The Making of Benazir Income Support Program

The Benazir Income Support Program (BISP), introduced in 2008-09, is a unique cash support scheme for economically stressed families. Its uniqueness arises from several facets. The cash transfers are provided only to women aged over 18 years and have been ever married. It is unconditional and aimed at supplementing income as opposed to alleviating poverty. It was politically neutral, given that the facility to identify potential beneficiaries was extended to all parliamentarians, irrespective of party affiliation. A set of filters, applied electronically, ensured objectivity in beneficiary selection. Disbursement mechanism was automated to ensure minimal leakage. This paper outlines the process of the preparatory work that went into designing BISP – the conceptual debates, the beneficiary identification and disbursement procedures, etc. – involving a combination of high quality research with political decision making. It also addresses the debates surrounding BISP, cites independent empirical studies that show that the parliamentarian-based beneficiary selection mechanism was efficient and equitable and did indeed cover the deserving, and also responds to the variety of criticisms. ______

Haar Wavelet Approach for Numerical Solution of Ordinary, Partial and Fractional Differential Equations With Delay

In this thesis, the main emphasis is on collocation technique using Haar wavelet. A new method based on Haar wavelet collocation is being formu- lated for numerical solution of delay differential equations, delay differential systems, delay partial differential equations and fractional delay differential equations. The numerical method is applied to both linear and nonlinear time invariant delay differential equations, time-varying delay differential equa- tions and system of these equations. For delay partial differential equations two methods are considered: the first one is a hybrid method of finite differ- ence scheme and one-dimensional Haar wavelet collocation method while in the second method two-dimensional Haar wavelet collocation method is ap- plied, and a comparative study is performed between the two methods. We also extend the method developed for delay differential equations to solve nu- merically fractional delay differential equations using Caputo derivatives and Haar wavelet. Here we consider fractional derivatives in the Caputo sense. Also we designed algorithms for all the new developed methods. The imple- mentations and testing of all methods are performed in MATLAB software. Several numerical experiments are conducted to verify the accuracy, ef- ficiency and convergence of the proposed method. The proposed method is also compared with some of the existing numerical methods in the literature and is applied to a number of benchmark test problems. The numerical re- sults are also compared with the exact solutions and the performance of the method is demonstrated by calculating the maximum absolute errors, mean square root errors and experimental rates of convergence for different number of collocation points. The numerical results show that the method is simply applicable, accurate, efficient and robust