R. Ahlswede, Multi-way communication channels, Proc. 2nd International Symposium on Information Theory. Tsahkadsor, Armenian S.S.R. Hungarian Academy of Sciences, pp.23-52, 1971.

R. Ahlswede, The capacity region of a channel with two senders and two receivers, The Annals of Probability, vol.2, pp.805-814, 1974.

V. S. Annapureddy and V. V. Veeravalli, Gaussian interference networks: Sum-capacity in the low-interference regime and new outer bounds on the capacity region, IEEE Trans. Inf. Theory, vol.55, issue.7, pp.3032-3050, 2009.

E. Anshelevich, A. Dasgupta, E. Tardos, and T. Wexler, Near-optimal network design with selfish agents, Proc. Annual ACM Symposium on Theory of Computing, 2003.

E. Ardestanizadeh, M. Franceschetti, T. Javidi, and Y. Kim, Wiretap channel with secure rate-limited feedback, IEEE Trans. Inf. Theory, vol.55, pp.5353-5361, 2009.

M. Ashraphijuo, V. Aggarwal, W. , and X. , On the symmetric K-user linear deterministic interference channels with limited feedback, Proc. 52nd Annual Allerton Conference on Communication, Control, and Computing (Allerton), vol.23, p.22, 2014.

M. Ashraphijuo, V. Aggarwal, W. , and X. , On the Symmetric K-user Interference Channels with Limited Feedback, IEEE Trans. Inf. Theory, vol.62, p.22, 2016.

S. Avestimehr, S. Diggavi, and D. N. Tse, Wireless network information flow: A deterministic approach, IEEE Trans. Inf. Theory, vol.57, p.22, 2011.

S. Belhadj-amor and S. Perlaza, Decentralized K-user Gaussian multiple access channels, Proc. International conference on NETwork Games, COntrol and OPtimization, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01378343

S. Belhadj-amor and S. Perlaza, Decentralized simultaneous energy and information transmission in multiple access channels, Proc. 2016 Annual Conference on Information Science and Systems (CISS), 2016.
URL : https://hal.archives-ouvertes.fr/hal-01270764

S. Belhadj-amor, S. M. Perlaza, I. Krikidis, and H. V. Poor, Feedback enhances simultaneous energy and information transmission in multiple access channels, Proc. IEEE International Symposium on Information Theory (ISIT), pp.1974-1978, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01223586

S. Belhadj-amor, S. M. Perlaza, I. Krikidis, and H. V. Poor, Feedback enhances simultaneous wireless information and energy transmission in multiple access channels, IEEE Trans. Inf. Theory, vol.63, pp.5244-5265, 2017.
URL : https://hal.archives-ouvertes.fr/hal-01223586

S. Belhadj-amor, Y. Steinberg, and M. Wigger, MIMO MAC-BC duality with linear-feedback Coding Schemes, IEEE Trans. Inf. Theory, vol.61, pp.5976-5998, 2015.
URL : https://hal.archives-ouvertes.fr/hal-01221344

P. Bergmans, Random Coding Theorems for Broadcast Channels with Degraded Components, IEEE Trans. Inf. Theory, vol.19, pp.197-207, 1973.

R. Berry and D. N. Tse, Information theoretic games on interference channels, Proc. of the IEEE International Symposium on Information Theory (ISIT)

C. Toronto, , 2008.

R. Berry and D. N. Tse, Shannon meets Nash on the interference channel, IEEE Trans. Inf. Theory, vol.57, issue.5, pp.2821-2836, 2011.

S. R. Bhaskaran, Gaussian broadcast channel with feedback, IEEE Trans. Inf. Theory, vol.54, pp.5252-5257, 2008.

A. Bracher and M. Wigger, Feedback and partial message side-information on the semideterministic broadcast channel, IEEE Trans. Inf. Theory, vol.63, pp.505-5073, 2017.

D. Braess, Über ein Paradoxon aus der Verkehrsplanung, Unternehmensforschung 24, vol.5, pp.258-268, 1969.

G. Bresler and D. N. Tse, The two user Gaussian interference channel: A deterministic view, European Transactions on Telecommunications, vol.19, pp.333-354, 2008.

