A Model of the Optimal Selection of Crypto Assets

Andrei Kirilenko; Silvia Bartolucci

arxiv: 1906.09632 · v1 · pith:K4JCWIWWnew · submitted 2019-06-23 · 💻 cs.CY · q-fin.RM· q-fin.ST

A Model of the Optimal Selection of Crypto Assets

Silvia Bartolucci , Andrei Kirilenko This is my paper

Pith reviewed 2026-05-25 17:38 UTC · model grok-4.3

classification 💻 cs.CY q-fin.RMq-fin.ST

keywords crypto assetsoptimal selectionsecurity and stabilitypairwise comparisonsrecommender modelinvestor attitudesemergent outcomessimulation

0 comments

The pith

Investors reach optimal crypto selections by comparing asset pairs until expected economic benefits stop improving.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper presents a framework in which crypto assets are distinguished by security and stability features. Investors evaluate pairs of assets through a process modeled on a recommender app that weighs those features, the choices of other investors, and projected future benefits. They keep making pairwise adoption decisions across all possible pairs until further changes yield no additional expected benefit. Simulations that vary investor attitudes toward the two features produce multiple distinct patterns of asset adoption and investment allocation in the broader crypto ecosystem.

Core claim

Investors reach an optimal selection decision by continuing to compare pairs of crypto assets until their expected future economic benefits can no longer be improved upon. The model treats the comparison process as guided by an app that incorporates each asset's security-stability profile, aggregate adoption information from other investors, and benefit projections, with simulations showing that different investor preference types generate varied emergent investment outcomes.

What carries the argument

The recommender-app comparison process that presents asset pairs and recommends adoptions based on security-stability features, collective choices, and expected benefits until no further improvement is possible.

If this is right

Optimal selections emerge from the interaction between security and stability attributes across the full set of assets.
Different investor types, defined by their weighting of features, produce distinct patterns of asset holdings.
The process converges to a stable allocation once pairwise improvements are exhausted.
Collective adoption data influences individual recommendations and therefore shapes the final portfolio.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The framework implies that providing investors with accurate information on others' choices could accelerate convergence to certain asset sets.
It could be extended to test whether adding network effects or liquidity constraints changes which allocations count as optimal.
The model suggests that policy interventions altering perceived stability might shift the entire distribution of simulated outcomes.
Real-time data on pairwise comparison activity might serve as an early indicator of which assets are approaching adoption saturation.

Load-bearing premise

The recommender app can correctly judge whether an adoption improves expected benefits and investors will keep comparing pairs until no further gains remain available.

What would settle it

Track whether actual crypto investors cease changing their holdings once information on others' choices and benefit projections indicates no further expected improvement, or check whether simulated adoption patterns under different preference types match observed market distributions.

Figures

Figures reproduced from arXiv: 1906.09632 by Andrei Kirilenko, Silvia Bartolucci.

**Figure 2.** Figure 2: Schematic representation of the crypto assets dynamics. [PITH_FULL_IMAGE:figures/full_fig_p008_2.png] view at source ↗

**Figure 3.** Figure 3: Top: Optimal assets selection outcome in the adoption-expected return space. Simulation with [PITH_FULL_IMAGE:figures/full_fig_p010_3.png] view at source ↗

**Figure 4.** Figure 4: Optimal assets selection outcome in the adoption-expected return space. Simulation with [PITH_FULL_IMAGE:figures/full_fig_p011_4.png] view at source ↗

**Figure 5.** Figure 5: Total expected return in time for different [PITH_FULL_IMAGE:figures/full_fig_p011_5.png] view at source ↗

**Figure 6.** Figure 6: Optimal assets selection outcome in the adoption-expected return space. Simulation with [PITH_FULL_IMAGE:figures/full_fig_p012_6.png] view at source ↗

**Figure 7.** Figure 7: Optimal assets selection outcome in the adoption-expected return space. Simulation with [PITH_FULL_IMAGE:figures/full_fig_p012_7.png] view at source ↗

**Figure 8.** Figure 8: Phase diagram of the system varying the parameters [PITH_FULL_IMAGE:figures/full_fig_p014_8.png] view at source ↗

