigration and Naturalization patrol agents who patrol 8 000 miles of land border sections around the clock, tracking intruders, especially in remote unequipped areas [1]. In preparation for crossing the state border, organized terrorist groups choose a place, time, means of camouflage, a sequence of actions, as well as options for fire defeat in case of meeting with border guards. Coefficients of the differential equations system (39) aij Border guard defeat probability P*.
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