赵松林，浙江磐安人，中共党员，博士，副教授，硕士生导师。


一、教育背景与工作经历
2006年本科毕业于湖州师范学院数学与应用数学专业
2009年硕士毕业于上海大学计算数学专业
2012年博士毕业于上海大学应用数学专业
2012.03-2012.08曾作为联合培养博士生赴加拿大Brock大学学习半年
2013年1月进入浙江工业大学应用数学系工作
二、主要研究领域：
可积系统及其应用
三、主持项目
1.国家自然科学基金青年基金：链KP型方程族的若干研究（**），经费22万，2014.01-2016.12，（已结题）。
2.浙江省自然科学基金一般项目：非交换多元离散可积系统的若干研究（LY17A010024），经费9万，2017.01-2019.12。
3.浙江工业大学核心课程：《实变函数》（PX-**），经费3万，2018.01-2019.12。


四、论文著作

1.J. Ji*,S.L. Zhao, D.J. Zhang, Soliton solutions for a negative order AKNS equation, Commun. Theor. Phys., 2008, 50, 1033-1035.(SCI)
2.S.L. Zhao*, H.H. Hao, D.J. Zhang, The multisoliton solutions for the non-isospectral mKdV-sineGordon equation, Mod. Phys. Lett. B, 2009, 23(4), 607-621.(SCI)
3.S.L. Zhao*, D.J. Zhang, D.Y. Chen, N-soliton solutions of non-isospectral derivative nonlinear Schr?dinger equation, Chin. Phys. Lett., 2009, 26(3), 030202(4pp) .(SCI)
4.D.J. Zhang*, J. Ji, S.L. Zhao,Soliton scattering with amplitude changes of a negative order AKNS equation, Physica D, 2009, 238, 2361-2367.(SCI)
5.J. Zhou, D.J. Zhang*,S.L. Zhao,Breathers and limit solutions of the nonlinear lumped self-dual network equation, Phys. Lett. A, 2009, 373, 3248-3258.(SCI)
6.S.L. Zhao*,D.J. Zhang, J. Ji, Exact solutions for two evolution equation hierarchies, Chin. Phys. Lett., 2010, 27(2), 020201(3pp).(SCI)
7.Q. Shen,S.L. Zhao, D.J. Zhang*, A limit symmetry of the sine-Gordon equation and its applications, J. Shanghai University(Natural Science), 2010, 17(3), 280-285. (In Chinese).
8.X. Kou*, D.J. Zhang,Y. Shi, S.L. Zhao, Generating solutions to the discrete sine-Gordon equation from modified B?cklund transformation, Commun. Theor. Phys., 2011, 55(4), 545-550.(SCI)
9.S.L. Zhao*, D.J. Zhang, D.Y. Chen, A direct linearization method of the non-isospectral KdV equation, Chin. Phys. Lett., 2011, 28(6), 060203(4pp).(SCI)
10.S.L. Zhao*, D.J. Zhang, Y. Shi, Generalized Cauchy matrix approach for lattice Boussinesq-type equations, Chin. Ann. Math., Ser. B, 2012, 33(2), 259-270.(SCI)
11.W. Feng*, S.L. Zhao, D.J. Zhang, Exact solutions to lattice Boussinesq-type equations, J. Nonlinear Math. Phys., 2012, 19(4), **(15pp).(SCI)
12.D.J. Zhang*, S.L. Zhao, F.W. Nijhoff, Direct linearization of extended lattice BSQ systems, Stud. Appl. Math., 2012, 129(2), 220–248.(SCI)
13.W. Feng, S.L. Zhao*,J.B. Zhang, Direct linearization of the nonisospectral Kadomtsev-Petviashvili equation, Commun. Nonlinear Sci. Numer. Simulat., 2013, 18(6), 1390-1399.(SCI)
14.W. Feng, S.L. Zhao*,Generalized Cauchy matrix approach for lattice KP-type equations, Commun. Nonlinear Sci. Numer. Simulat., 2013, 18(7),1652-1664.(SCI)
15.D.J. Zhang*, S.L. Zhao,Solutions to the ABS lattice equations via generalized Cauchy matrix approach, Stud. Appl. Math.,2013, 131, 72-103.(SCI)