**Figure 9.** Figure 9: Numerical estimation of β 0 as a function of β according to Eq. (14), given π 0 (s), πˆ 0 (ξ) uniform and (i) π(s) = 1, πˆ(ξ) = 1 (uniform pdf with s, ξ ∈ [0, 1]) and (ii) π(s) = 2s, πˆ(ξ) = 2ξ (triangular pdf with s, ξ ∈ [0, 1]). Therefore, we simulate a system with π(s) = ˆπ(ξ) = 1 uniform between [0, 1] and one where the features are extracted from a triangular pdf in [0, 1]: π(s) = 2s, πˆ(ξ) = 2ξ. In … view at source ↗

**Figure 10.** Figure 10: Mean (and variance) of the probability of not being adopted per asset class for the following scenario [PITH_FULL_IMAGE:figures/full_fig_p015_10.png] view at source ↗

**Figure 11.** Figure 11: Simulation with N = 200 crypto assets, δ = 0.1 and ns = 300. Top: Optimal assets selection outcome in the adoption-expected return space for the case of heterogeneous investors (left) and homogeneous investors with hβ1i = 1.234 and hβ2i = 1.549 (right). Bottom: Distribution of mean probability of not being adopted 1 − a, conditioned on the assets’ class χ, P(1 − a|χ) for the heterogeneous (left) and homog… view at source ↗

read the original abstract

We propose a modelling framework for the optimal selection of crypto assets. Crypto assets differ by two essential features: security (technological) and stability (governance). Investors make choices over crypto assets similarly to how they make choices by using a recommender app: the app presents each investor with a pair of crypto assets with certain security-stability characteristics to be compared. Each investor submits its preference for adopting one of the two assets to the app. The app, in turn, provides a recommendation on whether the proposed adoption is sensible given the assets' essential features, information about the adoption choices of all other investors, and expected future economic benefits of adoption. Investors continue making their adoption choices over all pairs of crypto assets until their expected future economic benefits can no longer be improved upon. This constitutes an optimal selection decision. We simulate optimal selection decisions considering the behaviour of different types of investors, driven by their attitudes towards assets' features. We find a variety of possible emergent outcomes for the investments in the crypto-ecosystem and the future adoption of the crypto assets.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper sketches a pairwise recommender simulation for crypto asset adoption but leaves the optimality claim as an ungrounded assumption with no utility function or convergence argument supplied.

read the letter

The main point is that this work models investor choices over crypto assets as repeated pairwise comparisons, where a recommender app weighs security-stability features, other investors' actions, and expected benefits until no further gain is possible, and then runs simulations across investor types to show varied adoption patterns emerge. The recommender analogy is the clearest new framing here, and it does a reasonable job of linking individual attitudes to collective outcomes in a crypto setting without overclaiming empirical fit. The simulations are at least described as producing a range of results rather than a single predicted path, which keeps the exercise exploratory rather than overfitted. The central weakness is that the abstract supplies no utility function, no formula for expected benefits, no aggregation rule across investors, and no argument that the stopping condition actually delivers a global or even local optimum instead of an arbitrary halt. Without those pieces the optimality label rests on modeling choice rather than derivation, and the simulation outcomes cannot be checked for robustness or sensitivity to the missing components. The citation pattern is light on prior choice or game models that already handle similar pairwise or tâtonnement processes, so it is hard to judge how much the framework adds beyond the analogy. This is for readers already working on agent-based or simulation models of digital asset markets who want a quick conceptual sketch to adapt or extend. It is not ready for readers needing formal results or validated predictions. I would send it to peer review because the idea is coherent enough on its own terms to benefit from referee input on how to add the missing definitions and checks, even if heavy revision is likely.

Referee Report

2 major / 0 minor

Summary. The paper proposes a modeling framework for the optimal selection of crypto assets that differ in security (technological) and stability (governance) features. Investors compare asset pairs via a recommender app that incorporates asset features, other investors' adoption choices, and expected future economic benefits; pairwise choices continue until no further improvement in expected benefits is possible, which the paper asserts constitutes an optimal selection. Simulations across investor types (differing in attitudes toward features) are said to produce a variety of emergent outcomes for the crypto ecosystem.

