https://doi.org/10.22190/FUMI2003727A

727

740

Let $G$ be a 4-dimensional Lie group with an invariant para-hypercomplex structure and let $F= \beta+ a\alpha+\beta^2/{\alpha}$ be a left invariant $(\alpha,\beta)$-metric, where $\alpha$ is a Riemannian metric and $\beta$ is a 1-form on $G$, and $a$ is a real number. We prove that the flag curvature of $F$ with parallel 1-form $\beta$ is non-positive, except in Case 2, in which $F$ admits both negative and positive flag curvature. Then, we determine all geodesic vectors of $(G,F)$.  

para-hypercomplex structure; $(\alpha,\beta)$-metric; Riemannian metric; flag curvature.

bibitem{V} {sc P. L. Antonelli, sc R. S. Ingarden {rm and} M. Matsumoto}, textit{The Theory of Sprays and Finsler Spaces

with Applications in Physics and Biology}, Kluwer Academic Publishers, 1993.

%%------------------------------------------------------------------------------------------------------------------

bibitem{S} {sc G. S. Asanov},

textit{Finsler geometry, Relativity and Gauge Theories}, D. Reidel Publishing

Company, 1985.

%%------------------------------------------------------------------------------------------------------------------

bibitem{A} {sc M. L. Barberis},

textit{Hypercomplex structures on four-dimensional Lie groups}, Proc. Amer. Math. Soc. textbf{125} (4) (1997), 1043--1054.

%%------------------------------------------------------------------------------------------------------------------

bibitem{L} {sc D. Bao, sc S. S. Chern {rm and} Z. Shen}, textit{ An Introduction to Riemann-Finsler Geometry}, Springer,

New York, 2000.

%%--------------------------------------------------------------------------------------------------------------

bibitem{B} {sc M. L. Barberis}, textit{ Hyper-K"{a}hler metrics conformal to left invariant metrics on four-dimensional Lie groups}, Math. Phys. Anal. Geom. textbf{6} (2003), 1--8.

%%------------------------------------------------------------------------------------------------------------------

bibitem{C} {sc N. Blav{z}i$acute{textrm{c}}$, sc S. Vukmirovi$acute{textrm{c}}$}, textit{ Four-dimensional Lie algebras with a para-hypercomplex structure}, Rocky J. of Math. textbf{4} (2010), 1391--1439.

%%------------------------------------------------------------------------------------------------------------------

bibitem{ChS} {sc S. S. Chern, sc Z. Shen}, textit{ Riemann-Finsler geometry}, World Scientific Publishing, 2004.

%%------------------------------------------------------------------------------------------------------------------

bibitem{E} {sc X. Cheng, sc Z. Shen}, textit{ A class of Finsler metrics with isotropic $S$-curvature}, Israel Journal of Mathematics. textbf{169} (2009), 317--340.

%%------------------------------------------------------------------------------------------------------------------

bibitem{D}{sc V. V. Cort$acute{textrm{e}}$s,sc C. Mayer, sc T. Mohaupt {rm and} F. Saueressig}, textit{ Special geometry of Euclidean supersymmetry II. Hypermultiplets and the c-map}, Tech. report, Institute of Physics Publishing for SISSA, 2005.

%%------------------------------------------------------------------------------------------------------------------

%--------------------------------------------------------------

bibitem{xx} {sc S. Deng, sc Z. Hu}, textit{ On flag curvature of homogeneous Randers spaces}, Canad. J. Math.

textbf{65} (1) ( 2013), 66--81.

%--------------------------------------------------------------

bibitem{zz} { sc G. W. Gibbons, sc G. Papadopoulos {rm and} K. S. Stelle}, textit{ HKT and OKT geometries on soliton black

hole moduli spaces}, Nuclear Phys. B textbf{508} (1997), 623--658.

%%------------------------------------------------------------------------------------------------------------------

bibitem{dd} { sc L. Huang}, textit{ Flag curvatures of homogeneous Finsler spaces}, European Journal of Mathematics.

textbf{3}( 2017), 1000--1029.

bibitem{rr} {sc D. Joyce}, textit{ Compact hypercomplex and quaternionic manifolds}, J.Differential Geom. textbf{3} (1992), 743--761.

%%------------------------------------------------------------------------------------------------------------------

bibitem{H} {sc D. Latifi}, textit{ Homogeneous geodesics in homogeneous Finsler spaces}, Journal of Geometry and Physics. textbf{57} (2007), 1421--1433.