S. I. Bross and M. Wigger, On the relay channel with receiver-transmitter feedback, IEEE Trans. Inf. Theory, vol.55, issue.1, pp.275-291, 2009.

A. Carleial, A case where Interference does not reduce capacity, IEEE Trans. Inf. Theory, vol.21, pp.569-570, 1975.

A. Carleial, Interference channels, IEEE Trans. Inf. Theory, vol.24, issue.1, pp.12-14, 1978.

H. Chong, M. Motani, H. K. Garg, and H. Gamal, On the Han-Kobayashi region for the interference channel, IEEE Trans. Inf. Theory, vol.54, issue.7, pp.13-16, 2008.

T. Cover, Broadcast channels, IEEE Trans. Inf. Theory, vol.18, pp.2-14, 1972.

T. Cover and A. E. Gamal, Capacity theorems for the relay channel, IEEE Trans. Inf. Theory, vol.25, pp.572-584, 1979.

T. M. Cover and C. S. Leung, An achievable rate region for the multiple-access channel with feedback, IEEE Trans. Inf. Theory, vol.27, issue.3, pp.292-298, 1981.

T. M. Cover and J. A. Thomas, Elements of information theory, vol.102, pp.206-208, 1991.

G. Dueck, Partial feedback for two-way and broadcast channels, In: Information and Control, vol.46, issue.1, pp.1-15, 1980.

A. El-gamal and M. Costa, The capacity region of a class of deterministic interference channels, IEEE Trans. Inf. Theory, vol.28, p.22, 1982.

R. H. Etkin, D. N. Tse, and W. Hua, Gaussian interference channel capacity to within one bit, IEEE Trans. Inf. Theory, vol.54, pp.5534-5562, 2008.

R. Fano, Transmission of information -a statistical theory of communication, 1961.

N. T. Gaarder and J. K. Wolf, The capacity region of a mulitple-access discrete memoryless channel can increase with feedback, IEEE Trans. Inf. Theory, vol.21, issue.1, pp.100-102, 1975.

Y. Gabbai and S. I. Bross, Achievable rates for the discrete memoryless relay channel with partial feedback configurations, IEEE Trans. Inf. Theory, vol.52, pp.4989-5007, 2006.

M. Gastpar and G. Kramer, On noisy feedback for interference channels, Asilomar Conference on Signals, Systems and Computers, 2006.

M. Gastpar, A. Lapidoth, Y. Steinberg, and M. Wigger, Coding schemes and asymptotic capacity for the Gaussian broadcast and interference channels with feedback, IEEE Trans. Inf. Theory, vol.60, issue.1, pp.54-71, 2014.

T. S. Han and K. Kobayashi, A new achievable rate region for the interference channel, IEEE Trans. Inf. Theory, vol.27, pp.12-17, 1981.

Z. Han, D. Niyato, W. Saad, and A. Hjørungnes, Game theory in wireless and communication networks: Theory, models, and applications, 2012.

A. P. Hekstra and F. M. Willems, Dependence balance bounds for single-output two-way channels, IEEE Trans. Inf. Theory, vol.35, issue.1, pp.44-53, 1989.

S. A. Jafar, Interference alignment: A new look at signal dimensions in a communication network, Foundations and Trends in Communications and Information Theory, vol.7, pp.1-134, 2010.

C. Karakus, I. Wang, and S. Diggavi, Gaussian Interference Channel with Intermittent Feedback, IEEE Trans. Inf. Theory, vol.61, pp.4663-4699, 2015.

N. Khalfet and S. Perlaza, Simultaneous information and energy transmission in Gaussian interference channels with feedback, Proc. 55th Annual Allerton Conference on Communications, Control, and Computing, 2017.
URL : https://hal.archives-ouvertes.fr/hal-01561756

N. Khalfet and S. M. Perlaza, Simultaneous information and energy transmission in the interference channel, 2017.
URL : https://hal.archives-ouvertes.fr/hal-01629051

K. Kobayashi and T. S. Han, A further consideration on the HK and the CMG regions for the interference channel, Information Theory and Applications Workshop (ITA)

S. Diego, . Ca, and . Usa, , p.15, 2007.

E. Koutsoupias and C. Papadimitriou, Worst-case equilibria, Proc. 16th Annual Symposium on Theoretical Aspects of Computer Science, vol.76, 1999.