Significance. If the optimality claim were formally derived and the simulations were reproducible with explicit utility functions and convergence conditions, the framework could contribute to agent-based modeling of technology adoption in decentralized systems. However, the absence of any such formalization means the work does not yet deliver a testable or derivable result.

major comments (2)

[Abstract] Abstract: the central claim that repeated pairwise comparisons 'constitute an optimal selection decision' is unsupported; no utility function, no expression for 'expected future economic benefits,' no aggregation rule across investors, and no argument establishing that the described process reaches a fixed point or global optimum are supplied.
[Abstract] Abstract: the statement that 'simulations ... produce a variety of possible emergent outcomes' cannot be evaluated because the manuscript provides neither the model equations, the recommender logic, the investor-type parameterizations, nor any stopping rule or validation procedure.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for highlighting issues in the abstract. The manuscript presents a conceptual framework rather than a fully formalized mathematical model with explicit proofs. We will revise the abstract for clarity and precision on the claims made, while noting that the core contribution is the iterative preference process and simulation outcomes. No standing objections beyond what is addressed below.

read point-by-point responses

Referee: [Abstract] Abstract: the central claim that repeated pairwise comparisons 'constitute an optimal selection decision' is unsupported; no utility function, no expression for 'expected future economic benefits,' no aggregation rule across investors, and no argument establishing that the described process reaches a fixed point or global optimum are supplied.

Authors: We agree the abstract overstates the claim without supporting detail. The described process defines optimality locally as the point where no further pairwise improvement in expected benefits is possible, drawing on recommender-style iteration with network effects from other investors. This is not asserted as a proven global optimum. We will revise the abstract to qualify the claim as a local equilibrium reached via iterative pairwise choices and add a brief note on the implicit utility (security-stability features plus adoption externalities). revision: yes
Referee: [Abstract] Abstract: the statement that 'simulations ... produce a variety of possible emergent outcomes' cannot be evaluated because the manuscript provides neither the model equations, the recommender logic, the investor-type parameterizations, nor any stopping rule or validation procedure.

Authors: The full manuscript describes the recommender logic (pairwise feature comparison incorporating other investors' choices and benefits), investor types (parameterized by attitudes to security vs. stability), and stopping when no improvement occurs. However, the abstract is too terse to convey this. We will revise the abstract to reference the simulation parameterization and emergent outcomes more explicitly, and ensure the main text highlights the equations and convergence rule if not already prominent. revision: yes

Circularity Check

1 steps flagged

Optimality of selection process asserted by equating it to the stopping condition of pairwise comparisons

specific steps

self definitional [Abstract]
"Investors continue making their adoption choices over all pairs of crypto assets until their expected future economic benefits can no longer be improved upon. This constitutes an optimal selection decision."

The text defines the iterative pairwise process and its stopping condition, then directly states that this stopping point 'constitutes an optimal selection decision.' Optimality is therefore true by the construction of the stopping rule rather than derived from independent premises such as a utility function or global optimization argument.

full rationale

The paper's central claim equates the described tâtonnement process to optimality solely via the stopping rule of no further improvement in expected benefits. This is self-definitional rather than derived from an explicit utility function, equilibrium condition, or convergence proof. No equations, self-citations, or fitted-parameter predictions appear in the provided text to create additional circular reductions. The simulation outcomes are presented as emergent from investor types but are not shown to be forced by the optimality definition itself.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Only the abstract is available. No free parameters, axioms, or invented entities are specified in the provided text. The framework appears to rely on unstated assumptions about how the recommender app computes recommendations and how investor types are parameterized, but these cannot be enumerated.

pith-pipeline@v0.9.0 · 5713 in / 1241 out tokens · 29857 ms · 2026-05-25T17:38:45.731556+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

33 extracted references · 33 canonical work pages

[1]

Antonopoulos, A. M. (2014). Mastering Bitcoin: unlocking digital cryptocurrencies. O’Reilly Media, Inc

work page 2014
[2]

Tasca, P. (2015). Digital currencies: Principles, trends, opportunities, and risks. Trends, Opportunities, and Risks (September 7, 2015)

work page 2015
[3]

Aste, T., Tasca, P., & Di Matteo, T. (2017). Blockchain technologies: The foreseeable impact on society and industry. Computer, 50(9), 18-28

work page 2017
[4]

Nakamoto, S. (2008). Bitcoin: A peer-to-peer electronic cash system

work page 2008
[5]

Venter, H. (2018). Digital currency – A case for standard setting activity. A perspective by the Australian Accounting Standards Board (AASB). 16

work page 2018
[6]

