Almost {α}-Cosymplectic ({kappa},{μ},{ν})-Spaces

Main interest of the present paper is to investigate the almost {\alpha}-cosymplectic manifolds for which the characteristic vector field of the almost {\alpha}-cosymplectic structure satisfies a specific ({\kappa},{\mu},{\nu})-nullity condition. This condition is invariant under D-homothetic deformation of the almost cosymplectic ({\kappa},{\mu},{\nu})-spaces in all dimensions. Also, we prove that for dimensions greater than three, {\kappa},{\mu},{\nu} are not necessary constant smooth functions such that df^{\eta}=0. Then the existence of the three-dimensional case of almost cosymplectic ({\kappa},{\mu},{\nu})-spaces are studied. Finally, we construct an appropriate example of such manifolds.