G. Kramer, Outer bounds on the capacity of Gaussian interference channels, IEEE Trans. Inf. Theory, vol.50, issue.3, pp.581-586, 2004.

G. Kramer, Feedback strategies for white Gaussian interference networks, IEEE Trans. Inf. Theory, vol.50, issue.6, pp.1373-1374, 2004.

G. Kramer, Feedback strategies for white Gaussian interference networks, IEEE Trans. Inf. Theory, vol.48, issue.6, pp.1423-1438, 2002.

G. Kramer, I. Mari?, and R. D. Yates, Cooperative communications, 2007.

A. Lapidoth and M. Wigger, On the AWGN MAC with imperfect feedback, IEEE Trans. Inf. Theory, vol.56, pp.5432-5476, 2010.

S. Lasaulce and H. Tembine, Game theory and learning in wireless networks: Fundamentals and applications, 2011.

S. Le, R. Tandon, M. Motani, and H. V. Poor, The Capacity Region of the Symmetric Linear Deterministic Interference Channel with Partial Feedback, Proc. 50th Annual Allerton Conference on Communication, Control, and Computing (Allerton), p.19, 2012.

S. Le, R. Tandon, M. Motani, and H. V. Poor, Approximate capacity region for the symmetric Gaussian interference channel with noisy feedback, IEEE Trans. Inf. Theory, vol.61, pp.3737-3762, 2002.

D. J. Mackay, Information theory, inference, and learning algorithms, vol.222, p.221, 2003.

R. Mceliece, The theory of information and coding, 2004.

P. Mertikopoulos, E. V. Belmega, A. L. Moustakas, and S. Lasaulce, Distributed learning policies for power allocation in multiple access channels, IEEE Journal on Selected Areas in Communications, vol.30, issue.1, pp.96-106, 2012.
URL : https://hal.archives-ouvertes.fr/hal-00648840

S. Mohajer, R. Tandon, and H. V. Poor, On the feedback capacity of the fully connected-user interference channel, IEEE Trans. Inf. Theory, vol.59, issue.5, pp.2863-2881, 2013.

A. S. Motahari and A. K. Khandani, Capacity bounds for the Gaussian interference channel, IEEE Trans. Inf. Theory, vol.55, pp.620-643, 2009.

J. F. Nash, Equilibrium points in n-person games, Proc. National Academy of Sciences of the United States of America, vol.36, pp.48-49, 1950.

N. Nisan, T. Roughgarden, É. Tardos, and V. V. Vazirani, Algorithmic game theory, 2007.

L. H. Ozarow, The capacity of the white Gaussian multiple access channel with feedback, IEEE Trans. Inf. Theory, vol.30, issue.4, pp.623-629, 1984.

L. H. Ozarow and S. Leung-yan-cheong, An achievable region and outer bound for the Gaussian broadcast channel with feedback, IEEE Trans. Inf. Theory IT, vol.30, issue.4, pp.667-671, 1984.

V. M. Pabhakaran and P. Viswanath, Interference channel with source cooperation, IEEE Trans. Inf. Theory, vol.57, p.29, 2011.

S. M. Perlaza, S. Lasaulce, and M. Debbah, Equilibria of channel selection games in parallel multiple access ahannels, EURASIP Journal in Wireless Communications Networks, issue.15, pp.1-23, 2013.

