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When calculating the inner product$^1$ of two complex vectors $u$ and $v$, why is the complex conjugate of $v$ used? Why not just compute the inner product as with real vectors?

1:Where the inner product of two vectors is defined as the summation of the product of corresponding elements.

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    You want the associated quadratic form to be real valued in order to impose the positive-definitess condition and so obtain what are called hermitian forms. Note that these forms are not bilinear but just sesquilinear.2012-05-26
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    @Farhad: Great question. +12012-05-26
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    A requirement is $\langle z,z \rangle \geq 0$. For $z = i$, without cnjugates you get $\langle i, i \rangle = -1 < 0$.2012-05-26

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A quick answer is that if $z$ is a complex vector, $$\sum_{k=1}^n z_k^2$$ will not be real. In this case we do not have $$\|z\|^2= \langle z, z\rangle.$$

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    But wouldn't multiplying by the the original vector still provide a complex answer? For example if $v= e^{i\theta_1}$ and $u=e^{i\theta_2}$, $vu=e^{i(\theta_1 + \theta_2)}$, but multiplying $v\overline{u} = e^{i(\theta_1 - \theta_2)}$. Both products are still complex, so how does this change anything?2012-05-26
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    $\langle z,z \rangle$ is supposed to be nonnegative for all vectors $z$. As ncmathsadist showed, if you do not use the complex cojnjugate, it is not.2012-05-26
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    Ah! I see, thanks!2012-05-26
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    @ncmathsadist One last question: If vector $a$ is at $70$ degrees and vector $b$ is at $80$ degrees, the angle between them is $10$. However the complex conjugate of $b$ is at $80+180 = 260$ degrees. Therefore the angle between vector $a$ and the complex conjugate of be vector $b$ is $260-70 = 190$. Therefore won't using the dot product of the *negative conjugate* give you a "wrong" angle? (for example in this case $190$ instead of $10$). I've added 180 degrees to find the complex conjugate because $i$ determines the y axis and multiplying $i$ by $-1$ would rotate the vector 180 degrees.2012-05-28