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| author | Stratis Ioannidis <stratis@stratis-Latitude-E6320.(none)> | 2012-11-05 07:18:13 -0800 |
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| committer | Stratis Ioannidis <stratis@stratis-Latitude-E6320.(none)> | 2012-11-05 07:18:13 -0800 |
| commit | 7b0ccb8d8497fdce5db701d10e99256f32f95562 (patch) | |
| tree | 60091a33ccfabef5ed778747756126810639756f /problem.tex | |
| parent | 2929dffcdea48cb437e8f8e794c674baee94a8ca (diff) | |
| download | recommendation-7b0ccb8d8497fdce5db701d10e99256f32f95562.tar.gz | |
muthu conflict
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| -rw-r--r-- | problem.tex | 7 |
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diff --git a/problem.tex b/problem.tex index 8b1cb2b..f0eeb43 100644 --- a/problem.tex +++ b/problem.tex @@ -131,17 +131,10 @@ etc.). The cost $c_i$ is the amount the subject deems sufficient to incentivize her participation in the study. Note that, in this setup, the feature vectors $x_i$ are public information that the experimenter can consult prior the experiment design. Moreover, though a subject may lie about her true cost $c_i$, she cannot lie about $x_i$ (\emph{i.e.}, all features are verifiable upon collection) or $y_i$ (\emph{i.e.}, she cannot falsify her measurement). %\subsection{D-Optimality Criterion} -<<<<<<< HEAD Ideally, motivated by the $D$-optimality criterion, we would like to design a mechanism that maximizes or approximates \eqref{dcrit} . Since \eqref{dcrit} may take arbitrarily small negative values, to define a meaningful approximation one would consider the (equivalent) maximization of $V(S) = \det\T{X_S}X_S$. %, for some strictly increasing, on-to function $f:\reals_+\to\reals_+$. However, the following lower bound implies that such an optimization goal cannot be attained under the constraints of truthfulness, budget feasibility, and individual rationality. \begin{lemma} For any $M>1$, there is no $M$-approximate, truthful, budget feasible, individionally rational mechanism for a budget feasible reverse auction with $V(S) = \det{\T{X_S}X_S}$. -======= -Ideally, motivated by the $D$-optimality criterion, we would like to design a mechanism that maximizes \eqref{dcrit} within a good approximation ratio. As \eqref{dcrit} may take arbitrarily small negative values, to define a meaningful approximation one would consider the (equivalent) maximization of $V(S) = \det\T{X_S}X_S$. %, for some strictly increasing, on-to function $f:\reals_+\to\reals_+$. -However, the following lower bound implies that such an optimization goal cannot be attained under the constraints of truthfulness, budget feasibility, and individual rationality. -\begin{lemma} -For any $M>1$, there is no $M$-approximate, truthful, budget feasible, individually rational mechanism for a budget feasible reverse auction with value function $V(S) = \det{\T{X_S}X_S}$. ->>>>>>> c29302b25adf190f98019eb8ce5f79b10b66d54d \end{lemma} \begin{proof} \input{proof_of_lower_bound1} |