[1] Tzou D Y. Micro-to-macroscale Heat Transfer, Taylor and Francis. Washington, DC. 1997

[2] Liu B W. Almost periodic solutions for hopfield neural networks with continuously distributed delays. Math Comput Simulation, 2007, 73: 327–335

[3] Ramos J I. Exponetial methods for singularly-perturbed ordinary differential-difference equations. Appl Math Comput, 2006, 182(2): 1528–1541

[4] Patidar K C, Sharma K K. Uniformly convergent non-standard finite difference methods for singularly perturbed differential-difference equations with delay or advance. Internat J Numer Methods Engry, 2006, 66(2): 272–296

[5] Lange C G, Miura R M. Singular perturbation analysis of boundary-value problems for differential differ-ence equations. SIAM Journal on Applied Mathematics, 1982, 42: 502–531

[6] Lange C G, Miura R M. Singular perturbation analysis of boundary-value problems for differential differ-ence equations. II. Rapid oscillations and resonances, SIAM Journal on Applied Mathematics, 1985, 45: 687–707

[7] Lange C G, Miura R M. Singular perturbation analysis of boundary-value problems for differential differ-ence equations. III. Turning point problems. SIAM Journal on Applied Mathematics, 1985, 45: 708–734

[8] Lange C G, Miura R M. Singular perturbation analysis of boundary-value problems for differential differ-ence equations. IV. Small shift with rapid oscillations. SIAM Journal on Applied Mathematics, 1994, 54: 273–283

[9] Lange C G, Miura R M. Singular perturbation analysis of boundary-value problems for differential dif-ference equations. V. Small shift with layer behavior. SIAM Journal on Applied Mathematics, 1994, 54: 249–272

[10] Kadalbajoo M K, Sharma K K, Devendra Kumar. Numerical analysis of singularly perturbed delay differential equations with layer behavior. Appl Math Comput, 2004, 157: 11–28

[11] Kadalbajoo M K, Devendra Kumar. Fitted mesh B-spline collocation method for singularly perturbed differential-difference equations with small delay. Appl Math Comput, 2008, 204: 90–98

[12] Miao S M, Zhou Q D. Bundary Value Problems for Singular Perturbed Differential-difference Equations. Jilin Univ Natur Sci Ed, 1987, 3: 1–7

[13] Tian H J. Asymptotic expansion for the solution of singularly perturbed delay differential equations. Math Anal Appl, 2003, 281(2): 678–696

[14] Kadalbajoo M K, Sharma K K. Parameter uniform numercial method for a boundary-value problem for singular perturted nonlinear delay differential equation of neutral type. Int J Comput Math, 2004, 81(7): 845–862

[15] Lange C G. Miura R M. Singular perturbation analysis of boundary-value problems for differential differ-ence equations. IV. A nonlinear example with layer behavior. Studies Appl Math, 1991, 84: 231–273

[16] Ni M K, Lin W Z. The asymptotic solutions of delay singularly perturbed differential difference equations. Acta Mathematica Scientia, 2010, 30A(6): 1413–1423

[17] Vasileva A B, Buluzov V F. Ni M K, Lin W Z. Asymptotic expansions of singularly perturbed differential equations. Beijing: Higher Education Press, 2008 (in China)