%0 Journal Article %T Time-fractional heat transfer equations in modeling of the non-contacting face seals %A S. Blasiak %J Int. J. Heat Mass Transf. %D 2016 %V 100 %F Blasiak2016 %0 Journal Article %T Fractional order models for system identification of thermal dynamics of buildings %A L. Chen %A B. Basu %A D. McCabe %J Energy and Buildings %D 2016 %V 133 %F Chen2016 %0 Journal Article %T Solution of fractional bioheat equation in terms of Fox's H-function %A R. S. Damor %A S. Kumar %A A. K. Shukla %J SpringerPlus %D 2016 %V 5 %F Damor2016 %0 Journal Article %T State space approach to thermoelectric fluid with fractional order heat transfer %A M. A. Ezzat %J Heat Mass Transf. %D 2012 %V 48 %F Ezzat2012 %0 Journal Article %T Effects of variable thermal conductivity and fractional order of heat transfer on a perfect conducting infinitely long hollow cylinder %A M. A. Ezzat %A A. A. El-Bary %J Int. J. Thermal Sci. %D 2016 %V 108 %F Ezzat2016 %0 Journal Article %T Heat-balance integral to fractional (half-time) heat diffusion sub-model %A J. Hristov %J Thermal Sci. %D 2010 %V 14 %F Hristov2010 %0 Journal Article %T The space-time fractional diffusion equation with Caputo derivatives %A F. Huang %A F. Liu %J J. Appl. Math. Comput. %D 2005 %V 19 %F Huang2005 %0 Journal Article %T Fractional control of heat diffusion systems %A I. S. Jesus %A J. A. T. Machado %J Nonlinear Dyn. %D 2008 %V 54 %F Jesus2008 %0 Journal Article %T Fractional-diffusion solutions for transient local temperature and heat flux %A V. V. Kulish %A J. L. Large %J ASME J. Heat Transf. %D 2000 %V 122 %F Kulish2000 %0 Journal Article %T Reconstructive schemes for variational iteration method within Yang-Laplace transform with application to fractal heat conduction problem %A C.-F. Liu %A S.-S. Kong %A S.-J. Yuan %J Thermal Sci. %D 2013 %V 17 %F Liu2013 %0 Journal Article %T An improved heat conduction model with Riesz fractional Cattaneo-Christov flux %A L. Liu %A L. Zheng %A F. Liu %A X. Zhang %J Int. J. Heat Mass Transf. %D 2016 %V 103 %F Liu2016 %0 Journal Article %T New results for multidimensional diffusion equations in fractal dimensional space %A M. Ma %A D. Baleanu %A Y. S. Gasimov %A X.-J. Yang %J Rom. J. Phys. %D 2016 %V 61 %F Ma2016 %0 Journal Article %T Fractional heat conduction in infinite one-dimensional composite medium %A Y. Z. Povstenko %J J. Thermal Stresses %D 2013 %V 36 %F Povstenko2013 %0 Journal Article %T Higher-order numerical scheme for the fractional heat equation with Dirichlet and Neumann boundary conditions %A G. S. Priya %A P. Prakash %A J. J. Nieto %A Z. Kayar %J Numer. Heat Trans., Part B: Fund.: Int. J. Comput. Methodol. %D 2013 %V 63 %F Priya2013 %0 Journal Article %T Fractional calculus as a mathematical tool to improve the modeling of mass transfer phenomena in food processing %A R. Simpson %A A. Jaques %A H. Núñez %A C. Ramirez %A A. Almonacid %J Food Eng. Rev. %D 2013 %V 5 %F Simpson2013 %0 Journal Article %T A reliable algorithm for a local fractional Tricomi equation arising in fractal transonic flow %A J. Singh %A D. Kumar %A J. J. Nieto %J Entropy %D 2016 %V 18 %F Singh2016 %0 Journal Article %T Local fractional Sumudu transform with application to IVPs on Cantor sets %A H. M. Srivastava %A A. K. Golmankhaneh %A D. Baleanu %A X.-J. Yang %J Abstr. Appl. Anal. %D 2014 %V 2014 %F Srivastava2014 %0 Journal Article %T Analysis of water injection in fractured reservoirs using a fractional-derivative-based mass and heat transfer model %A A. Suzuki %A Y. Niibori %A S. A. Fomin %A V. A. Chugunov %A T. Hashida %J Math. Geosci. %D 2015 %V 47 %F Suzuki2015 %0 Book %T Advanced local fractional calculus and its applications %A X.-J. Yang %D 2012 %I World Science Publisher %C New York %F Yang2012 %0 Journal Article %T Fractal heat conduction problem solved by local fractional variation iteration method %A X.-J. Yang %A D. Baleanu %J Thermal Sci., %D 2013 %V 17 %F Yang2013 %0 Journal Article %T Local fractional similarity solution for the diffusion equation defined on Cantor sets %A X.-J. Yang %A D. Baleanu %A H. M. Srivastava %J Appl. Math. Lett. %D 2015 %V 47 %F Yang2015 %0 Book %T Local fractional integral transforms and their applications %A X.-J. Yang %A D. Baleanu %A H. M. Srivastava %D 2016 %I Elsevier/ Academic Press %C Amsterdam %F Yang2016 %0 Journal Article %T An asymptotic perturbation solution for a linear oscillator of free damped vibrations in fractal medium described by local fractional derivatives %A X.-J. Yang %A H. M. Srivastava %J Commun. Nonlinear Sci. Numer. Simul. %D 2015 %V 29 %F Yang2015