page 47:

WAS: 

\lim_{l -> \infty} \log {Z_l \over l} = . . .

IS: 

\lime_{l -> \infty {{\log (Z_l)} \over l} = . . .

WAS: 

     \lim_{l -> \infty} \{\log {{Y_{0,t_l}} \over {t_l}} \cdot {t_l \over l}\}
     \le \lim_{l -> \infty} \log {Z_l \over l} \le
     \lim_{l -> \infty} \{\log {{Y_{0,t_l + 1}} \over {t_l + 1}} \cdot {t_l + 1 \over l}\}

IS: 

     \lim_{l -> \infty} \{{\log {Y_{0,t_l}} \over {t_l}} \cdot {t_l \over l}\}
     \le \lim_{l -> \infty} {\log (Z_l) \over l} \le
     \lim_{l -> \infty} \{{{\log (Y_{0,t_l + 1)} \over {t_l + 1}} \cdot {t_l + 1 \over l}\}

Corrections by Mengxiang Tang, 1 July 1996

page 49:

WAS: 

     In Figure 3.3, we show two of the 233! = 48 . . .

IS: 

     In Figure 3.3, we show two of the 23-13! = 24 . . .
Correction by Leonid Peshkin, 18 February 1997.

page 53:

WAS: 

     A vertex is not balanced if

          \max_c d_c(v,E) \le d(v,E) / 2

IS: 

     A vertex is balanced if

          \max_c d_c(v,E) \le d(v,E) / 2

Correction by Katy Simonsen, 31 January 1996.

page 56:

WAS: For the first condition, $f(x_{l-1}, x_l) \ne f(x_n, x_{n+1})$

IS: For the first condition, $f(x_{l-1}, x_l) \ne f(x_l, x_{l+1})$


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USC Computational Biology Home Page

http://www-hto.usc.edu/books/msw/msg/corrections/Chapter3/index.html, webmaster@hto.usc.edu, 8 September 1997