<div dir="ltr"><div><div>Hi Claudia,<br></div>I have a question - I have noticed that the in the ISWA (2010) the movement arrows are not regular with sizing..<br></div><div>For instance <img src="data:image/png;base64,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" alt=""> there are four sizes<br>
and here: <img src="data:image/png;base64,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" alt="">  there are two sizes.<br>
<br></div><div>I am quite sure you talked about this in your phd - My questions are:<br></div><div>1) What was the feedback from the deaf?<br></div><div>2) Did you decide to invent more glyphs or reduce the ones that had many? If you decided to reduce  them - why?<br>
<br></div><div>Thank
 you - if you would refer me to the exact pages in your thesis where you
 discuss this - i would be so much obliged!! It is difficult for me to 
find the location in your work because i am not fluent in french and 
italian<br><br></div><div>thanks,<br>maria<br>

</div></div>