H. Bandelt and A. Dress, Split decomposition theory for metrics on a finite set, Adv Math, vol.92, pp.47-105, 1992.

P. Buneman, The recovery of trees from measures of dissimilarity, Mathematics in the archeological and historical sciences, pp.387-395, 1971.

M. W. Cadotte, T. J. Davies, J. Regetz, S. W. Kembel, C. E. Oakley et al., Phylogenetic diversity metrics for ecological communities: integrating species richness, abundance and evolutionary history, Ecol Lett, vol.13, pp.96-105, 2010.

R. H. Crozier, L. J. Dunnett, and P. Agapow, Phylogenetic biodiversity assessment based on systematic nomenclature, Evol Bioinform Online, vol.1, pp.11-36, 2005.

R. Desper and O. Gascuel, The minimum evolution distance-based approach to phylogenetic inference, Gascuel O (ed) Mathematics of evolution and phylogeny, pp.1-32, 2005.

D. P. Faith, Conservation evaluation and phylogenetic diversity, Biol Conserv, vol.61, pp.91201-91204, 1992.

D. P. Faith, The role of the phylogenetic diversity measure, PD, in bio-informatics: getting the definition right, Evol Bioinform Online, vol.2, pp.277-283, 2006.

M. Fuchs and E. Y. Jin, Equality of Shapley value and fair proportion index in phylogenetic trees, J Math Biol, vol.71, pp.1133-1147, 2015.

M. Fuchs and A. R. Paningbatan, Correlation between Shapley values of rooted phylogenetic trees under the beta-splitting model, J Math Biol, 2019.

C. J. Haake, A. Kashiwada, and F. E. Su, The Shapley value of phylogenetic trees, J Math Biol, vol.56, pp.479-497, 2007.

K. Hartmann, The equivalence of two phylogenetic biodiversity measures: the Shapley value and fair proportion index, J Math Biol, vol.67, pp.1163-1170, 2013.

E. L. Jensen, A. Ø. Mooers, A. Caccone, and M. A. Russello, I-HEDGE: determining the optimum complementary sets of taxa for conservation using evolutionary isolation, PeerJ, vol.4, p.2350, 2016.

M. Kendall, A new measure of rank correlation, Biometrika, vol.30, pp.81-89, 1938.

N. L. Kleinberg and J. H. Weiss, A new formula for the Shapley value, Econ Lett, vol.18, issue.85, pp.90249-90255, 1985.

I. Martyn, T. S. Kuhn, A. Ø. Mooers, V. Moulton, and A. Spillner, Computing evolutionary distinctiveness indices in large scale analysis, Algorithm Mol Biol, vol.7, 2012.

B. Q. Minh, S. Klaere, V. Haeseler, and A. , Taxon selection under split diversity, Syst Biol, vol.57, pp.586-594, 2009.

D. W. Redding and A. Ø. Mooers, Incorporating evolutionary measures into conservation prioritization, Conserv Biol, vol.20, pp.1670-1678, 2006.

D. W. Redding, F. Mazel, and A. Ø. Mooers, Measuring evolutionary isolation for conservation, PLoS ONE, vol.9, issue.12, p.113490, 2014.

U. G. Rothblum, Combinatorial representations of the Shapley value based on average relative payoffs, Shapley value: essays in honor of Lloyd S. Shapley, pp.121-126, 1988.

C. Semple and M. Steel, Oxford Shapley LS (1953) A value for n-person games, Contributions to to the theory of games, vol.II, pp.307-324, 2003.

C. Spearman, The proof and measurement of association between two things, Am J Psychol, vol.15, pp.72-101, 1904.

L. Volkmann, M. I. Moulton, V. Spillner, A. Mooers, and A. Ø. , Prioritizing populations for conservation using phylogenetic networks, PLoS ONE, vol.9, issue.2, p.88945, 2014.

M. L. Weitzman, The Noah's Ark problem, Econometrica, vol.66, pp.1279-1298, 1998.

K. Wicke and M. Fischer, Comparing the rankings obtained from two biodiversity indices: the Fair Proportion Index and the Shapley Value, J Theor Biol, vol.430, pp.207-214, 2017.

K. Wicke and M. Fischer, On the Shapley value of unrooted phylogenetic trees, Bull Math Biol, vol.81, pp.618-638, 2019.