Linear Systems and Linear Differential Equations

AI Thread Summary
Linear differential equations are indeed considered linear systems, as both share the defining characteristics of being closed under addition, scalar multiplication, and including zero. The term "linear" in both contexts refers to these same properties. Furthermore, linear differential equations can generate a linear system that models a subspace adhering to these linearity conditions. Understanding this relationship is crucial for analyzing and solving complex mathematical problems. Thus, the concepts of linear systems and linear differential equations are intrinsically linked.
Mathematics news on Phys.org
Yes. The question of linearity requires that a system must be closed under addition, scalar multiplication, and contain zero to be considered linear. A linear differential equation and a linear system are linear under these same qualities. In fact, linear differential equations can create a linear system which models a "subspace" that satisfies these properties as well.
 

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