Approximation algorithms for pricing with negative network externalities

We study the problems of pricing an indivisible product to consumers who are embedded in a given social network. The goal is to maximize the revenue of the seller by the so-called iterative pricing that offers consumers a sequence of prices over time. The consumers are assumed to be impatient in that they buy the product as soon as the seller posts a price not greater than their valuations of the product. The product’s value for a consumer is determined by two factors: a fixed consumer-specified intrinsic value and a variable externality that is exerted from the consumer’s neighbors in a linear way. We focus on the scenario of negative externalities, which captures many interesting situations, but is much less understood in comparison with its positive externality counterpart. Assuming complete information about the network, consumers’ intrinsic values, and the negative externalities, we prove that it is NP-hard to find an optimal iterative pricing, even for unweighted tree networks with uniform intrinsic values. Complementary to the hardness result, we design a 2-approximation algorithm for general weighted networks with (possibly) nonuniform intrinsic values. We show that, as an approximation to optimal iterative pricing, single pricing works fairly well for many interesting cases, such as forests, Erdős–Rényi networks and Barabási–Albert networks, although its worst-case performance can be arbitrarily bad in general networks.

[1]  C. Shapiro,et al.  Network Externalities, Competition, and Compatibility , 1985 .

[2]  Wei Chen,et al.  Optimal Pricing in Social Networks with Incomplete Information , 2010, WINE.

[3]  Nima Haghpanah,et al.  Optimal Auctions with Positive Network Externalities , 2013, TEAC.

[4]  Nima Haghpanah,et al.  Optimal iterative pricing over social networks , 2010 .

[5]  Yann Bramoullé,et al.  Anti-coordination and social interactions , 2007, Games Econ. Behav..

[6]  Noga Alon,et al.  Differential pricing with inequity aversion in social networks , 2013, EC.

[7]  Béla Bollobás,et al.  The degree sequence of a scale‐free random graph process , 2001, Random Struct. Algorithms.

[8]  Morteza Zadimoghaddam,et al.  Revenue Maximization with Nonexcludable Goods , 2015, ACM Trans. Economics and Comput..

[9]  Renato Paes Leme,et al.  Pricing public goods for private sale , 2013, EC '13.

[10]  Joseph Farrell,et al.  Standardization, Compatibility, and Innovation , 1985 .

[11]  Kamesh Munagala,et al.  On Allocations with Negative Externalities , 2011, WINE.

[12]  E. Stacchetti,et al.  How (not) to sell nuclear weapons , 1996 .

[13]  Éva Tardos,et al.  Maximizing the Spread of Influence through a Social Network , 2015, Theory Comput..

[14]  Arun Sundararajan,et al.  Dynamic pricing of network goods with boundedly rational consumers , 2006, Proceedings of the National Academy of Sciences.

[15]  Changrong Deng,et al.  Money for nothing: exploiting negative externalities , 2011, EC '11.

[16]  Elchanan Mossel,et al.  Submodularity of Influence in Social Networks: From Local to Global , 2010, SIAM J. Comput..

[17]  Nima Haghpanah,et al.  Optimal auctions with positive network externalities , 2011, EC '11.

[18]  Asuman E. Ozdaglar,et al.  Optimal Pricing in Networks with Externalities , 2011, Oper. Res..

[19]  Ning Chen,et al.  On the approximability of influence in social networks , 2008, SODA '08.

[20]  Yann Bramoullé,et al.  Public goods in networks , 2007, J. Econ. Theory.

[21]  Albert,et al.  Emergence of scaling in random networks , 1999, Science.

[22]  Vahab S. Mirrokni,et al.  Optimal marketing strategies over social networks , 2008, WWW.

[23]  Mohammad Ghodsi,et al.  Optimal Iterative Pricing over Social Networks (Extended Abstract) , 2010, WINE.

[24]  Francis Bloch,et al.  Pricing in social networks , 2013, Games Econ. Behav..

[25]  Zhigang Cao,et al.  Pricing in Social Networks with Negative Externalities , 2014, CSoNet.