%%------------------------------------------------------------------------------------------------------------------

bibitem{LR} { sc D. Latifi, sc A. Razavi}, textit{ On homogeneous Finsler spaces}, Rep. Math. Phys. {bf 57}(2006), 357--366.

%%------------------------------------------------------------------------------------------------------------------

bibitem{K} {sc M. Matsumoto}, textit{ On C-reducible Finsler spaces}, Tensor N.S. textbf{24} (1972), 29--37.

%%------------------------------------------------------------------------------------------------------------------

bibitem{NT1} { sc B. Najafi, sc A. Tayebi}, textit{ Some curvature properties of $(alpha , beta)$-metrics}, Bulletin Math de la Societe des Sciences Math de Roumanie. Tome 60 (108) No. 3, (2017), 277--291.

%%------------------------------------------------------------------------------------------------------------------

bibitem{NT2} {sc B. Najafi, sc A. Tayebi}, textit{ Weakly stretch Finsler metrics}, Publ Math Debrecen. textbf{91}(2017), 441--454.

%%--------------------------------------------------------------------------------------------------------------

bibitem{I}{sc M. Parhizkar, sc D. Latifi}, textit{ On the flag curvature of invariant $(alpha , beta)$-metrics}, International Journal of Geometric Methods in Modern Physics. textbf{4}(1650039) (2016), (11 pages).

%%------------------------------------------------------------------------------------------------------------------

bibitem{VV}{ sc L.I. Pic{s}coran, sc V. N. Mishra}, textit{ Projective flatness of a new class of $(alpha , beta) $-metrics}, Georgian Math Journal. DOI: 10.1515/gmj-2017-0034 (in press).

%%------------------------------------------------------------------------------------------------------------------

bibitem{V3} { sc L.I. Pic{s}coran, sc V. N. Mishra}, textit{ The Variational Problem in Lagrange Spaces Endowed

with a Special Type of $(alpha , beta) $-metrics}, Filomat. textbf{32}(2) (2018), 643--652.

%%------------------------------------------------------------------------------------------------------------------

bibitem{VV2} { sc L. I. Pic{s}coran, sc V. N. Mishra}, textit{ $S$-curvature for a new class of $(alpha , beta )$-metrics}, Revista de la Real Academia de Ciencias Exactas, Fisicas y Naturales. Serie A, Matematica. textbf{111}(2017) 1187--1200.

%%-----------------------------------------------------------------------------------------------------------------

bibitem{J} {sc H. R. Salimi Moghaddam}, textit{ On the geometry of some para-hypercomplex Lie groups}, Archivum Mathematicum (Brno). Tomus. textbf{45} (2009), 159--170.

%%------------------------------------------------------------------------------------------------------------------

bibitem{Salim} { sc H. R. Salimi Moghaddam}, textit{Randers metrics of Berwald type on 4-dimensional hypercomplex Lie groups}, J. Phys. A: Math. Theor. textbf{42}(2009), 095212(7 pp).

%%------------------------------------------------------------------------------------------------------------------

bibitem{M} { sc Z. Shen}, textit{ Lectures on Finsler Geometry}, World Sci. Publishing, Singapore, 2001.

%%%--------------------------------------------------------------------------------------------------------------

%bibitem{oo} Z. Shen, textit{ Volume compassion and its applications in Riemann-Finsler geometry}, Advances in Math. textbf{128} (1997), 306-328.

%%--------------------------------------------------------------------------------------------------------------

bibitem{TB} { sc A. Tayebi, sc M. Barzegari}, textit{ Generalized Berwald spaces with $(alpha, beta)$-metrics}, Indagationes Mathematicae. {bf 27} (2016), 670--683.

%%--------------------------------------------------------------------------------------------------------------

bibitem{TR}{sc A. Tayebi, sc M. Rafie Rad}, textit{ S-curvature of isotropic Berwald metrics}, Science in China, Series A: Math. {bf 51}(2008), 2198--2204.

%%%--------------------------------------------------------------------------------------------------------------

bibitem{TS2}{sc A. Tayebi, sc H. Sadeghi}, textit{ On generalized Douglas-Weyl $(alpha, beta)$-metrics}, Acta Mathematica Sinica, English Series, {bf 31}(2015), 1611-1620.