ݤ 01/04 2000
---------------

絪ץեǤ (LaTeX2e )


1. bniit.sty
------------
1.1. bniit.sty ˤĤ
-----------------------

㹩صפΡܸǤƵˤʤ٤碌Ρ
ASCII ܸ pLaTeX2e (LaTeX 2e) ѤΥեǤ
ǤϤޤ󤬡¿ϻȤ褦ˤʤäƤȻפޤ (Ver.0.6)

ºݤˤäƤΤ

1) ڡ쥤Ȥѹ (إå)
2) ȥʬΥޥ
3) ʸֹŤν

̤Ǥ

ʤVersion 0.6  LaTeX2e ѤΥѥåǤꡢLaTeX 2.09
ǻѤϡǤ bniit.sty 򤪻Ȥ


1.2. 󥹥ȡ
-----------------

platex ɤȤ (TEXINPUTS Υѥ̤äƤȤ) 
bniit.sty ֤Ƥ


1.3. ˡ
-----------
1.3.1. ɥȥ
---------------------------

\documentclass[twoside,11pt,fleqn]{jarticle}
\usepackage{bniit}

ȡpackage Ȥ bniit ߤޤʸ񥵥ϤΥե
ƤޤΤǡtwoside, 11pt ɬꤷƲ
ϥ饹եˤ

\documentclass{bniit}

ǺѤ褦ˤͽǤߤϤޤޤǤбǤƤ


ʤgraphicx ʤɤ¾Υѥåɤ߹ߤ

\usepackage{graphicx}

Τ褦ˤƤ


1.3.2. ڡ쥤
-----------------------

ڡ⤵ϤǤĴƤޤΤǡ\textheight ʤɤ
ʤǤޤ\pagestyle ǻȤäƤޤΤǻ
ꤷʤǤΥޥꤷޤ

\kiyouname{פ̾} : 1 ڡܤΥإå˽Ф뵪פ̾

: \kiyouname{㹩ص  2  1997 ǯ 12 }


1.3.3. ȥ
---------------

ʸȥˤĤơ\maketitle ̾Ѥ \author, \date,
\title, \abstract 뼡ΥޥɤѰդƤޤ

\jtitle{[ȥ]}{[Ф]} : ʸʸȥ
    [ȥ] : ʸȥ
    [Ф] : ʸξФ

  [Ф] ʸ 3 ڡܰʹߤδڡΥإå ()
  ˻Ȥ륿ȥǤʸȥ뤬ûФƱǹ
  ޤ󤬡ĹФûάΤѤޤ
  \title ϻѤʤǲ

\etitle{[ȥ]} : ʸʸȥ
    [ȥ] : ʸȥ

  ʸΥȥǤ\title ϻѤʤǤ

\authors{[̾(ʸ)]}{[̾(ʸ)]}{[° ̾]} : Ԥ
    [̾(ʸ)] : ̾ (ʸ)
    [̾(ʸ)] : ̾ (ʸ)
    [° ̾]  : Ԥν°ȿ̾

  Ԥν°̾ϥեå () ɽޤԤ
  

    \authors{[̾ 1]}{[° 1]}
    \authors{[̾ 2]}{[° 2]}
    ...

  Τ褦˽񤤤Ƥޤ\author ϻѤʤǲ

\recieved{[]} : 
    [] : ʸ

  ʸդ񤭤ޤʿǯηǻꤷޤ
  \date ϻѤʤǤ

\keywords{[]}
    [] : ʸ (ʸ)

\synopsis{[]}
    [] : ʸγ (ʸ)

  ʸγפ񤭤ޤʣԤǤäƤ⹽ޤ\abstract 
  ѤʤǤ


ΥޥǻꤷΤ \maketitle ޥɤǽϤޤ
ʾΥޥꤵƤʤȥ顼뤳Ȥޤ

λΰ򤢤ޤ

-----  -----
%%%%% myaritcle.tex %%%%%
\documentclass[twoside,11pt,fleqn]{jarticle}
\usepackage{bniit}
\kiyouname{㹩ص  2  1997 ǯ 12 }
\authors{ м}{Shigeharu TAKENO}{Żҹز ֻ}
\jtitle{ñ¸§μοͲ}%
  {ñ¸§μοͲ}
\etitle{Numerical results of time--periodic solutions \\
  for a scalar conservation law}
\recieved{\today}
\synopsis{%
  The scalar conservation law equation is known to have a discontinuous
  solution, so-called a shock wave. It makes some difficulties in 
  mathematical analysis for the equation.
  Recently, the proof of the existence of the periodic solution 
  was obtained for a scalar conservation law with a periodic outer 
  force. In this paper, we introduce some properties and numerical 
  results for the periodic solution by numerical computations.
  }
\keywords{scalar conservation law, Burgers equation, time periodic solution,
  weak solutions, period doubling bifurcation}
%
\begin{document}
\maketitle
%
% ʸʸ
%
\end{document}
----- ޤ -----


1.3.4. ʸ
---------------

ʸϡ̾ \cite ȡ\thebibliography, \bibitem Ѥ
Ƥʸλֹդ¿Ѥޤ

ʤ BibTeX ȤäƤʤΤǡBibTeX ǤưϳǧƤ
ޤ


1.3.5. ¾
-------------

¾ϤθФΥ󥿥󥰤ȡfigure Ķtable Ķθ
Ƥޤ


2. Хݡ
---------------

Υե̵ݾڤǤԶϡбǤ
ΤϹԤͽǤΤǡԶ𡢰ոʤɤϴޤޤ
ϲ᡼륢ɥ쥹ؤꤤפޤ


3. ѹ
-----------

10/19 1997 Ver.0.5
01/04 2000 Ver.0.6
bniit.sty

10/19 1997
1)    ۤƵ˹碌Ǥ BibTeX ѤΥե
      ѰդƻʸΥեޥåȤ碌
01/04 2000
2)    LaTeX2e ؤб

+=================================================+
 м   945-1195 㹩 Żҹز 
 shige@iee.niit.ac.jp      TEL(&FAX): 0257-22-8161 
+=================================================+