S. M. Perlaza, R. Tandon, H. V. Poor, and Z. Han, The Nash equilibrium region of the linear deterministic interference channel with feedback, Proc. 50th Annual Allerton Conference on Communications, Control, and Computing, 2012.
URL : https://hal.archives-ouvertes.fr/hal-01280970

S. M. Perlaza, R. Tandon, H. V. Poor, and Z. Han, Perfect output feedback in the two-user decentralized interference channel, IEEE Trans. Inf. Theory, vol.61, pp.5441-5462, 2015.
DOI : 10.1109/tit.2015.2467387
URL : https://hal.archives-ouvertes.fr/hal-01216857

S. M. Perlaza, R. Tandon, and H. V. Poor, Decentralized interference channels with noisy feedback possess Pareto optimal Nash equilibria, Proc. of the 6th International Symposium on Communications, Control, and Signal Processing, 2014.
DOI : 10.1109/isccsp.2014.6877900
URL : https://hal.archives-ouvertes.fr/hal-00957146

S. M. Perlaza, R. Tandon, and H. V. Poor, Symmetric decentralized interference channels with noisy feedback, Proc. IEEE Intl. Symposium on Information Theory (ISIT), 2014.
DOI : 10.1109/isit.2014.6874987
URL : https://hal.archives-ouvertes.fr/hal-00983991

V. Quintero, S. M. Perlaza, I. Esnaola, and J. Gorce, Approximate capacity of the Gaussian interference channel with noisy channel-output feedback, Proc. IEEE Information Theory Workshop (ITW), 2016.
URL : https://hal.archives-ouvertes.fr/hal-01293921

V. Quintero, S. M. Perlaza, I. Esnaola, and J. Gorce, Approximate capacity region of the two-user Gaussian interference channel with noisy channel-output feedback, IEEE Trans. Inf. Theory, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01397118

V. Quintero, S. M. Perlaza, I. Esnaola, and J. Gorce, When does output feedback enlarge the capacity of the interference channel?, In: IEEE Trans. Commun, vol.66, issue.2, pp.615-628, 2018.
URL : https://hal.archives-ouvertes.fr/hal-01432525

V. Quintero, S. M. Perlaza, and J. Gorce, Noisy channel-output feedback capacity of the linear deterministic interference channel, IEEE Information Theory Workshop, 2015.
URL : https://hal.archives-ouvertes.fr/hal-01207339

V. Quintero, S. M. Perlaza, J. Gorce, and H. V. Poor, Decentralized interference channels with noisy output feedback, 2017.
URL : https://hal.archives-ouvertes.fr/hal-01462248

V. Quintero, S. M. Perlaza, J. Gorce, and H. V. Poor, Nash region of the linear deterministic interference channel with noisy output feedback, Proc. IEEE International Symposium on Information Theory (ISIT), 2017.
URL : https://hal.archives-ouvertes.fr/hal-01520799

Z. Ram, Lattice Coding for Signals and Networks, 2014.

L. Rose, S. M. Perlaza, and M. Debbah, On the Nash equilibria in decentralized parallel interference channels, Proc. IEEE Intl. Conference on Communications (ICC), 2011.
DOI : 10.1109/iccw.2011.5963531
URL : https://hal.archives-ouvertes.fr/hal-00553531

H. Royden and P. Fitzpatrick, Real analysis, 2014.

S. Saha and R. Berry, On information theoretic games for interference networks, Proc. 44th Asilomar Conference on Signals, Systems and Computers, 2010.
DOI : 10.1109/acssc.2010.5757523
URL : http://www.ece.northwestern.edu/%7Erberry/Pubs/AsilomarSaha2010.pdf

A. Sahai, V. Aggarwal, M. Yüksel, and A. Sabharwal, On Channel Output Feedback in Deterministic Interference Channels, Proc. IEEE Information Theory Workshop, 2009.
DOI : 10.1109/itw.2009.5351427
URL : http://arxiv.org/pdf/0905.2392

A. Sahai, V. Aggarwal, M. Yuksel, and A. Sabharwal, Capacity of all nine models of channel output feedback for the two-user interference channel, IEEE Trans. Inf. Theory, vol.59, pp.6957-6979, 2013.

H. Sato, The capacity of the Gaussian interference channel under strong interference, IEEE Trans. Inf. Theory, vol.27, pp.786-788, 1981.

