Title of article
The enumeration of prudent polygons by area and its unusual asymptotics
Author/Authors
Beaton، نويسنده , , Nicholas R. and Flajolet، نويسنده , , Philippe and Guttmann، نويسنده , , Anthony J.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
30
From page
2261
To page
2290
Abstract
Prudent walks are special self-avoiding walks that never take a step towards an already occupied site, and k-sided prudent walks (with k = 1 , 2 , 3 , 4 ) are, in essence, only allowed to grow along k directions. Prudent polygons are prudent walks that return to a point adjacent to their starting point. Prudent walks and polygons have recently been enumerated by length and perimeter by Bousquet-Mélou and Schwerdtfeger. We consider the enumeration of prudent polygons by area. For the 3-sided variety, we find that the generating function is expressed in terms of a q-hypergeometric function, with an accumulation of poles towards the dominant singularity. This expression reveals an unusual asymptotic structure of the number of polygons of area n, where the critical exponent is the transcendental number l o g 2 3 and the amplitude involves tiny oscillations. Based on numerical data, we also expect similar phenomena to occur for 4-sided polygons. The asymptotic methodology involves an original combination of Mellin transform techniques and singularity analysis, which is of potential interest in a number of other asymptotic enumeration problems.
Keywords
Asymptotics , Prudent polygons , Area enumeration , q-Series , Mellin transforms
Journal title
Journal of Combinatorial Theory Series A
Serial Year
2011
Journal title
Journal of Combinatorial Theory Series A
Record number
1531702
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