A non empty set over a Field satisfying with 2 binary operations, commonly denoted as and , satisfying:
In the above,
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Dec 18, 20241 min read
A non empty set V over a Field F satisfying with 2 binary operations, commonly denoted as + and ×, satisfying:
Properties:⎩⎨⎧u+(v+w)=(u+v)+wu+v=v+u∃0∈V:v+0=v∀v∈V∀v∈V∃(−v):(−v)+v=0a(bv)=(ab)v1v=va(u+v)=au+av(a+b)V=av+bvAddition of vectors is associativeAddition is commutativeThere is an additive identity vector 0∈VAll vectors have an additive inverseScalar multiplications is associative with field multiplicationThere is a multiplicative identity scalar 1∈FScalar multiplication is distributive over vector additionScalar multiplication is distributive over field additionIn the above,