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| {{Technical|date=August 2013}}
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| The '''bid–ask matrix''' is a [[matrix (mathematics)|matrix]] with elements corresponding with exchange rates between the [[assets]]. These rates are in ''physical units'' (e.g. number of stocks) and not with respect to any ''[[numeraire]]''. The <math>(i,j)</math> element of the matrix is the number of units of asset <math>i</math> which can be exchanged for 1 unit of asset <math>j</math>.
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| ==Mathematical Definition==
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| A <math>d \times d</math> matrix <math>\Pi = \left[\pi_{ij}\right]_{1 \leq i,j \leq d}</math> is a ''bid-ask matrix'', if
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| # <math>\pi_{ij} > 0</math> for <math>1 \leq i,j \leq d</math>. Any trade has a positive exchange rate.
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| # <math>\pi_{ii} = 1</math> for <math>1 \leq i \leq d</math>. Can always trade 1 unit with itself.
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| # <math>\pi_{ij} \leq \pi_{ik}\pi_{kj}</math> for <math>1 \leq i,j,k \leq d</math>. A direct exchange is always at most as expensive as a chain of exchanges.<ref name="WS02">{{cite journal|last=Schachermayer|first=Walter|date=November 15, 2002|title=The Fundamental Theorem of Asset Pricing under Proportional Transaction Costs in Finite Discrete Time}}</ref>
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| ==Example==
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| Assume a market with 2 assets (A and B), such that <math>x</math> units of A can be exchanged for 1 unit of B, and <math>y</math> units of B can be exchanged for 1 unit of A. Then the ''bid–ask matrix'' <math>\Pi</math> is:
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| : <math>\Pi = \begin{bmatrix}
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| 1 & x \\
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| y & 1
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| \end{bmatrix}</math>
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| ==Relation to solvency cone==
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| If given a bid–ask matrix <math>\Pi</math> for <math>d</math> assets such that <math>\Pi = \left(\pi^{ij}\right)_{1 \leq i,j \leq d}</math> and <math>m \leq d</math> is the number of assets which with any non-negative quantity of them can be "discarded" (traditionally <math>m = d</math>). Then the [[solvency cone]] <math>K(\Pi) \subset \mathbb{R}^d</math> is the convex cone spanned by the unit vectors <math>e^i, 1 \leq i \leq m</math> and the vectors <math>\pi^{ij}e^i-e^j, 1 \leq i,j \leq d</math>.<ref name="WS02" />
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| Similarly given a (constant) solvency cone it is possible to extract the bid–ask matrix from the bounding vectors.
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| ==Notes==
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| * The [[bid–ask spread]] for pair <math>(i,j)</math> is <math>\left\{\frac{1}{\pi_{ji}},\pi_{ij}\right\}</math>.
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| * If <math>\pi_{ij} = \frac{1}{\pi_{ji}}</math> then that pair is [[frictionless market|frictionless]].
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| ==References==
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| {{Reflist}}
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| {{DEFAULTSORT:Bid-ask matrix}}
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| [[Category:Mathematical finance]]
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