In this master thesis, it is proposed to solve in the large thedifferential equationZ2(d2y/dz2) + z (dy/dz) (b0+b1zm) + (c0+c1zm)y = 0Here, m is an arbitrary positive integer, the variable z is complex as are the constants bi, ci (i = 0, 1). It is also assumed that the roots of the indicial equation about the regular singular point z=0 are such that their difference is incongruent to zero modulo m.
Identifer | oai:union.ndltd.org:BSU/oai:cardinalscholar.bsu.edu:handle/182818 |
Date | 03 June 2011 |
Creators | Wade, William J. |
Contributors | Puttaswamy, T. K. |
Source Sets | Ball State University |
Detected Language | English |
Format | v, 18, [1] leaves ; 28 cm. |
Source | Virtual Press |
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