H. Sato, Two-user communication channels, IEEE Trans. Inf. Theory, vol.23, pp.295-304, 1977.

X. Shang, G. Kramer, C. , and B. , A new outer bound and the noisy-interference sum-rate capacity for Gaussian interference channels, IEEE Trans. Inf. Theory, vol.55, issue.2, pp.689-699, 2009.

C. E. Shannon, The zero-error capacity of a noisy channel, IRE Transactions on Information Theory, vol.2, issue.3, pp.8-19, 1956.

C. E. Shannon, A mathematical theory of communication, The Bell System Technical Journal, vol.27, issue.3, pp.379-423, 1948.

C. E. Shannon, Channels with side information at the transmitter, In: IBM Journal of Research and Development, vol.2, issue.4, pp.289-293, 1958.

O. Shayevitz and M. Wigger, On the capacity of the discrete memoryless broadcast channel with feedback, IEEE Trans. Inf. Theory To appear, issue.2, 2013.

C. Suh and D. N. Tse, Feedback capacity of the Gaussian interference channel to within 2 bits, IEEE Trans. Inf. Theory, vol.57, issue.5, pp.2667-2685, 2002.

R. Tandon and S. Ulukus, Dependence balance based outer bounds for Gaussian networks with cooperation and feedback, IEEE Trans. Inf. Theory, vol.57, issue.7, pp.4063-4086, 2011.

R. Tandon, S. Mohajer, and H. V. Poor, On the symmetric feedback capacity of the K-user cyclic Z-interference channel, IEEE Trans. Inf. Theory, vol.59, issue.5, pp.2713-2734, 2013.

J. A. Thomas, Feedback can at most double Gaussian multiple access channel capacity, IEEE Trans. Inf. Theory, vol.33, pp.711-716, 1987.

D. Tuninetti, An outer bound for the memoryless two-user interference channel with general cooperation, IEEE Information Theory Workshop (ITW), pp.217-221, 2012.

D. Tuninetti, An outer bound region for interference channels with generalized feedback, IEEE Information Theory and Applications Workshop (ITA), pp.1-5, 2010.

D. Tuninetti, On interference channel with generalized feedback (IFC-GF), Proc. of International Symposium on Information Theory (ISIT), pp.2661-2665, 2007.

A. Vahid, C. Suh, and A. S. Avestimehr, Interference channels with rate-limited feedback, IEEE Trans. Inf. Theory, vol.58, issue.5, pp.2788-2812, 2012.

R. Venkataramanan and S. S. Pradhan, An achievable rate region for the broadcast channel with feedback, IEEE Trans. Inf. Theory, vol.59, issue.10, pp.6175-6191, 2013.

F. Willems, The feedback capacity region of a class of discrete memoryless multiple access channels, IEEE Trans. Inf. Theory, vol.28, issue.1, pp.93-95, 1982.

F. M. Willems, Information theoretical results for multiple access channels, 1982.

F. M. Willems and E. C. Van-der-meulen, The discrete memoryless multiple-access channel with cribbing encoders, IEEE Trans. Inf. Theory IT, vol.31, issue.3, pp.313-327, 1985.

Y. Wu and M. Wigger, Any positive feedback rate increases the capacity of strictly less-noisy broadcast channels, Information Theory Workshop, pp.1-5, 2013.

Y. Wu and M. Wigger, Coding schemes with rate-limited feedback that improve over the no feedback capacity for a large class of broadcast channels, IEEE Trans. Inf. Theory, vol.62, pp.2009-2033, 2016.

S. Yang and D. Tuninetti, Interference channel with generalized feedback (a.k.a. with source cooperation): Part I: Achievable Region, IEEE Trans. Inf. Theory, vol.5, pp.2686-2710, 2011.

R. D. Yates, D. Tse, L. , and Z. , Secret communication on interference channels, Proc. of the IEEE International Symposium on Information Theory (ISIT), vol.32, 2008.

R. W. Yeung, Information theory and network coding, vol.222, p.231, 2008.

L. Zhou and W. Yu, On the capacity of the K-user cyclic Gaussian interference channel, IEEE Trans. Inf. Theory, vol.59, issue.1, pp.154-165, 2013.