L., & Garratt, R

Bech, M. L., & Garratt, R. (2017). Central bank cryptocurrencies. BIS Quarterly Review September. https: //www.bis.org/publ/qtrpdf/r_qt1709f.htm

work page 2017
[7]

S., & Halaburda, H

Fung, B. S., & Halaburda, H. (2016). Central bank digital currencies: a framework for assessing why and how. Bank of Canada https://ssrn.com/abstract=2994052

work page 2016
[8]

(2019) Central bank digital currencies and private banks

Andolfatto, D. (2019) Central bank digital currencies and private banks. In The economics of ﬁntech and digital currencies VoxEU.org eBook, CEPR Press

work page 2019
[9]

Andolfatto, D. (2018). Assessing the Impact of Central Bank Digital Currency on Private Banks. FRB St. Louis Working Paper, (2018-25)

work page 2018
[10]

Blockchain, https://www.blockchain.com/ru/static/pdf/ StablecoinsReportFinal.pdf

The State of Stablecoins. Blockchain, https://www.blockchain.com/ru/static/pdf/ StablecoinsReportFinal.pdf

work page
[11]

”CryptoNote v 2.0.” (2013)

Van Saberhagen, Nicolas. ”CryptoNote v 2.0.” (2013). https://cryptonote.org/whitepaper.pdf

work page 2013
[12]

B., Chiesa, A., Garman, C., Green, M., Miers, I., Tromer, E., & Virza, M

Sasson, E. B., Chiesa, A., Garman, C., Green, M., Miers, I., Tromer, E., & Virza, M. (2014, May). Zerocash: Decentralized anonymous payments from bitcoin. In 2014 IEEE Symposium on Security and Privacy (pp. 459-474)

work page 2014
[13]

Oliveira, L., Zavolokina, L., Bauer, I., & Schwabe, G. (2018). To Token or not to Token: Tools for Under- standing Blockchain Tokens. ICIS 2018 Proceedings

work page 2018
[14]

Tasca, P., & Tessone, C. J. (2019). A Taxonomy of Blockchain Technologies: Principles of Identiﬁcation and Classiﬁcation. Ledger, 4.https://doi.org/10.5195/ledger.2019.140

work page doi:10.5195/ledger.2019.140 2019
[15]

Wu, K., Wheatley, S., & Sornette, D. (2018). Classiﬁcation of cryptocurrency coins and tokens by the dynamics of their market capitalizations. Royal Society Open Science, 5(9), 180381

work page 2018
[16]

Auer, R. (2019). Beyond the Doomsday Economics of ’Proof-of-Work’ in Cryptocurrencies. BIS Working Papers No 765

work page 2019
[17]

Houy, N. (2014). The economics of Bitcoin transaction fees. GATE WP, 1407

work page 2014
[18]

Aste, T. (2016). The fair cost of Bitcoin proof of work. Available at SSRN 2801048

work page 2016
[19]

Sockin, M., & Xiong, W. (2018). A model of cryptocurrencies. Unpublished manuscript, Princeton University

work page 2018
[20]

Schilling, L., & Uhlig, H. (2018). Some simple bitcoin economics (No. w24483). National Bureau of Economic Research

work page 2018
[21]

Chiu, J., & Koeppl, T. V. (2017). The economics of cryptocurrencies–bitcoin and beyond. Available at SSRN 3048124

work page 2017
[22]

Cocco, L., Concas, G., & Marchesi, M. (2017). Using an artiﬁcial ﬁnancial market for studying a cryptocur- rency market. Journal of Economic Interaction and Coordination, 12(2), 345-365

work page 2017
[23]

Luther, W. J. (2016). Cryptocurrencies, network eﬀects, and switching costs. Contemporary Economic Policy, 34(3), 553-571

work page 2016
[24]

Dowd, K., & Greenaway, D. (1993). Currency competition, network externalities and switching costs: Towards an alternative view of optimum currency areas. The Economic Journal, 103(420), 1180-1189

work page 1993
[25]

ElBahrawy, A., Alessandretti, L., Kandler, A., Pastor-Satorras, R., & Baronchelli, A. (2017). Evolutionary dynamics of the cryptocurrency market. Royal Society open science, 4(11), 170623

work page 2017
[26]

