A field is a commutative ring (even the multiplication operation) with notions of addition, subtraction, multiplication, and division.
A group is a set of elements paired with a binary operation.
|NormedVectorSpace<V,F extends Number>|
A ring is a commutative group (addition operation) with a second binary operation (multiplication) that is distributive over the commutative group operation and is associative.
|ScalarOperation.Addition<T,N extends Number>|
|ScalarOperation.Division<T,N extends Number>|
|ScalarOperation.Multiplication<T,N extends Number>|
|ScalarOperation.Subtraction<T,N extends Number>|
|VectorSpace<V,F extends Number>||
A vector space is a set of objects called vectors, where a vector is a tuple of fields/scalars/numbers.
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