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Tagged with quadratic-forms fields
6 questions
1
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0
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Quadratic equations over division rings of dimension 2
Let $\ell$ be a division ring, and let $k$ be a sub division ring.
I know that a quadratic equation $x^2 + ax + b = 0$, with $a, b \in k$ can have more than two solutions in $\ell$, but what if the ...
1
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0
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85
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Squares in skew fields of dimension 2 over a sub skew field
Let $\ell$ be a skew field (i.e., a division ring), and let $k$ be a sub skew field, such that the dimension of $\ell$ as a left vector space over $k$ is $2$.
Then if $a \in \ell \setminus k$, we can ...
4
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1
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377
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Is there a trigonometric field which is different enough from real numbers?
I found this topic in a book 'Metric Affine Geometry' by Ernst Snapper and Robert J. Troyer.
I call a field $k$ trigonometric iff there is a quadratic form $q$ over $k^2$ such that every two lines ...
10
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2
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When is a bilinear form equivalent to a trace form?
Associated to a finite, separable field extension $L/K$, there is a natural nondegenerate bilinear form, the trace form, defined by $$\langle x,y \rangle := \mathrm{Tr}_{L/K}(xy)$$
Now, given a ...
4
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0
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124
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On the quadratic equivalence of fields
I have spent the past two years studying abstract Witt rings. These objects are a generalization of "The Witt ring of a field," an algebraic invariant of fields of characteristic not equal to 2. ...
13
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1
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990
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Is -1 a sum of 2 squares in a certain field K?
Consider the field of fractions $K$
of the quotient algebra $\mathbb{R}[x,y,z,t]/(x^2+y^2+z^2+t^2+1)$,
where $\mathbb{R}$ is the field of real numbers and $x,y,z,t$ are variables.
Clearly $-1$ is a ...