M., & Baronchelli, A

Alessandretti, L., ElBahrawy, A., Aiello, L. M., & Baronchelli, A. (2018). Machine learning the cryptocurrency market. Available at SSRN 3183792

work page 2018
[27]

Pappalardo, G., Di Matteo, T., Caldarelli, G., & Aste, T. (2018). Blockchain ineﬃciency in the bitcoin peers network. EPJ Data Science, 7(1), 30. 17

work page 2018
[28]

Tasca, P., Hayes, A., & Liu, S. (2018). The evolution of the bitcoin economy: extracting and analyzing the network of payment relationships. The Journal of Risk Finance, 19(2), 94-126

work page 2018
[29]

M., & Baronchelli, A

Alessandretti, L., ElBahrawy, A., Aiello, L. M., & Baronchelli, A. (2018). Anticipating cryptocurrency prices using machine learning. Complexity, 2018

work page 2018
[30]

Aste, T. (2018). Cryptocurrency market structure: connecting emotions and economics. Special Issue of Digital Finance on Cryptocurrencies. Digital Finance. Smart Data Analytics, Investment Innovation, and Financial Technology. ISSN, 2524-6186

work page 2018
[31]

Abraham, J., Higdon, D., Nelson, J., & Ibarra, J. (2018). Cryptocurrency price prediction using tweet volumes and sentiment analysis. SMU Data Science Review, 1(3), 1

work page 2018
[32]

Martinelli, F. (1999). Lectures on Glauber dynamics for discrete spin models. In Lectures on probability theory and statistics (pp. 93-191). Springer

work page 1999
[33]

Huang, K. (2009). Introduction to Statistical Physics. Chapman and Hall/CRC. 18

work page 2009

[1] [1]

Antonopoulos, A. M. (2014). Mastering Bitcoin: unlocking digital cryptocurrencies. O’Reilly Media, Inc

work page 2014

[2] [2]

Tasca, P. (2015). Digital currencies: Principles, trends, opportunities, and risks. Trends, Opportunities, and Risks (September 7, 2015)

work page 2015

[3] [3]

Aste, T., Tasca, P., & Di Matteo, T. (2017). Blockchain technologies: The foreseeable impact on society and industry. Computer, 50(9), 18-28

work page 2017

[4] [4]

Nakamoto, S. (2008). Bitcoin: A peer-to-peer electronic cash system

work page 2008

[5] [5]

Venter, H. (2018). Digital currency – A case for standard setting activity. A perspective by the Australian Accounting Standards Board (AASB). 16

work page 2018

[6] [6]

L., & Garratt, R

Bech, M. L., & Garratt, R. (2017). Central bank cryptocurrencies. BIS Quarterly Review September. https: //www.bis.org/publ/qtrpdf/r_qt1709f.htm

work page 2017

[7] [7]

S., & Halaburda, H

Fung, B. S., & Halaburda, H. (2016). Central bank digital currencies: a framework for assessing why and how. Bank of Canada https://ssrn.com/abstract=2994052

work page 2016

[8] [8]

(2019) Central bank digital currencies and private banks

Andolfatto, D. (2019) Central bank digital currencies and private banks. In The economics of ﬁntech and digital currencies VoxEU.org eBook, CEPR Press

work page 2019

[9] [9]

Andolfatto, D. (2018). Assessing the Impact of Central Bank Digital Currency on Private Banks. FRB St. Louis Working Paper, (2018-25)

work page 2018

[10] [10]

Blockchain, https://www.blockchain.com/ru/static/pdf/ StablecoinsReportFinal.pdf

The State of Stablecoins. Blockchain, https://www.blockchain.com/ru/static/pdf/ StablecoinsReportFinal.pdf

work page

[11] [11]

”CryptoNote v 2.0.” (2013)

Van Saberhagen, Nicolas. ”CryptoNote v 2.0.” (2013). https://cryptonote.org/whitepaper.pdf

work page 2013

[12] [12]

B., Chiesa, A., Garman, C., Green, M., Miers, I., Tromer, E., & Virza, M

Sasson, E. B., Chiesa, A., Garman, C., Green, M., Miers, I., Tromer, E., & Virza, M. (2014, May). Zerocash: Decentralized anonymous payments from bitcoin. In 2014 IEEE Symposium on Security and Privacy (pp. 459-474)

work page 2014

[13] [13]