16.施英*, 张大军, 赵松林, 非自治ABS 方程的双线性化和Casorati 行列式解, 中国科学: 数学, 2014, 44(1), 37-54.
17.D.D. Xu, D.J. Zhang*, S.L. Zhao,The Sylvester equation and integrable equations: I. The Korteweg-de Vries system and sine-Gordon equation, J. Nonlinear Math. Phys., 2014, 21(3)，382-406.(SCI)
18.D.J. Zhang*, S.L. Zhao, Y.Y. Sun, J. Zhou, Solutions to the modified Korteweg–de Vries equation, Rev. Math. Phys. 2014, 26(7), ** (42pp).(SCI)
19.W. Feng, S.L. Zhao*, Y. Shi, Rational solutions for lattice potential KdV equation and two Semi-discrete lattice potential KdV equations, Z. Naturforsch. A, 2016, 71(2), 121–128.(SCI)
20.W. Feng, S.L. Zhao*, Solutions and three-dimensional consistency for non-autonomous extended lattice Boussinesq-type equations, Rep. Math. Phys., 2016, 78(2), 219-243.(SCI)
21.S.L. Zhao*, A discrete negative AKNS equation: generalized Cauchy matrix approach, J. Nonlinear Math. Phys., 2016, 23(4), 544-562.(SCI)
22.S.L. Zhao*, Y.Y. Sun, A discrete negative order potential Korteweg-de Vries equation, Z. Naturforsch. A, 2016, 71(12), 1151–1158.(SCI)
23.赵松林*, 冯玮, 沈守枫, 施英, 扩展链Gel'fand-Dikii型方程族及其解, 中国科学: 数学, 2017, 47(2) , 291-312.
24.S.L. Zhao*, Y. Shi, Discrete and semidiscrete models for AKNS equation, Z. Naturforsch. A, 2017, 72(3), 281–290.(SCI)
25.X. Wang, D.J. Zhang*, S.L. Zhao, Solutions to the non-autonomous ABS lattice equations: Generalized Cauchy matrix approach, Commun. Appl. Math. Compu., 2018, 32(1), 1-25.
26.W. Feng*, S.L. Zhao, Time-fractional inhomogeneous nonlinear diffusion equation: Symmetries, conservation laws, invariant subspaces, and exact solutions, Mod. Phys. Lett. B, 2018, 32(32), ** (32 pp).(SCI)
27.S.L. Zhao*, The Sylvester equation and integrable equations: The Ablowitz—Kaup—Newell—Segur system, Rep. Math. Phys., 2018, 82(2), 241-263. (SCI)
28.W. Feng, S.L. Zhao*, Oscillatory solutions for lattice Korteweg-de Vries-type equations, Z. Naturforsch. A, 2018, 73(2), 91-98.(SCI)
29.W. Feng*, S.L. Zhao, Symmetry reductions and group-invariant radial solutions to the n-dimensional wave equation, Z. Naturforsch. A,2018, 73(2), 161-170.(SCI)
30.S.L. Zhao*, W. Feng, Y.Y. Jin, Discrete analogues for two nonlinear Schr?dinger type equations, Commun. Nonlinear Sci. Numer. Simulat., 2019, 72, 329–341.(SCI)
31.S.L. Zhao*, D.J. Zhang*, Rational solutions to Q3δ in the Adler-Bobenko-Suris list and degenerations, J. Nonlinear Math. Phys., 2019, 26(1), 107-132.(SCI)
32.Y. Shi*, S.F. Shen, S.L. Zhao, Solutions and connections of nonlocal derivative nonlinear Schr?dinger equations, 2019, to appear in Nonlinear Dyn.. (SCI)
33.W. Feng, S.L. Zhao*, Cauchy matrix type solutions for the nonlocal nonlinear Schrodinger equation, 2019, to appear in Rep. Math. Phys. . (SCI)






