In this article we study semi-invariant submanifolds of almost complex
contact metric manifolds.We defined semi-invariant submanifolds of almost
complex contact metric manifold and we have investigated semi-invariant
submanifolds of almost complex contact metric manifolds. We investigated necessary conditions on which a semi-submanifold of an amlmasot complex contact metric manifold is invariant or anti-invariant. We found necessary and sufficient
conditions to be integrable and totally geodesic of distribution $D$
defined on $M$. Also we obtained necessary and sufficient conditions to be integrable and totally geodesic of distribution $D^{\bot }$ defined on
$M$\ .

W. M. Boothby and H. C. Wang; On concact manifolds,

Ann. of Math.(2). vol.68 ,1958, pp. 721-734.

W. M. Boothby; Homogeneous complex contact manifolds,

Proc. Symp. Pure. Math.III, Amer. Math. Soc.,1961, pp.144-154.

W. M. Boothby; A note on homogeneous complex contact

manifolds, Proc.Amer. Math. Soc., 13, 1962, 276-280.

D. E. Blair; Riemannian Geometry of contactand

symplectic Manifold. Brikhauser, 2002.

Y. Hatakeyama, Y. Ogawa, S. Tanno;Some properties

of manifolds with contact metric structures, Tohoku Math. J. , 15, 42-48.

S. Ishihara and M. Konishi; Real contact 3-structure and

complex contact structure, Southeast Asian Bulletin of Math, 3, 1979,

-161.

S. Ishihara and M. Konishi; Complex almost contact

manifolds, Kodai Math. J., 3, 1980, 385-396.

B. Korkmaz;Curvature and normality of complex contact

manifolds, PhD Thesis, Michigan State University East Lansing, MI, USA, copyright 1997.

B. Korkmaz; A curvature property of complex contact

metric structure, Kyungpook Math. J. 38, 1998, 473-488.

B. Korkmaz; Normality of complex contact manifolds,

Rocky Mountain J. Math., 30,2000, 1343-1380.

Kobayashi, S.; Principal fibre bundles with

the1-dimensional toroidal group, Tohoku Math. J. 8, 1956, 29-45.

S. Kobayashi; Remarks on complex contact manifolds,

Proc. Amer. Math. Soc.,10, 1963, 164-167.

S. Kobayashi; Topology of positively pinched

Kaehler manifolds, Tohoku Math. J. 15, 1963, 121-139.

J.W. Gray; Some global properties of contact

structures Ann. of. Math. Soc. vol.42, 1967, pp.257.

S. Sasaki; On differentiable manifolds with certain

structures which are closely related to almost contact structure I, Tohoku

Math. J.(2) vol.12, 1960, pp 459-476.

J. A. Wolf; Complex homogeneous contact manifolds and

quaternionic symmetric spaces, J.Math. and Mech., 14, 1965, 1033-1047.