1 |
F. E. Browder and W. V. Petryshyn, Construction of fixed points of nonlinear mappings in Hilbert space, J. Math. Anal. Appl. 20 (2) (1967), 197-228.
DOI
|
2 |
L. Debnath and P. Mikusinski, Hilbert Spaces with Applications, Third Edition, Elsevier Academic Press, 2005.
|
3 |
T. L. Hicks and E. W. Huffman, Fixed point theorems in generalized Hilbert spaces, J. Math. Anal. Appl. 64 (3) (1978), 562-568.
DOI
|
4 |
E. W. Huffman, Strict convexity in locally convex spaces and fixed point theorems, Math. Japonica. 22 (1977), 323-333.
|
5 |
P. V. Koparde and D. B. Waghmode, Kanan Type mappings in Hilbert spaces, Scientist of Physical sciences. 3 (1) (1991), 45-50.
|
6 |
H. R. Moradi, M. E. Omidvar, and M. K. Anwary, An extension of Kantorovich inequality for sesquilinear maps, Eur. J. Pure Appl. Math. 10 (2) (2017), 231-237.
|
7 |
H. R. Moradi, M. E. Omidvar, S. S. Dragomir, and M. S. Khan, Sesquilinear version of numerical range and numerical radius, Acta Univ. Sapientiae, Mathematica. 9 (2) (2017), 324-335.
DOI
|
8 |
D. M. Pandhare, On the sequence of mappings on Hilbert space, The Mathematics Education. 32 (2) (1998), 61-63.
|
9 |
N. S. Rao, K. Kalyani, and N. C. P. Ramacharyulu, Result on fixed point theorem in Hilbert space, Int. J. Adv. Appl. Math. and Mech. 2 (3) (2015), 208-210.
|
10 |
T. Veerapandi and S. A. Kumar, Common fixed point theorems of a sequence of mappings on Hilbert space, Bull. Cal. Math. Soc. 91 (4) (1999), 299-308.
|