@article{webb1964nomenclature,
    author = "WEBB, EDWIN C.",
    title = "Nomenclature of Multiple Enzyme Forms",
    year = "1964",
    journal = "Nature",
    url = "https://doi.org/10.1038/203821a0",
    doi = "10.1038/203821a0",
    number = "4947",
    pages = "821-821",
    volume = "203"
}

@article{crusafontpairo1970the,
    author = "Crusafont-Pairo, M. and Reguant, S.",
    title = "The Nomenclature of Intermediate Forms",
    year = "1970",
    journal = "Systematic Zoology",
    url = "https://doi.org/10.2307/2412209",
    doi = "10.2307/2412209",
    number = "3",
    pages = "254",
    volume = "19"
}

@misc{crusafontpairo1970the2,
    author = "Crusafont-Pairo, M. and Reguant, S",
    title = "The nomenclature of intermediate forms",
    year = "1970",
    howpublished = "Systematic Zoology, v. 19, p. 254-257",
    note = "talkorigins\_source = {true}; raw\_reference = {Crusafont-Pairo, M., and Reguant, S., 1970, The nomenclature of intermediate forms: Systematic Zoology, v. 19, p. 254-257.}"
}

@article{bird1971on,
    author = "Bird, S. O.",
    title = "On Interpolative Open Nomenclature",
    year = "1971",
    journal = "Systematic Zoology",
    url = "https://doi.org/10.2307/2412123",
    doi = "10.2307/2412123",
    number = "4",
    pages = "469",
    volume = "20"
}

@misc{bird1971on1,
    author = "Bird, S. O",
    title = "On interpolative open nomenclature",
    year = "1971",
    howpublished = "Systematic Zoology, v. 20, p. 469",
    note = "talkorigins\_source = {true}; raw\_reference = {Bird, S. O., 1971, On interpolative open nomenclature: Systematic Zoology, v. 20, p. 469.}"
}

@article{maglio1971the,
    author = "Maglio, Vincent J.",
    title = "The Nomenclature of Intermediate Forms: An Opinion",
    year = "1971",
    journal = "Systematic Zoology",
    url = "https://doi.org/10.2307/2412350",
    doi = "10.2307/2412350",
    number = "3",
    pages = "370",
    volume = "20"
}

@article{radojevic2005interpolative,
    author = "Radojevic, Dragan",
    title = "Interpolative relations and interpolative preference structures",
    year = "2005",
    journal = "Yugoslav Journal of Operations Research",
    abstract = "Relations are very important mathematical objects in different fields of theory and applications. In many real applications, for which gradation of relations is immanent, the classical relations are not adequate. Interpolative relations (I-relations) (as fuzzy relations) are the generalization of classical relations so that the value (intensity) of a relation is an element from a real interval [0, 1] and not only from {0, 1} as in the classical case. The theory of I-relations is crucially different from the theory of fuzzy relations. I-relations are consistent generalizations of classical relations and, contrary to fuzzy relations, all laws of classical relations (set-theoretical laws) are preserved in general case. In this paper, the main characteristics of I-relations are illustrated on the interpolative preference structures (I-preference structures) as consistent generalization of classical preference structures.",
    url = "https://doi.org/10.2298/yjor0502171r",
    doi = "10.2298/yjor0502171r",
    number = "2",
    pages = "171-189",
    volume = "15"
}

@article{fulga2021on,
    author = "Fulga, Andreea",
    title = "On interpolative contractions that involve rational forms",
    year = "2021",
    journal = "Advances in Difference Equations",
    abstract = "The aim of this paper is to investigate the interpolative contractions involving rational forms in the framework of b -metric spaces. We prove the existence of a fixed point of such a mapping with different combinations of the rational forms. A certain example is considered to indicate the validity of the observed result.",
    url = "https://doi.org/10.1186/s13662-021-03605-4",
    doi = "10.1186/s13662-021-03605-4",
    number = "1",
    volume = "2021"
}

@article{crossref2023an,
    title = "An open discussion: Interpolative Metric Spaces",
    year = "2023",
    journal = "Advances in the Theory of Nonlinear Analysis and its Application",
    url = "https://doi.org/10.17762/atnaa.v7.i5.323",
    doi = "10.17762/atnaa.v7.i5.323"
}

@article{öztuk2023on,
    author = "Öztuk, Ali",
    title = "On interpolative R-Meir-Keeler contractions of rational forms",
    year = "2023",
    journal = "Filomat",
    abstract = "In this article, the notion of rational interpolative Meir-Keeler type contraction is discussed. The existence and uniqueness of a fixed point for interpolative Meir-Keeler contraction of rational Das-Gupta are investigated. The obtained results improve and generalize the existing results on the topic in the recent literature.",
    url = "https://doi.org/10.2298/fil2309879o",
    doi = "10.2298/fil2309879o",
    number = "9",
    pages = "2879-2885",
    volume = "37"
}