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As the electric field can affect the polarization and dielectric constant, the phenomenological coefficient a0 is an implicit function of electric field. The phenomenological coefficient a0 is determined by the polarization and the reciprocal of permittivity, and a nonlinear function of electric field in the ferroelectric phase regime. In the paraelectric phase regime, however, a0 is merely subjected to the reciprocal of permittivity, and also a nonlinear function of electric field. In this paper, we investigate the electric field dependence of phenomenological coefficient in ferroelectric copolymers, terpolymers and Ba0.85Ca0.05Sr0.1TiO3 ceramics. It is indicated that the phenomenological coefficient increases with the increasing electric field, the maximum value is obtained to be about 2 times the original value. Moreover, the electrocaloric strength is used to measure the magnitude of electrocaloric effect of electrocaloric materials in an external electric field. It can be used to find out novel and efficient electrocaloric materials through studying the electrocaloric strength. Based on the thermodynamic theory, the analytical expression of electrocaloric strength is deduced. It is found that the phenomenological coefficient, phase transition, specific heat capacity, and permittivity versus temperature peak value at the phase transition temperature have a clear influence on the electrocaloric strength. The expression can be applied to 1st order, 2nd order phase transition materials and relaxor ferroelectrics.
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Keywords:
- ferroelectrics /
- phase transition /
- electrocaloric effect /
- electrocaloric strength
[1] 莱因斯 M E, 格拉斯 A M 著 (钟维烈 译) 1989 铁电体及有关材料的原理和应用 (北京: 科学出版社) 第159—162页
Lines M E, Glass A M (translated by Zhong W L) 1989 Principles and Applications of Ferroelectrics and Related Materials (Beijing: Science Press) pp159–162 (in Chinese)
[2] Mischenko A S, Zhang Q, Scott J F, Whatmore R W, Mathur N D 2006 Science 311 1270Google Scholar
[3] Neese B, Chu B J, Lu S G, Wang Y, Furman E, Zhang Q M 2008 Science 321 821Google Scholar
[4] Correia T, Zhang Q 2014 Electrocaloric Materials: New Generation of Coolers (Berlin, Heidelberg, London: Springer Verlag) pp1–15
[5] Scott J F 2011 Ann. Rev. Mater. Res. 41 229Google Scholar
[6] Lu S G, Zhang Q M 2012 J. Adv. Dielectr. 2 1230011Google Scholar
[7] Okaya A, Barash L F 1962 Proc. IRE 50 2081Google Scholar
[8] Lu S G, Neese B, Chu B J, Wang Y, Zhang Q M 2008 Appl. Phys. Lett. 93 042905Google Scholar
[9] Lu S G, Xu Z K, Chen H D 2005 Phys. Rev. B 72 054120Google Scholar
[10] Padmini P, Taylor T R, Lefevre M J, Nagra A S, York R A, Speck J S 1999 Appl. Phys. Lett. 75 3186Google Scholar
[11] Zhi Y, Chen A, Guo R Y, Bhalla A S 2002 Appl. Phys. Lett. 81 1285Google Scholar
[12] Ye H J, Qian X S, Jeong D Y, Zhang S J, Zhou Y, Shao W Z, Zhen L, Zhang Q M 2014 Appl. Phys. Lett. 105 152908Google Scholar
[13] Amin A, Cross L E, Newnham R E 1981 Ferroelectrics 37 647Google Scholar
[14] Rose M C, Cohen R E 2012 Phys. Rev. Lett. 109 209903Google Scholar
[15] Buessem W R, Cross L E, Goswami A K 1966 J. Am. Ceram. Soc. 49 33Google Scholar
[16] Lu S G, Rozic B, Kutnjiak Z, Zhang Q M 2011 Integr. Ferroelectr. 125 176Google Scholar
[17] Inoue M, Tada Y, Suganuma K, Ishiguro H 2007 Polym. Degrad. Stab. 92 1833Google Scholar
[18] Pelrine R, Kornbluh R, Pei Q B, Joseph J 2000 Science 287 836Google Scholar
[19] 杨学良 2013 硕士学位论文 (天津: 天津师范大学)
Yang X L 2013 M. S. Thesis (Tianjin: Tianjin Normal University) (in Chinese)
[20] Lu S G, Zhang Q M 2009 Adv. Mater. 21 1983Google Scholar
