“Harmonic Forms and Killing Tensor Fields on Almost Grayan Manifold”
- August 14, 2019
- Posted by: RSIS
- Category: Mathematics
International Journal of Research and Scientific Innovation (IJRSI) | Volume VI, Issue VIII, August 2019 | ISSN 2321–2705
“Harmonic Forms and Killing Tensor Fields on Almost Grayan Manifold”
Dr. Banke Bihari, Dr. S.P Pandey
Department of Mathematics, R.B.S. College, Agra, India
Abstract:-In this paper we have studied different aspect of para complex and almost para complex manifold which is similar to almost Grayan manifold.
I. INTRODUCTION
An almost para complex structure F is intregrable if an only if NF=0.
Proof:
Consider the two projections π±:Tm -> T±M,
π±:=1/2(Fd±F)
Then by the Frobeneus theorem, the integrability of T+M and T-M is equivalent to respectively
π-[π+X, π+Y] =0 and
π+[π-X, π-Y] =0
For all vector fields X and Y. The sum and the difference of these expressions are proportional to NF(X,Y) and FNF(X,Y)
Ex.1 Any para complex vector space (V,F) can be considered as a Para complex manifold, with constant Para-complex structure.