教师简介
赵松林
赵松林，浙江磐安人，中共党员，博士，副教授，硕士生导师。


一、教育背景与工作经历
2006年本科毕业于湖州师范学院数学与应用数学专业
2009年硕士毕业于上海大学计算数学专业
2012年博士毕业于上海大学应用数学专业
2012.03-2012.08曾作为联合培养博士生赴加拿大Brock大学学习半年
2013年1月进入浙江工业大学应用数学系工作
二、主要研究领域：
可积系统及其应用
三、主持项目
1.国家自然科学基金青年基金：链KP型方程族的若干研究（**），经费22万，2014.01-2016.12，（已结题）。
2.浙江省自然科学基金一般项目：非交换多元离散可积系统的若干研究（LY17A010024），经费9万，2017.01-2019.12。
3.浙江工业大学核心课程：《实变函数》（PX-**），经费3万，2018.01-2019.12。


四、论文著作

1.J. Ji*,S.L. Zhao, D.J. Zhang, Soliton solutions for a negative order AKNS equation, Commun. Theor. Phys., 2008, 50, 1033-1035.(SCI)
2.S.L. Zhao*, H.H. Hao, D.J. Zhang, The multisoliton solutions for the non-isospectral mKdV-sineGordon equation, Mod. Phys. Lett. B, 2009, 23(4), 607-621.(SCI)
3.S.L. Zhao*, D.J. Zhang, D.Y. Chen, N-soliton solutions of non-isospectral derivative nonlinear Schr?dinger equation, Chin. Phys. Lett., 2009, 26(3), 030202(4pp) .(SCI)
4.D.J. Zhang*, J. Ji, S.L. Zhao,Soliton scattering with amplitude changes of a negative order AKNS equation, Physica D, 2009, 238, 2361-2367.(SCI)
5.J. Zhou, D.J. Zhang*,S.L. Zhao,Breathers and limit solutions of the nonlinear lumped self-dual network equation, Phys. Lett. A, 2009, 373, 3248-3258.(SCI)
6.S.L. Zhao*,D.J. Zhang, J. Ji, Exact solutions for two evolution equation hierarchies, Chin. Phys. Lett., 2010, 27(2), 020201(3pp).(SCI)
7.Q. Shen,S.L. Zhao, D.J. Zhang*, A limit symmetry of the sine-Gordon equation and its applications, J. Shanghai University(Natural Science), 2010, 17(3), 280-285. (In Chinese).
8.X. Kou*, D.J. Zhang,Y. Shi, S.L. Zhao, Generating solutions to the discrete sine-Gordon equation from modified B?cklund transformation, Commun. Theor. Phys., 2011, 55(4), 545-550.(SCI)
9.S.L. Zhao*, D.J. Zhang, D.Y. Chen, A direct linearization method of the non-isospectral KdV equation, Chin. Phys. Lett., 2011, 28(6), 060203(4pp).(SCI)
10.S.L. Zhao*, D.J. Zhang, Y. Shi, Generalized Cauchy matrix approach for lattice Boussinesq-type equations, Chin. Ann. Math., Ser. B, 2012, 33(2), 259-270.(SCI)
11.W. Feng*, S.L. Zhao, D.J. Zhang, Exact solutions to lattice Boussinesq-type equations, J. Nonlinear Math. Phys., 2012, 19(4), **(15pp).(SCI)
12.D.J. Zhang*, S.L. Zhao, F.W. Nijhoff, Direct linearization of extended lattice BSQ systems, Stud. Appl. Math., 2012, 129(2), 220–248.(SCI)
13.W. Feng, S.L. Zhao*,J.B. Zhang, Direct linearization of the nonisospectral Kadomtsev-Petviashvili equation, Commun. Nonlinear Sci. Numer. Simulat., 2013, 18(6), 1390-1399.(SCI)
14.W. Feng, S.L. Zhao*,Generalized Cauchy matrix approach for lattice KP-type equations, Commun. Nonlinear Sci. Numer. Simulat., 2013, 18(7),1652-1664.(SCI)
15.D.J. Zhang*, S.L. Zhao,Solutions to the ABS lattice equations via generalized Cauchy matrix approach, Stud. Appl. Math.,2013, 131, 72-103.(SCI)
