RT Journal Article T1 Temperature Dependence of the Symmetry Energy Components for Finite Nuclei A1 Antonov, A. N. A1 Kadrev, D. N. A1 Gaidarov, M. K. A1 Sarriguren, P. A1 Moya de Guerra, Elvira AB We investigate the temperature dependence of the volume and surface components of the nuclear symmetry energy (NSE) and their ratio in the framework of the local density approximation. The results of these quantities for finite nuclei are obtained within the coherent density fluctuation model (CDFM). The CDFM weight function is obtained using the temperature-dependent proton and neutron densities calculated through the HFBTHO code that solves the nuclear Skyrme-Hartree-Fock-Bogoliubov problem by using the cylindrical transformed deformed harmonic-oscillator basis. We present and discuss the values of the volume and surface contributions to the NSE and their ratio obtained for the Ni, Sn, and Pb isotopic chains around double-magic Ni-78, Sn-132, and Pb-208 nuclei. The results for the T-dependence of the considered quantities are compared with estimations made previously for zero temperature showing the behavior of the NSE components and their ratio, as well as with the available experimental data. The sensitivity of the results on various forms of the density dependence of the symmetry energy is studied. We confirm the existence of "kinks" of these quantities as functions of the mass number at T = 0 MeV for the double closed-shell nuclei Ni-78 and Sn-132 and the lack of "kinks" for the Pb isotopes, as well as the disappearance of these kinks as the temperature increases. PB Iop Publishing Ltd SN 1742-6588 YR 2020 FD 2020 LK https://hdl.handle.net/20.500.14352/8259 UL https://hdl.handle.net/20.500.14352/8259 LA eng NO International school on nuclear physics, neutron physics and applications (23 rd. 2019. Varna, BULGARIA). P.S. acknowledges support from Ministerio de Ciencia, InnovaciĆ³n y Universidades MCIU/AEI/FEDER,UE (Spain) under Contract No. PGC2018-093636-B-I00. NO Ministerio de Ciencia e InnovaciĆ³n (MICINN)/FEDER DS Docta Complutense RD 7 may 2024