American Psychological Association 6th edition

Sepulcre, J. M., & Vidal, T. (2025). An extension of Bohr’s equivalence theorem to the case of exponential polynomials with distinct sets of frequencies. Annals of Functional Analysis, 16(4). https://doi.org/10.1007/s43034-025-00460-2

ISO-690 (author-date, English)

SEPULCRE, J. M. and VIDAL, T., 2025. An extension of Bohr’s equivalence theorem to the case of exponential polynomials with distinct sets of frequencies. Annals of Functional Analysis. 1 October 2025. Vol. 16, no. 4, . DOI 10.1007/s43034-025-00460-2.

Modern Language Association 9th edition

Sepulcre, J. M., and T. Vidal. “An Extension of Bohr’s Equivalence Theorem to the Case of Exponential Polynomials With Distinct Sets of Frequencies”. Annals of Functional Analysis, vol. 16, no. 4, Oct. 2025, https://doi.org/10.1007/s43034-025-00460-2.

Mohr Siebeck - Recht (Deutsch - Österreich)

Sepulcre, J. M./Vidal, T.: An extension of Bohr’s equivalence theorem to the case of exponential polynomials with distinct sets of frequencies, Annals of Functional Analysis 2025,

Emerald - Harvard

Sepulcre, J.M. and Vidal, T. (2025), “An extension of Bohr’s equivalence theorem to the case of exponential polynomials with distinct sets of frequencies”, Annals of Functional Analysis, Vol. 16 No. 4, available at:https://doi.org/10.1007/s43034-025-00460-2.

Warning: These citations may not always be 100% accurate.