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(Last updated: July 8, 2019)

Publications

2012

Ogonda, GO.  2012.  Environmental Psychology. , Nairobi: University of Nairobi

2008

Ogonda, GO.  2008.  CPY 116: Psychology of Human Development. , Nairobi: University of Nairobi4.docx

2007

Ogonda, GO.  2007.  Overview of learning disabilities. , Nairobi: KISE3.docx

2006

Ogonda, GO, Kenya R.  2006.  Special Needs Education in Kenya. , Seattle: CRM Cultural Studies Institute

2002

Ogonda, GO.  2002.  Education of children with specific learning difficulties. . : Nairobi: KISE1.docx

1999

OSODO, MRSOGONDAGRACE.  1999.  Reaching out to Children with Special Educational Needs in Kenya, Uganda and Zimbabwe.. Ogonda G. O. et al (1999). : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers

1998

OSODO, MRSOGONDAGRACE.  1998.  Perusuh, M. and Ogonda, G. (1998). .. Special Needs Education in Kenya and Zimbabwe. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers

1997

OSODO, MRSOGONDAGRACE.  1997.  Adegnibagbe, S., Perusuh, M. & Ogonda, G. (1997). A Comparative Review of Special Education in Kenya, Nigeria and Zimbabwe with reference to provision and Research.. International Journal of Special Education.. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers
OSODO, MRSOGONDAGRACE.  1997.  Peresuh, M., Adenigbagbe, S. & Ogonda, G. O. (1997) Perspectives of Special Need in Kenya, Zimbabwe and Nigeria. African Journal of Special Needs Education, 2(1) 40-47. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers

1995

OSODO, MRSOGONDAGRACE.  1995.  Oganda G. (1995) Creating a Barrier Free Environment for Children with Physical Disabilities. Nairobi: KISE. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers

1993

OSODO, MRSOGONDAGRACE.  1993.  Ogoda G. (1993). Physically and Neurologically Impaired Childre. Nairobi: KISE. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers
OSODO, MRSOGONDAGRACE.  1993.  Ogonda, G. (1993), Ingetration fo Children with Physical Disabilities, Who Benefits. KISE Bulletin, 5 (2) 27-32.. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers

1991

OSODO, MRSOGONDAGRACE.  1991.  Ogonda G. (1991): Children with Muscular Dystrophy. Nairobi: KISE. : Rao, W. O., Ogonji, J. A.. and Aywa, S. Abstract
Summing multipliers is an important class of operators in the geometric theory of general Banach spaces. They are particularly useful in the study of the structure of the classical spaces. The work done by Grothendieck and Pietsch provides a good basis for the study of this class of operators. The topic of this study is Aspects on (p,q)-summing multipliers. (p,q)-summing multipliers are sequences of bounded linear operators mapping weakly p-summable sequences into strongly q-summable sequences. This study is concerned with using the concepts of absolute and p-summing multipliers to characterize the space of all (p,q)-summing multipliers. In particular we show that the space of all (p, q)-summing multipliers is complete. This is accomplished through a detailed study of the concepts of the summing operators and absolute and p-summing multipliers

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