Monogenic system

Template:Use Canadian English Template:Short description In classical mechanics, a physical system is termed a monogenic system if the force acting on the system can be modelled in a particular, especially convenient mathematical form. The systems that are typically studied in physics are monogenic. The term was introduced by Cornelius Lanczos in his book The Variational Principles of Mechanics (1970).^[1][2]

In Lagrangian mechanics, the property of being monogenic is a necessary condition for certain different formulations to be mathematically equivalent. If a physical system is both a holonomic system and a monogenic system, then it is possible to derive Lagrange's equations from d'Alembert's principle; it is also possible to derive Lagrange's equations from Hamilton's principle.^[3]

In a physical system, if all forces, with the exception of the constraint forces, are derivable from the generalized scalar potential, and this generalized scalar potential is a function of generalized coordinates, generalized velocities, or time, then, this system is a monogenic system.

Expressed using equations, the exact relationship between generalized force ${\displaystyle {ℱ}_i}$ and generalized potential ${\displaystyle 𝒱(q_1,q_2,\dots ,q_N,{\dot{q}}_1,{\dot{q}}_2,\dots ,{\dot{q}}_N,t)}$ is as follows:

$${\displaystyle {ℱ}_i=-\frac{\partial 𝒱}{\partial q_i}+\frac{d}{dt}\left(\frac{\partial 𝒱}{\partial \dot{q_i}}\right);}$$

where ${\displaystyle q_i}$ is generalized coordinate, ${\displaystyle \dot{q_i}}$ is generalized velocity, and ${\displaystyle t}$ is time.

If the generalized potential in a monogenic system depends only on generalized coordinates, and not on generalized velocities and time, then, this system is a conservative system. The relationship between generalized force and generalized potential is as follows:

$${\displaystyle {ℱ}_i=-\frac{\partial 𝒱}{\partial q_i}.}$$

• Scleronomous

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