International Journal of Mathematics Trends and Technology
Volume 48 | Number 5 | Year 2017 | Article Id. IJMTT-V48P549 | DOI : https://doi.org/10.14445/22315373/IJMTT-V48P549
In this paper, we deal with the basic concept of norm of the (3, 2)-jection operator in a Hilbert space and present the deep property concerning with this.
[1] Simmons G.F., Introduction to Topology and Modern Analysis, Indian Edition McGraw Hill Education, 2004, pp. 54, 81, 212.
[2] Bachman George and Narici Lawrence, Functional Analysis” Dover Publication, INC. Mineola, New York, 2000, pp. 238, 365.
[3] Samasundaram D., A first course in Functional Analysis” Narosa Publishing House, India, 2014, pp. 48, 177.
[4] Ponnusamy S., Foundation of functional Analysis” Narosa Publishing House, India, 2014, pp. 255, 256, 257.
[5] Pundhir S.K., A competitive Approach to Linear Algebra” CBS Publishers and Distributors Pvt. Ltd., 2015, pp. 471-473, 489-492.
[6] Cheney Ward &Kinead David, Linear Algebra Theory and Applications” Second Edition, 2014, pp. 404-410.
[7] Penney, Richard C., Linear Algebra Idea and Applications” second Edition. A John Wiley & Sons.INC., Publication Moboleen, New Jersey, 2005, pp. 10, 12.
[8] Sharma R.D. & Jain Ritu, Theory and Problems of Linear Algebra” I.K. International Publishing House Pvt. Ltd.New Delhi India, 2012, pp. 235, 240, 531.
[9] Sehneider Hans & Barker George Phillip, Matrices and Linear Algebra” Second Edition, Dover Publication, INC., New York, 2015, pp. 96-99.
[10] Sharma J.N. &Vasistha A.R., Functional Analysis, 15th edition, Krishna Prakashan Mandir, Meerut (U.P.), India, 1994, pp. 316-319, 327.
[11] Jha K.K., Functional Analysis, Students’ Friends, Patna India, 1986, pp. 321-324.
Navin Kumar Singh, "Norm of (3, 2) Jection Operator," International Journal of Mathematics Trends and Technology (IJMTT), vol. 48, no. 5, pp. 330-332, 2017. Crossref, https://doi.org/10.14445/22315373/IJMTT-V48P549
PDF 
Abstract 
Keywords 
References 
Citation