Oliveira, L., Zavolokina, L., Bauer, I., & Schwabe, G. (2018). To Token or not to Token: Tools for Under- standing Blockchain Tokens. ICIS 2018 Proceedings

work page 2018

[14] [14]

Tasca, P., & Tessone, C. J. (2019). A Taxonomy of Blockchain Technologies: Principles of Identiﬁcation and Classiﬁcation. Ledger, 4.https://doi.org/10.5195/ledger.2019.140

work page doi:10.5195/ledger.2019.140 2019

[15] [15]

Wu, K., Wheatley, S., & Sornette, D. (2018). Classiﬁcation of cryptocurrency coins and tokens by the dynamics of their market capitalizations. Royal Society Open Science, 5(9), 180381

work page 2018

[16] [16]

Auer, R. (2019). Beyond the Doomsday Economics of ’Proof-of-Work’ in Cryptocurrencies. BIS Working Papers No 765

work page 2019

[17] [17]

Houy, N. (2014). The economics of Bitcoin transaction fees. GATE WP, 1407

work page 2014

[18] [18]

Aste, T. (2016). The fair cost of Bitcoin proof of work. Available at SSRN 2801048

work page 2016

[19] [19]

Sockin, M., & Xiong, W. (2018). A model of cryptocurrencies. Unpublished manuscript, Princeton University

work page 2018

[20] [20]

Schilling, L., & Uhlig, H. (2018). Some simple bitcoin economics (No. w24483). National Bureau of Economic Research

work page 2018

[21] [21]

Chiu, J., & Koeppl, T. V. (2017). The economics of cryptocurrencies–bitcoin and beyond. Available at SSRN 3048124

work page 2017

[22] [22]

Cocco, L., Concas, G., & Marchesi, M. (2017). Using an artiﬁcial ﬁnancial market for studying a cryptocur- rency market. Journal of Economic Interaction and Coordination, 12(2), 345-365

work page 2017

[23] [23]

Luther, W. J. (2016). Cryptocurrencies, network eﬀects, and switching costs. Contemporary Economic Policy, 34(3), 553-571

work page 2016

[24] [24]

Dowd, K., & Greenaway, D. (1993). Currency competition, network externalities and switching costs: Towards an alternative view of optimum currency areas. The Economic Journal, 103(420), 1180-1189

work page 1993

[25] [25]

ElBahrawy, A., Alessandretti, L., Kandler, A., Pastor-Satorras, R., & Baronchelli, A. (2017). Evolutionary dynamics of the cryptocurrency market. Royal Society open science, 4(11), 170623

work page 2017

[26] [26]

M., & Baronchelli, A

Alessandretti, L., ElBahrawy, A., Aiello, L. M., & Baronchelli, A. (2018). Machine learning the cryptocurrency market. Available at SSRN 3183792

work page 2018

[27] [27]

Pappalardo, G., Di Matteo, T., Caldarelli, G., & Aste, T. (2018). Blockchain ineﬃciency in the bitcoin peers network. EPJ Data Science, 7(1), 30. 17

work page 2018

[28] [28]

Tasca, P., Hayes, A., & Liu, S. (2018). The evolution of the bitcoin economy: extracting and analyzing the network of payment relationships. The Journal of Risk Finance, 19(2), 94-126

work page 2018

[29] [29]

M., & Baronchelli, A

Alessandretti, L., ElBahrawy, A., Aiello, L. M., & Baronchelli, A. (2018). Anticipating cryptocurrency prices using machine learning. Complexity, 2018

work page 2018

[30] [30]

Aste, T. (2018). Cryptocurrency market structure: connecting emotions and economics. Special Issue of Digital Finance on Cryptocurrencies. Digital Finance. Smart Data Analytics, Investment Innovation, and Financial Technology. ISSN, 2524-6186

work page 2018

[31] [31]

Abraham, J., Higdon, D., Nelson, J., & Ibarra, J. (2018). Cryptocurrency price prediction using tweet volumes and sentiment analysis. SMU Data Science Review, 1(3), 1

work page 2018

[32] [32]

Martinelli, F. (1999). Lectures on Glauber dynamics for discrete spin models. In Lectures on probability theory and statistics (pp. 93-191). Springer

work page 1999

[33] [33]

Huang, K. (2009). Introduction to Statistical Physics. Chapman and Hall/CRC. 18

work page 2009