4.  J. Yin., G. J. Gerling., X. Chen., Mechanical modeling of a wrinkled fingertip immersed in water, Acta. Biomater.  In press (2009)

3.  C. Lv., Y. Yin., J. Yin., Geometric theory for adhering lipid vesicles, Colloid. Surface. B. 74, 380-388, (2009)

2.  J. Yin., E. Bar-Kochba., X. Chen., Mechanical self-assembly fabrication of gears, Soft. Matter. 5, 3469-3474, (2009)    (Highlight in Chemical Technology from RSC publishing: "Buckling down to make microgears" Reported by NewScientist: "Mismatched material produce self-assembly gears")  

1.  J. Yin., X. Chen., I. Sheinman., Anisotropic buckling patterns in spheroidal film/substrate systems and their implications in some natural and biological systems,
    J. Mech. Phys. Solids. 57, 1470-1484, (2009)

3.  J. Yin., Z. Cao., C. Li., I, Sheinman., X. Chen., Stress-driven buckling patterns in spheroidal core/shell structures,
     Proc. Natl. Acad. Sci. 105, 19132-19135, (2008) ( Reported by Nature News: "Why fruits are groovy" )

2.  Y. Yin., J. Yin., C. Lv., Equilibrium theory in 2D Riemann manifold for heterogeneous biomembranes with arbitrary variational modes,
     J. Geom. Phys. 58, 122-132, (2008)

1.  Y. Yin., J. Wu., J. Yin. Symmetrical fundamental tensors, differential operators, and integral theorems in differential geometry.
     Tsinghua Sci. Tech. 13(2), 121-126, (2008)

7.  Y. Yin., J. Yin., J. Wu. The second gradient operator and integral theorems for tensor fields on curved surface. Appl. Math. Sci. 1, 1465-1484. (2007)

6.  J. Yin., Y. Yin., C. Lv., General Mathematical frame for open or closed biomembranes: stability theory based on differential operators.
     Appl. Math. Sci. 1, 1439-1463, (2007)

5.  Y. Yin., Y. Chen., J. Yin., K. Huang. Geometric conservation laws for perfect Y-branched carbon nanotubes, Nanotechnology, 17, 4941-4945, (2006)

4.  Y. Yin., H. Yeh., J. Yin., Stability similarities between shells, cells and nano carbon tubes. IEE. Proc. -Nanobiotechnol, 153(1), 7-10, (2006)

3.  Y. Yin., J. Yin., Geometric conservation laws for cells or vesicles with membrane nanotubes or singular points, J. Nanobiotech, 4, 6, (2006)

2. Y. Yin., J. Yin., D. Ni. General mathematical frame for open or closed biomembranes (Part I): equilibrium theory and geometrically constraint equation.
     J. Math. Biol. 51, 403-413, (2005)

1.  Y. Yin., J. Yin. Geometrical constraint equations and geometrically permissible conditions for vesicles, Chin. Phys. Lett. 24(10), 2057-2058, (2004)