16.施英*, 张大军, 赵松林, 非自治ABS 方程的双线性化和Casorati 行列式解, 中国科学: 数学, 2014, 44(1), 37-54.
17.D.D. Xu, D.J. Zhang*, S.L. Zhao,The Sylvester equation and integrable equations: I. The Korteweg-de Vries system and sine-Gordon equation, J. Nonlinear Math. Phys., 2014, 21(3)，382-406.(SCI)
18.D.J. Zhang*, S.L. Zhao, Y.Y. Sun, J. Zhou, Solutions to the modified Korteweg–de Vries equation, Rev. Math. Phys. 2014, 26(7), ** (42pp).(SCI)
19.W. Feng, S.L. Zhao*, Y. Shi, Rational solutions for lattice potential KdV equation and two Semi-discrete lattice potential KdV equations, Z. Naturforsch. A, 2016, 71(2), 121–128.(SCI)
20.W. Feng, S.L. Zhao*, Solutions and three-dimensional consistency for non-autonomous extended lattice Boussinesq-type equations, Rep. Math. Phys., 2016, 78(2), 219-243.(SCI)
21.S.L. Zhao*, A discrete negative AKNS equation: generalized Cauchy matrix approach, J. Nonlinear Math. Phys., 2016, 23(4), 544-562.(SCI)
22.S.L. Zhao*, Y.Y. Sun, A discrete negative order potential Korteweg-de Vries equation, Z. Naturforsch. A, 2016, 71(12), 1151–1158.(SCI)
23.赵松林*, 冯玮, 沈守枫, 施英, 扩展链Gel'fand-Dikii型方程族及其解, 中国科学: 数学, 2017, 47(2) , 291-312.
24.S.L. Zhao*, Y. Shi, Discrete and semidiscrete models for AKNS equation, Z. Naturforsch. A, 2017, 72(3), 281–290.(SCI)
25.X. Wang, D.J. Zhang*, S.L. Zhao, Solutions to the non-autonomous ABS lattice equations: Generalized Cauchy matrix approach, Commun. Appl. Math. Compu., 2018, 32(1), 1-25.
26.W. Feng*, S.L. Zhao, Time-fractional inhomogeneous nonlinear diffusion equation: Symmetries, conservation laws, invariant subspaces, and exact solutions, Mod. Phys. Lett. B, 2018, 32(32), ** (32 pp).(SCI)
27.S.L. Zhao*, The Sylvester equation and integrable equations: The Ablowitz—Kaup—Newell—Segur system, Rep. Math. Phys., 2018, 82(2), 241-263. (SCI)
28.W. Feng, S.L. Zhao*, Oscillatory solutions for lattice Korteweg-de Vries-type equations, Z. Naturforsch. A, 2018, 73(2), 91-98.(SCI)
29.W. Feng*, S.L. Zhao, Symmetry reductions and group-invariant radial solutions to the n-dimensional wave equation, Z. Naturforsch. A,2018, 73(2), 161-170.(SCI)
30.S.L. Zhao*, W. Feng, Y.Y. Jin, Discrete analogues for two nonlinear Schr?dinger type equations, Commun. Nonlinear Sci. Numer. Simulat., 2019, 72, 329–341.(SCI)
31.S.L. Zhao*, D.J. Zhang*, Rational solutions to Q3δ in the Adler-Bobenko-Suris list and degenerations, J. Nonlinear Math. Phys., 2019, 26(1), 107-132.(SCI)
32.Y. Shi*, S.F. Shen, S.L. Zhao, Solutions and connections of nonlocal derivative nonlinear Schr?dinger equations, 2019, to appear in Nonlinear Dyn.. (SCI)
33.W. Feng, S.L. Zhao*, Cauchy matrix type solutions for the nonlocal nonlinear Schrodinger equation, 2019, to appear in Rep. Math. Phys. . (SCI)