[1] |
SHEN B, ZHAO L. Some projectively at (α; β)-metrics[J]. Sci China Ser A: Math, 2006, 49: 838-851.
|
[2] |
CHEN X, SHEN Z. Projectively at Finsler metrics with almost isotropic S-curvature[J]. Acta Mathmatica Scientia, 2006, 26: 307-313.
|
[3] |
HILBERT D. Mathematical problems[J]. Bull Amer Math Soc, 2001, 37: 407-436.
|
[4] |
MO X, YU C. On some explicit constructions of Finsler metrics with scalar flag curvature[J]. Canad J Math, 2010, 62: 1 325-1 339.
|
[5] |
HUANG L, MO X. On spherically symmetric Finsler metrics of scalar curvature[J]. Journal of Geometry and Physics, 2012, 62: 2 279-2 287.
|
[6] |
SONG W, ZHOU F. Spherically symmetric Finsler metrics with scalar flag curvature[J]. Turk J Math, 2015, 39(1):16-22.
|
[7] |
HUANG L, MO X. Projectively at Finsler metrics with orthogonal invariance[J]. Annales Plonici Mathematical, 2013, 107: 259-270.
|
[8] |
HUANG L, MO X. On some explicit constructions of dually at Finsler metrics[J]. Journal of Mathematical Analysis and Applications, 2013, 437: 675-683.
|
[9] |
YU C, ZHU H. On a new class of Finsler metrics[J]. Differential Geometry and Its Applications, 2011, 29: 244-254.
|
[10] |
HAMEL G. ber die Geometrieen in denen die Geraden die Kürzesten sind[J]. Math Ann, 1903, 57: 231-264.
|
[11] |
SHEN Z. Riemann-Finsler geometry with applications to information geometry[J]. Chinese Annals of Mathematics, Series B, 2006, 27: 73-94.
|
[12] |
HUANG L, MO X. On some dually at Finsler metrics with orthogonal invariance[J]. Nonlinear Analysis, 2014, 108: 214-222.
|
[13] |
LI B. On dually at Finsler metrics[J]. Differential Geometry and Its Applications, 2013, 31: 718-721.
|
[1] |
SHEN B, ZHAO L. Some projectively at (α; β)-metrics[J]. Sci China Ser A: Math, 2006, 49: 838-851.
|
[2] |
CHEN X, SHEN Z. Projectively at Finsler metrics with almost isotropic S-curvature[J]. Acta Mathmatica Scientia, 2006, 26: 307-313.
|
[3] |
HILBERT D. Mathematical problems[J]. Bull Amer Math Soc, 2001, 37: 407-436.
|
[4] |
MO X, YU C. On some explicit constructions of Finsler metrics with scalar flag curvature[J]. Canad J Math, 2010, 62: 1 325-1 339.
|
[5] |
HUANG L, MO X. On spherically symmetric Finsler metrics of scalar curvature[J]. Journal of Geometry and Physics, 2012, 62: 2 279-2 287.
|
[6] |
SONG W, ZHOU F. Spherically symmetric Finsler metrics with scalar flag curvature[J]. Turk J Math, 2015, 39(1):16-22.
|
[7] |
HUANG L, MO X. Projectively at Finsler metrics with orthogonal invariance[J]. Annales Plonici Mathematical, 2013, 107: 259-270.
|
[8] |
HUANG L, MO X. On some explicit constructions of dually at Finsler metrics[J]. Journal of Mathematical Analysis and Applications, 2013, 437: 675-683.
|
[9] |
YU C, ZHU H. On a new class of Finsler metrics[J]. Differential Geometry and Its Applications, 2011, 29: 244-254.
|
[10] |
HAMEL G. ber die Geometrieen in denen die Geraden die Kürzesten sind[J]. Math Ann, 1903, 57: 231-264.
|
[11] |
SHEN Z. Riemann-Finsler geometry with applications to information geometry[J]. Chinese Annals of Mathematics, Series B, 2006, 27: 73-94.
|
[12] |
HUANG L, MO X. On some dually at Finsler metrics with orthogonal invariance[J]. Nonlinear Analysis, 2014, 108: 214-222.
|
[13] |
LI B. On dually at Finsler metrics[J]. Differential Geometry and Its Applications, 2013, 31: 718-721.
|