Consistent pricing process

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A consistent pricing process (CPP) is any representation of (frictionless) "prices" of assets in a market. It is a stochastic process in a filtered probability space $(\Omega ,{\mathcal {F}},\{{\mathcal {F}}_{t}\}_{{t=0}}^{T},P)$ such that at time $t$ the $i^{{th}}$ component can be thought of as a price for the $i^{{th}}$ asset.

Mathematically, a CPP $Z=(Z_{t})_{{t=0}}^{T}$ in a market with d-assets is an adapted process in ${\mathbb {R}}^{d}$ if Z is a martingale with respect to the physical probability measure $P$ , and if $Z_{t}\in K_{t}^{+}\backslash \{0\}$ at all times $t$ such that $K_{t}$ is the solvency cone for the market at time $t$ .^[1]^[2]

The CPP plays the role of an equivalent martingale measure in markets with transaction costs.^[3] In particular, there exists a 1-to-1 correspondence between the CPP $Z$ and the EMM $Q$ .^{[citation needed]}

References

↑ Schachermayer, Walter (November 15, 2002). The Fundamental Theorem of Asset Pricing under Proportional Transaction Costs in Finite Discrete Time.
↑ Yuri M. Kabanov; Mher Safarian (2010). Markets with Transaction Costs: Mathematical Theory. Springer. p. 114. ISBN 978-3-540-68120-5.
↑ Jacka, Saul; Berkaoui, Abdelkarem; Warren, Jon. "No arbitrage and closure results for trading cones with transaction costs". Finance and Stochastics 12 (4): 583–600. doi:10.1007/s00780-008-0075-7.

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