[21] Horchidan N, Ianculescu A, Vasilescu C, Deluca M, Musteata V, Ursic H, Frunza R, Malic B, Mitoseriu L 2014 J. Eur. Ceram. Soc. 34 3661Google Scholar
[22] Moya X, Stern-Taulats E, Crossley S, González-Alonso D, Kar-Narayan S, Planes A, Mañosa L, Mathur N D 2013 Adv. Mater. 25 1360Google Scholar
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图 3 (a)聚(偏氟乙烯-三氟乙烯) 55 mol%/45 mol%共聚物介电常数与温度和电场的关系; (b)介电常数倒数与温度和电场的关系; (c)唯象系数
$ {a}_{0}' $ 与电场的关系, 图中实线是为了观察方便Figure 3. (a) Permittivity of P(VDF-TrFE) 55 mol%/45 mol% as a function of electric field and temperature; (b) reciprocal of permittivity as a function of temperature and electric field; (c)
$ {a}_{0}' $ as a function of electric field and linear fitting, and the solid line occurred is guided for observation.图 4 (a)聚(偏氟乙烯-三氟乙烯-氯氟乙烯) (P(VDF-TrFE-CFE)) 69.7 mol%/30.3 mol%/6.05 mol%三聚物介电常数倒数与温度和电场的关系; (b)相应的唯象系数
$ {a}_{0}' $ 与电场的关系Figure 4. (a) Reciprocal of permittivity of the (P(VDF-TrFE-CFE)) 69.7 mol%/30.3 mol%/6.05 mol% as a function of temperature and electric field; (b) the corresponding
$ {a}_{0}' $ as a function of electric field.图 6 聚(偏氟乙烯-三氟乙烯) 55 mol%/45 mol%共聚物的电卡强度(dT/dE)与温度、电场和频率的关系 (a) f = 0.1 kHz; (b) f = 1 kHz; (c) f = 10 kHz; (d) f = 100 kHz
Figure 6. Electrocaloric strength (dT/dE) of P(VDF-TrFE) 55 mol%/45 mol% copolymer as a function of temperature, electric field and frequency: (a) f = 0.1 kHz; (b) f = 1 kHz; (c) f = 10 kHz; (d) f = 100 kHz
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[1] 莱因斯 M E, 格拉斯 A M 著 (钟维烈 译) 1989 铁电体及有关材料的原理和应用 (北京: 科学出版社) 第159—162页
Lines M E, Glass A M (translated by Zhong W L) 1989 Principles and Applications of Ferroelectrics and Related Materials (Beijing: Science Press) pp159–162 (in Chinese)
[2] Mischenko A S, Zhang Q, Scott J F, Whatmore R W, Mathur N D 2006 Science 311 1270Google Scholar
[3] Neese B, Chu B J, Lu S G, Wang Y, Furman E, Zhang Q M 2008 Science 321 821Google Scholar
[4] Correia T, Zhang Q 2014 Electrocaloric Materials: New Generation of Coolers (Berlin, Heidelberg, London: Springer Verlag) pp1–15
[5] Scott J F 2011 Ann. Rev. Mater. Res. 41 229Google Scholar
[6] Lu S G, Zhang Q M 2012 J. Adv. Dielectr. 2 1230011Google Scholar
[7] Okaya A, Barash L F 1962 Proc. IRE 50 2081Google Scholar
[8] Lu S G, Neese B, Chu B J, Wang Y, Zhang Q M 2008 Appl. Phys. Lett. 93 042905Google Scholar
[9] Lu S G, Xu Z K, Chen H D 2005 Phys. Rev. B 72 054120Google Scholar
[10] Padmini P, Taylor T R, Lefevre M J, Nagra A S, York R A, Speck J S 1999 Appl. Phys. Lett. 75 3186Google Scholar
[11] Zhi Y, Chen A, Guo R Y, Bhalla A S 2002 Appl. Phys. Lett. 81 1285Google Scholar
[12] Ye H J, Qian X S, Jeong D Y, Zhang S J, Zhou Y, Shao W Z, Zhen L, Zhang Q M 2014 Appl. Phys. Lett. 105 152908Google Scholar
[13] Amin A, Cross L E, Newnham R E 1981 Ferroelectrics 37 647Google Scholar
[14] Rose M C, Cohen R E 2012 Phys. Rev. Lett. 109 209903Google Scholar
[15] Buessem W R, Cross L E, Goswami A K 1966 J. Am. Ceram. Soc. 49 33Google Scholar
[16] Lu S G, Rozic B, Kutnjiak Z, Zhang Q M 2011 Integr. Ferroelectr. 125 176Google Scholar
[17] Inoue M, Tada Y, Suganuma K, Ishiguro H 2007 Polym. Degrad. Stab. 92 1833Google Scholar
[18] Pelrine R, Kornbluh R, Pei Q B, Joseph J 2000 Science 287 836Google Scholar
[19] 杨学良 2013 硕士学位论文 (天津: 天津师范大学)
Yang X L 2013 M. S. Thesis (Tianjin: Tianjin Normal University) (in Chinese)
[20] Lu S G, Zhang Q M 2009 Adv. Mater. 21 1983Google Scholar
[21] Horchidan N, Ianculescu A, Vasilescu C, Deluca M, Musteata V, Ursic H, Frunza R, Malic B, Mitoseriu L 2014 J. Eur. Ceram. Soc. 34 3661Google Scholar
[22] Moya X, Stern-Taulats E, Crossley S, González-Alonso D, Kar-Narayan S, Planes A, Mañosa L, Mathur N D 2013 Adv. Mater. 25 1360Google Scholar
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